# Finding the *K* best synthesis plans

## Abstract

*K*shortest hyperpaths can be used to compute the

*K*best synthesis plans for a given target molecule. Having

*K*good plans to choose from has many benefits: it makes the synthesis planning process much more robust when in later stages adding further chemical detail, it allows one to combine several notions of cost, and it provides a way to deal with imprecise yield estimates. A bond set gives rise to a HoR in a natural way. However, our modeling is not restricted to bond set based approaches—any set of known reactions and starting materials can be used to define a HoR. We also discuss classical quality measures for synthesis plans, such as overall yield and convergency, and demonstrate that convergency has a built-in inconsistency which could render its use in synthesis planning questionable. Decalin is used as an illustrative example of the use and implications of our results.

## Keywords

Synthesis planning Bond set Hypergraph Hyperpath Algorithm Convergency Decalin## Introduction

Synthesis planning is a core problem in chemistry, first treated as computational problem by Corey [1] in the late sixties. The objective is to find a way to synthesize a given target molecule from available starting materials, possibly optimizing costs such as amount of materials, price, or environmental impact of the process.

Synthesis planning is still regarded as somewhat of an art form, although attempts have been made over several decades at applying formal approaches and computational methods [1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 14, 15]. Such attempts have focused on models of synthesis plans, quality measures for ranking such plans, and algorithms for finding the best plan among several possible plans.

An early contribution towards an automated approach for synthesis planning is retrosynthetic analysis. It was introduced by Corey [1, 12, 13] in 1969 as part of a formalization of the rules of synthesis used in the development of the computer program LHASA (logic and heuristics applied to synthetic analysis). Retrosynthetic analysis is a top-down approach to synthesis planning, which governs the selection of the chemical bonds to be involved in the synthesis by using heuristics formulated to mimic a chemist’s reasoning. The basic idea is simple: Starting with the target chemical structure, split the molecule by removing a bond indicated by the heuristic. Then recursively continue on the generated smaller molecules until sufficiently simple or commercially available starting materials have been found. As an alternative to using heuristics trying to mimic the choices of chemists, Bertz [6, 10] suggested choosing bonds by minimizing the graph theoretical molecular complexity of the resulting precursor molecules. Other approaches include choosing bonds based on the existence of substructures of the target molecule that are isomorphic to easily accessible or available molecules found in libraries [16, 17, 18, 19]. An overview of programs for synthesis planning based on retrosynthesis can be found in [3, 14].

A major drawback of retrosynthesis, however, is that it is a greedy approach. In the attempt to make good choices during the retrosynthetic top-down recursion, it leaves out synthesis plans with costly last steps but much better first steps. Consequently, plans found using a retrosynthetic approach are not necessarily optimal plans according to quality measures for synthesis plans.

## Contribution

The starting point of this paper is the observation that computing a *single* good plan does not always suffice: Models of synthesis plans and definitions of quality measures necessarily leave out many real-world details, and the best plan according to a given choice of model and quality measure may turn out to be infeasible when later adding further chemical details to the plan. A more robust strategy would be to instead find a *number* of good plans from which the practitioner can choose based on additional chemical knowledge and wet-lab feasibility. We believe that such a strategy can significantly increase the practical value of formal synthesis planning. Generating and evaluating all possible plans is a natural approach, but this is highly inefficient due to the combinatorial explosion in the number of plans. In this paper, we make the strategy feasible by providing an efficient method for finding the *K* best synthesis plans, for any number *K*.

Our approach is based on representing the set of chemical reactions under interest as a directed hypergraph (a known method in chemistry, see e.g. [9]). We demonstrate that synthesis plans correspond exactly to the concept of hyperpaths^{1} in such hypergraphs. This in turn allows us to exploit an existing polynomial time algorithm [20] for finding the *K* shortest hyperpaths in a hypergraph—to our knowledge the first use of this algorithm in a chemical context. The result is a big improvement in the computational complexity of ranked enumeration of synthesis plans, which is our core contribution.

Besides adding robustness to synthesis planning, the strategy also enables an easy way to find plans that are optimized according to more than one quality measure: compute a set of the best plans for each measure and output their intersection. Similarly, one can use intersections of sets of good plans for several values of yield estimates, in order to obtain plans stable against variance in the actual yields obtained. Another feature of our approach is that it is not restricted to using a so-called bond set (many existing methods in formal synthesis planning are based on bond sets), but it has larger flexibility in terms of modeling the set of reactions available.

Along the way, we also demonstrate that one of the known classical quality measures surprisingly has a built-in inconsistency which could render its use in synthesis planning questionable.

The rest of this paper is structured as follows: In the “Previous work” section, we list the existing research closest to our contribution. In the “Synthesis planning basics” section, we outline relevant synthesis planning concepts. In the “Results” section, we point out problems that can arise when using unary-binary trees for modeling synthesis plans, and demonstrate how to solve these problems by the use of directed acyclic graphs and hypergraphs. We define a structure called a hypergraph of reactions, which we prove contains all synthesis plans as hyperpaths (Theorem 1). We then show how this allows us to find the *K* best synthesis plans in polynomial time (Theorem 2). We also discuss quality measures. In the “Discussion” section, we put our approach in a practical context using the molecule decalin as an example, before ending with "Conclusions" section.

## Previous work

The previous line of work closest to the work in this paper is by Hendrickson [8] and by Smith [9]. They both focus on graph based descriptions of synthesis plans, and on formal quality measures of these plans. Hendrickson [8] models synthesis plans as binary trees, and defines quality measures based on convergency [21], which essentially is how balanced the tree is. The rationale for this quality measure is that the more balanced the tree for a plan is, the fewer reactions the average starting material will take part in, either directly or as part of larger molecules in later reactions. All reactions incur some loss, and the strategy aims at reducing this loss. Smith [9] models synthesis plans as hypergraphs, and defines quality measures more explicitly based on the actual loss incurred by each reaction. In both papers, the focus is on finding a single best plan according to the quality measure in question. Smith explicitly gives an algorithm based on dynamic programming for finding this in his setting.

In terms of programs for synthesis planning, Hendrickson’s line of work has led to a program SynGen (synthetic generator) [15]. This program retrosynthetically expands all possible ways to synthesize the carbon skeleton of the target molecule, offering different ways to assist selection of plans after they have been computed. As the program enumerates *all* plans, it is computationally costly even for synthesis plans of depth three [15].

Our work in this paper can be said to extend the methods of Smith and Hendrickson. In combination with an algorithm from [20], we are able to find the *K* best synthesis plans for a target without having to compute all plans, resulting in a much better computational efficiency.

A concept somewhat related to synthesis planning is finding pathways in metabolic networks, see e.g. [22] for a recent review. The work most closely related to ours is [23], which models metabolic pathways as a type of hyperpaths and gives a method for enumerating pathways between a set of source compounds and a target compound in the network. However, their algorithm enumerates all pathways, not the *K* best according to a quality measure. Other papers reviewed in [22] do consider finding pathways in ranked order, but the modeling there is as simple paths in standard graphs.

## Synthesis planning basics

A synthesis plan describes a way to synthesize a given target molecule from available starting materials by a set of chemical reactions. There are two main types of reactions [8]: *construction* reactions, which create new carbon–carbon bonds in the target’s skeleton, and *functionalization* reactions, which alter the functional groups attached to the skeleton but do not alter the skeleton itself. Synthesis planning often proceeds in two phases, the first of which is identification of a set of construction reactions, and the second is consideration of functionalization reactions. The rationale for using such a two phase procedure (from fewer to more chemical features) during the search for an optimal synthesis plan is that the full chemical design space is too vast to explore efficiently. Usually, the first phase is considered to be the core of the planning—to quote Hoffmann [7, p. 5], *“The points stressed earlier should be highlighted once more: Construction of the skeleton of the target structure is the prime task in synthesis planning, not the placement of functionalities or stereogenic centers”*. Following most of the work on formal methods for synthesis planning, we therefore focus on the first phase and model construction reactions only.

Construction reactions come in two variants: *affixations* which add target bonds by uniting two separate precursor molecules, and *cyclizations* which add target bonds by closing a ring in a single molecule. Construction reactions are often said to *fix* a bond in the target, and the set of bonds fixed in the plan is denoted the *bond set*.

^{®}, is a bicyclic organic molecule with ten carbon atoms. It is an important industrial solvent for resins, waxes, and oils, and it serves as a component in jet fuels. The rightmost synthesis plans in Fig. 1 start with two affixations followed by two cyclizations. The leftmost plans alternate between an affixation and a cyclization. The bonds in the bond set are red and dashed.

Obviously, there can be several plans for the same target molecule. As an example, one can consider the bond set as a summary of the synthesis plan [8], actually representing a larger set of alternative synthesis plans arising from considering different orders of fixing the bonds. These plans may differ substantially in their yield, lab resource consumption, and environmental side effects. Thus, for a given set of synthesis plans there is a need to find the best. To this end, several quality measures for ranking synthesis plans have been proposed. Two classical ones are the *external path length* (\({{\mathrm{EPL}}}\)) and *total weight of starting materials* (\({{\mathrm{TW}}}\)).

The measure \({{\mathrm{EPL}}}\) was introduced by Hendrickson [8], and is defined as the sum of the numbers of reactions from each starting material to the target. When modeling synthesis plans as unary-binary trees, this is the sum of the lengths of all root-to-leaf paths, which is also known as the external path length of the tree. This measure optimizes the convergency [21] of the plans: fully convergent plans (balanced trees) minimizes \({{\mathrm{EPL}}}\), whereas linear plans maximizes it. The measure aims at reducing overall loss of material during the synthesis by reducing the number of reactions in which the average starting material takes part. However, we demonstrate later in the paper that this classic quality measure has intrinsic inconsistencies which could make its use questionable.

The measure \({{\mathrm{TW}}}\) is defined as the total weight of starting materials in grams needed to produce one gram of the target molecule, and hence is a more direct description of the overall loss of material. This measure was described by Hendrickson [8] and later by Smith [9]. The two authors differ in the way the value is calculated. In “Appendix 4: Total weight of starting materials” we demonstrate that Smith’s definition is in fact a generalization of that of Hendrickson, hence we here focus on the definition by Smith.

*e*in the tree connects an input molecule

*v*of a reaction with its output molecule

*u*. Smith assumes knowledge of the loss in each individual reaction, and expresses this by values \(r_e\) on all edges

*e*, where \(r_e\) is the amount in grammes of molecule

*v*needed to create one gram of molecule

*u*. Let \(P_{i}\) be the path from the root to leaf

*i*. The total weight of starting material

*i*needed to produce one gram of target is then equal to the product of the \(r_e\) values along \(P_i\). Thus, the total weight of starting materials needed to produce one gram of target is the sum of these values over all paths. Hence,

## Results

### Representations of synthesis plans

In a synthesis plan, an intermediate molecule may be used as input in several reactions. Our starting point is the observation that in such cases, this intermediate molecule clearly should only be synthesized in one way: given two different ways to synthesize a given intermediate molecule, one will have the smallest asymptotic cost, and even if the two have equal costs, using both induces extra overhead.

This means that if an intermediate molecule appears more than once as a vertex in a unary-binary tree representation of a synthesis plan, its subtrees should be identical. To illustrate, in the tree in Fig. 2a, molecule *C* is synthesized in two different ways. However, either the tree Fig. 2b or the tree Fig. 2c must be cheaper, depending on the costs of the two ways of synthesizing *C*. In short, while synthesis plans can be represented by unary-binary trees with nodes labeled by molecules, not all such unary-binary trees are realistic synthesis plans.

*t*with in-degree zero (representing the target molecule), and there is a path from

*t*to any other vertex in the DAG. Such a DAG can be obtained from the unary-binary tree structure by merging vertices with the same label. Vice versa, a tree structure can be obtained from the DAG by a depth-first search from the root of the DAG, in a version which allows revisits to vertices. In Fig. 3b, the DAG arising from the unary-binary tree in Fig. 3a is shown.

In the DAG (as well as in unary-binary trees), labels of vertices are molecules. For this labeling to be chemically meaningful, the labels cannot be arbitrary, but should reflect the reactions involved. We now formalize this, using graph models of molecules as labels.

If edge (*v*, *u*) is in the DAG, we denote vertex *u* a child of *v*. A vertex with out-degree zero we denote a leaf. A *molecule* is an undirected, connected, labeled graph, where labels are atom types. A *building block* of a DAG is a non-leaf vertex *v* together with every child *u* of *v* and its corresponding edge (*v*, *u*). In a DAG with nodes labeled by molecules, a building block is a *reaction* if it satisfies the following: (1) *v* has one or two children. (2) If *v* has one child *u*, the label of *v* is obtained from the label of *u* by adding exactly one edge. This is a cyclization. (3) If *v* has two children \(u_1\) and \(u_2\), then the label of *v* is obtained from the labels of \(u_1\) and \(u_2\) by adding exactly one edge connecting these labels. This is an affixation. A *starting material* is a molecule that can be acquired without the need to plan how to synthesize it.

**Definition 1**

*synthesis plan*for

*t*is a labeled DAG with the following properties:

- 1.
Vertex labels are molecules, and each label is unique.

- 2.
Each building block is a reaction.

- 3.
There is exactly one vertex with in-degree zero, namely

*t*. - 4.
The label of each leaf is a starting material.

Our next observation is that such DAG models of synthesis plans can be represented as directed *hypergraphs*. A hypergraph differs from a standard graph in that edges connect sets of vertices rather than single vertices. More precisely, a *hyperarc* is an ordered pair of vertex (multi)sets. In chemistry, a reaction is a multiset of reactants and a multiset of products, and can therefore be seen as a hyperarc. As we only model construction reactions, all heads are singletons in this paper. In Fig. 3c, the reactions of Fig. 3b are depicted as hyperarcs.

When we say that a hyperarc represents a chemical reaction, we mean that its vertices are labeled with molecules, and that the label of the head is obtained from the labels of the tail under the reaction in question, analogously to the definition of a reaction in a DAG given above.

Hypergraphs are well suited for modeling chemistry, because they make the relationship between all molecules involved in a reaction explicit. This is in contrast to a DAG or a tree, where the two reactants in a reaction are only indirectly related via their common product.

In a hypergraph representation of the synthesis plan, adding a dummy source vertex *s*, together with a directed hyperarc \((\{s\}, \{i\})\) to each starting material *i* of the synthesis plan (as shown in Fig. 3c), gives a hypergraph which is in fact a *hyperpath*. This allows us to think of a synthesis plan as a form of path, hence to think of optimal synthesis plans as optimal paths. Given a larger hypergraph modeling the reactions in a part of chemistry under consideration, the search for optimal synthesis plans within this chemistry then becomes a search for optimal paths in the hypergraph.

Below, we recap basic hypergraph terminology, and then show how to use hypergraphs for finding synthesis plans.

### Hypergraphs

A directed hypergraph is a set *V* of vertices and a set *E* of *hyperarcs*, where each hyperarc \(e=(T(e), H(e))\) is an ordered pair of non-empty multisets of vertices. The set *T*(*e*) is denoted the *tail* of the hyperarc and *H*(*e*)) the *head*. If \(|H(e)| = 1\), the hyperarc is denoted a *B-hyperarc*, and the notation for the single head vertex is *h*(*e*). A hypergraph with only B-hyperarcs is denoted a *B-hypergraph*. In this paper, we only consider B-hypergraphs. The *size* of a B-hypergraph is given by \({{\mathrm{size}}}(H)=\sum _{e\in E}(|T(e)| + 1)\). A hypergraph \(H'=(V',E')\) is a *subhypergraph* of \(H=(V,E)\) if \(V'\subseteq V\) and \(E'\subseteq E\).

A (plain) *path* \(P_{st}\) from *s* to *t* in a B-hypergraph is a sequence \(P_{st}=\langle s, e_1, v_1, e_2, v_2, \dots , v_{q-1}, e_q,t \rangle\) of vertices and B-hyperarcs such that \(s \in T(e_1)\), \(t=h(e_q)\) and \(v_i=h(e_i) \in T(e_{i+1})\) for \(i=1..q-1\). Its length \(|P_{st}|\) is the number *q* of hyperarcs. If \(t\in T(e_1)\), then \(P_{st}\) is a *cycle*. A hypergraph is *acyclic* if it does not contain any cycles.

The above concept of paths is only used for defining cycles. The proper generalization of directed paths to hypergraphs is that of *hyperpaths*. There are different ways of defining this—we use a variation based on [24]. For a general overview see [25]. Examples of what constitutes a hyperpath and what does not are given in “Appendix 1: Hyperpaths”.

**Definition 2**

*hyperpath*\(\pi _{st}=(V_\pi , E_\pi )\) from a source vertex

*s*to a target vertex

*t*in a B-hypergraph

*H*is a subhypergraph of

*H*with the following properties: If \(t=s\), then \(V_\pi = \{s\}\) and \(E_\pi = \emptyset\). Otherwise, \(E_\pi\) can be ordered in a sequence \(\langle e_1, e_2, \ldots , e_q \rangle\) such that

- (1)
\(T(e_i)\subseteq \{s\} \cup \{h(e_1), h(e_2), \ldots , h(e_{i-1})\}\) for all

*i* - (2)
\(t=h(e_q)\)

- (3)
Every \(v \in V_\pi {\setminus } \{ t \}\) has at least one outgoing hyperarc in \(E_\pi\), and

*t*has zero. - (4)
Every \(v \in V_\pi {\setminus } \{s\}\) has exactly one ingoing hyperarc in \(E_\pi\), and

*s*has zero.

Note that Definition 2(4) gives a 1–1 correspondence between \(E_\pi\) and \(V_\pi {\setminus } \{s\}\), hence we can define unique indices for the vertices in \(V_\pi {\setminus } \{s\}\) by \(v_i = h(e_i)\). We let \(v_0\) be *s*. The hyperarc \(e_i\) is called the *predecessor* hyperarc of \(v_i\) and the corresponding map \(p: V_\pi {\setminus } \{s\} \mapsto E_\pi\) is called the predecessor function of \(\pi _{st}\) [20]. We use the notation \(\pi _{st} = \langle p(v_1), p(v_2),\ldots ,p(v_{q-1}), p(t) \rangle\) for hyperpaths from now on. If a subhypergraph of a hyperpath \(\pi _{st}\) is a hyperpath itself, it is called a *subhyperpath* of \(\pi _{st}\). We will later need the following fact.

**Lemma 1**

*Let *\(\pi _{st} = \langle p(v_1), p(v_2),\ldots ,p(v_{q-1}), p(t) \rangle\)* be a hyperpath from* *s* to *t*.* Then for any *\(v_i\),* there is a unique subhyperpath* \(\pi _{sv_i}\) of \(\pi _{st}\)* from* *s* to \(v_i\).

*Proof*

By Definition 2(2) and (4), any subhyperpath from *s* to \(v_i\) must contain the set \(\pi _{sv_i}\) of hyperarcs returned by the procedure Backtrack listed in Algorithm 1. It is easy to verify that \(\pi _{sv_i}\) fulfills the requirements Definition 2(1)–(4). For uniqueness, let \(\pi '_{sv_i}\) be a hyperpath from *s* to \(v_i\), let \(E'\) be the hyperarcs of \(\pi '_{sv_i}\) not in \(\pi _{sv_i}\), and let \(e_j\) be the hyperarc of \(E'\) with highest index *j*. By Definition 2(3), \(v_j\) must have an outgoing hyperarc *e*. By Definition 2(1) and the maximality of *j*, we cannot have \(e \in E'\), and by the marking strategy of the algorithm, it cannot be a hyperarc of \(\pi _{sv_i}\). Hence, \(E'\) is empty and \(\pi _{sv_i} = \pi '_{sv_i}\). \(\square\)

### Finding synthesis plans via hypergraphs

The overall goal of this paper is to find synthesis plans within a given chemistry. We assume the chemistry is described by a (possibly large) set of construction reactions, i.e., affixations and cyclizations. Above, we described how to model synthesis plans as hypergraphs. In this section, we show how to view the set of reactions of the given chemistry as a single, large hypergraph, and how this in turn will allow us to find synthesis plans within the chemistry simply by looking for hyperpaths in this hypergraph.

Let *R* be a set of reactions, and let *S* be a set of starting materials. We define the hypergraph, called *the Hypergraph of Reactions* (\({{\mathrm{HoR}}}\)) induced by *R* and *S*, as follows.

**Definition 3**

*R*as a set of hyperarcs. Let \(V_R\) be the set of vertices appearing in the heads and tails of the hyperarcs in \(E_R\). Vertices with the same label (i.e., representing the same molecule) are considered identical. Let \(V_S\) be the set of vertices with labels in

*S*. Then, the

*hypergraph of reactions*(\({{\mathrm{HoR}}}\)) is the hypergraph

*s*is a dummy vertex and \(E_s = \{ (\{s\},\{v\}) \mid v \in V_S \}\) is a set of dummy hyperarcs.

*R*and

*S*being the combined sets of reactions and starting materials from the three synthesis plans for decalin in Fig. 1a is depicted in Fig. 4.

The crux of our paper is captured by the following theorem.

**Theorem 1**

*Let* \(H=(V,E)\) *be a HoR induced by reactions R and starting materials S. Let v be a vertex from* \(V_R\) *and let t be its label. Then there is a 1-1 correspondence between (a) the synthesis plans for t with reactions from R and starting materials from S and (b) the hyperpaths in H from s to v.*

*Proof*

Let \(\sigma\) be a synthesis plan from (a). To map it to a hyperpath in (b), do as follows. Add a dummy vertex *s* and a dummy edge from each leaf of \(\sigma\)–*s*. This result is still a DAG, hence admits a topological ordering of its vertices, i.e., a linear order on its vertices such that all edges point in the same direction. Convert each reaction and dummy edge of the DAG into a hyperarc in the natural way, cf. Fig. 3, reversing the direction. Let \(E_{\pi }\) be the resulting hyperarcs, and let \(V_{\pi }\) be the vertices of the DAG. Then \(\pi = (V_{\pi }, E_{\pi })\) is a hyperpath: Definition 2(4) follows because a building block of a DAG vertex contains all the outgoing DAG edges of the vertex. Due to Definition 2(4), the topological ordering of the DAG vertices induces an ordering of \(E_{\pi }\) fulfilling Definition 2(1). Definition 1(iii) induces Definition 2(3) and, combined with the topological ordering, also Definition 2(2).

Conversely, let \(\pi\) be a hyperpath from (b). To map it to a synthesis plan in (a), do as follows: From \(\pi\) remove *s* and its outgoing dummy hyperarcs, and convert every hyperarc to a building block in the natural way, reversing the direction. The result is a synthesis plan: Definition 1(i) and (ii) follow by what it means for a hyperarc to represent a reaction and by the uniqueness of vertex labels in Definition 3. Definition 1(i) follows from Definition 2(3). Definition 1(iv) follows from Definition 2(4) and the fact that only dummy hyperarcs have been removed, each of which by definition points to a starting material.

Clearly, the two mappings are each other’s inverses.\(\square\)

As a consequence of Theorem 1, algorithms computing hyperpaths in hypergraphs are also algorithms computing synthesis plans. In particular, we claim that an algorithm by Nielsen et al. [20] for finding the *K* shortest hyperpaths in a B-hypergraph can be used to find the *K* best synthesis plans for a target molecules *t*, given a set of reactions and a set of starting materials. We now verify the details of this claim.

The algorithm by Nielsen et al. is based on Yens classic algorithm [26] for shortest paths in directed (standard) graphs. The overall idea is to find the single shortest hyperpath and then recursively consider all ways in which a hyperpath can deviate from the shortest hyperpaths found so far, using single shortest hyperpath computations as a subroutine. For an acyclic B-hypergraph \(H=(V,E)\), the single shortest hyperpath can be computed using dynamic programming [9] in \(O(|V|+{{\mathrm{size}}}(H))\) time, leading to a runtime for the algorithm by Nielsen et al. of \(O(K|V|(|V|+{{\mathrm{size}}}(H)))\) on such hypergraphs. The requirement of acyclicity can be lifted (at the expense of a slight increase in runtime) by using different algorithms for finding single shortest hyperpaths [27], whereas the algorithm by Nielsen et al. assumes the hypergraph to be a B-hypergraph.

Any \({{\mathrm{HoR}}}\) *H* is acyclic and satisfies \({{\mathrm{size}}}(H)\le 3|E|\). The former is because every reaction has a strict increase from reactants to product in the number of edges in the molecule labels, and the latter is because every hyperarc *e* in a \({{\mathrm{HoR}}}\) is a B-hyperarc with \(|T(e)| \le 2\).

Finally, the algorithm by Nielsen et al. requires the lengths of hyperpaths to be given by what is called an additive weight function. We will later demonstrate that the very generic quality measure \({{\mathrm{TW}}}\) for synthesis plans can be expressed in this form.

These properties combined with Theorem 1 give the following result.

**Theorem 2**

*Given a HoR* \(H = (V,E)\) *and a target* \(t \in V\)*, the K best synthesis plans for t in H, ranked according to the measure TW, can be found in time* \(O(K|V|(|V|+|E|))\).

A detailed exposition of the algorithm by Nielsen et al. is given in “Appendix 2: The *K* best plans algorithm”.

The sets *R* and *S* of reactions and starting materials in the \({{\mathrm{HoR}}}\) can arise from many sources. As in Fig. 4, a set of known synthesis plans for a target *t* can be combined to a \({{\mathrm{HoR}}}\) which could then contain further, unknown plans. Another approach could be to generate the reactions of the \({{\mathrm{HoR}}}\) by recursively breaking the bonds of the target *t* in all possible ways. This could be all bonds of *t* (possibly stopping the recursion when a specified minimum size of intermediate molecules is met), or it could be a subset of bonds (i.e., a bond set) selected by methods from the classic retrosynthetic approach [1]. In “Appendix 3: Bond set based HoR construction”, we provide the algorithmic details of efficiently breaking a bond set in all possible ways. More generally, any database of reactions and starting materials describing a chemistry under consideration can be used as *R* and *S*. These databases can be based on published literature and patents, such as Reaxys [28] and SciFinder [29]. Recent developments for retrosynthetic reaction prediction [30, 31, 32] even allow for the inference of unknown reactions. As these automated prediction methods have already proven to be highly accurate, finding the *K* shortest hyperpaths also has potential for discovering novel synthesis plans employing such predicted reactions.

### Quality measures

The algorithm of Nielsen et al. requires the lengths of hyperpaths to be given by an additive weight function. In this section, we investigate whether existing quality measures for synthesis plans can be expressed in this form, and we show that the very generic measure \({{\mathrm{TW}}}\) indeed can. On the other hand, this turns out to not be the case for the classic measure \({{\mathrm{EPL}}}\). The reasons are inconsistencies that we demonstrate are inherent in the measure. This is a bit surprising in light of its use in previous work, but the implication seems to be that the \({{\mathrm{EPL}}}\) measure should be used with caution.

*additive weight function*

*W*assigns weights to hyperpaths in an inductive manner. For our purposes, we only need a special case, often denoted a

*value*function (for a more general definition of additive weight functions, see [27]): For each hyperarc

*e*and each vertex

*v*in its tail

*T*(

*e*), let \(a_{v,e}\) be a non-negative real number. Then for a hyperpath \(\pi _{st}\) from

*s*to

*t*, the weight \(W(\pi _{st})\) is one if \(t = s\), and is otherwise given recursively by

*s*to the vertices

*v*in the tail of last hyperarc

*p*(

*t*) of \(\pi _{st}\). These subhyperpaths exist and are unique by Lemma 1. They also contain strictly fewer hyperarcs, so the recursion stops eventually. Hence,

*W*is well-defined.

*Total weight of starting materials*We defined the quality measure total weight of starting materials (\({{\mathrm{TW}}}\)) in “Synthesis planning basics” section, expressed in unary-binary trees. Recall that \({{\mathrm{TW}}}\) expresses how much starting material is needed to produce one gram of target molecule, taking yields of reactions into account. In the hyperpath setting, the definition becomes the following. For a reaction

*e*with a reactant

*v*, the

*retro yield*\(r_{v,e}\) is the amount of

*v*in grams needed in reaction

*e*to create one gram of the product

*h*(

*e*). Thus, \(r_{v,e}\ge 0\), and by mass conservation \(\sum _{v}{r_{v,e}}\ge 1\) for any reaction

*e*. Figure 5 shows the HoR from Fig. 4 decorated with example retro yields.

*st*-path \(P_{st}=\langle s,e_1,v_1,e_2,v_2,\ldots ,e_{|P_{st}|}, t\rangle\) contained in the hyperpath of the synthesis plan induces a use of starting material \(v_1\) given by the product of the retro yields along the path. The product along a path is \(\prod _{i=1}^{|P_{st}|}{r_{v_{i-1},e_{i}}}\), where we for each hyperarc

*e*from the dummy vertex

*s*to a starting material define \(r_{s,e} = 1\). Thus, the total weight of starting materials needed for a synthesis plan represented by a hyperpath \(\pi _{st}\) is

*price*of the starting materials if a price per gram \(p_v\) is known for each starting material

*v*, simply by setting \(r_{s,e} = p_v\) for the hyperarc

*e*from

*s*to

*v*. It can also incorporate non-chemical expenses of reactions, such as cost of energy usage or cost of disposal of waste products, simply by adding

*s*to the tail of any hyperarc

*e*representing a reaction and setting \(r_{s,e}\) to the non-chemical expense per gram product produced in

*e*. Even more generally, we note that any measure which can be described as an additive weight function [27] is compatible with our method.

*External Path Length*Recall from “Synthesis planning basics” section that the quality measure external path length (\({{\mathrm{EPL}}}\)) [8] is the sum of the lengths of all paths from the root to the leaves. When trying (and failing) to express \({{\mathrm{EPL}}}\) as an additive weight function, we discovered a certain peculiarity inherent in the measure: the optimal synthesis plan for a molecule depends on how the molecule is later used. More precisely, what constitutes the best (sub-)synthesis plan for an intermediate molecule inside a larger synthesis plan depends on

*where*in the large plan the molecule is used. This does not correspond to physical reality, since different instances of a molecule are not distinguished after creation. As a consequence, in an optimal plan (w.r.t. \({{\mathrm{EPL}}}\)) where the same intermediate molecule appears twice, the plan could ask for different subplans for it. As we argued at the start of the “Results” section, such a plan would never be used in practice.

We now demonstrate the above inconsistency by an example, expressed using unary-binary trees (the model in which \({{\mathrm{EPL}}}\) was originally defined [8]).

Consider a (hypothetical) molecule *M*, and assume it can be synthesized using two different bond sets \(M'\) and \(M''\), as depicted in the top row of Fig. 6. \(M'\) admits only linear synthesis plans, whereas \(M''\) has many, including a fully convergent one. These synthesis plans are depicted in the bottom row of Fig. 6.

For synthesizing *M* by itself, the measure \({{\mathrm{EPL}}}\) is minimized by the fully convergent plan for the bond set \(M''\). However, consider the molecule *T* depicted in Fig. 7a, with the synthesis plan depicted in Fig. 7b. In this synthesis plan, the molecule *M* appears twice, with different sub-synthesis plans. According to \({{\mathrm{EPL}}}\) these different synthesis plans for *M* are indeed the optimal choices at these two positions in the remaining plan, as the reader can readily verify. For instance, the two alternatives shown in Fig. 8a, b have \({{\mathrm{EPL}}}=98\) and \({{\mathrm{EPL}}}=97\), while that of Fig. 7b has \({{\mathrm{EPL}}}=96\). In other words, according to \({{\mathrm{EPL}}}\), the position of *M* in the large plan determines how it should be made. We note that already in [8], Hendrickson expressed some reservations about the reliability of the measure as a cost function, but in less explicit terms than the phenomenon demonstrated above.

## Discussion

In this section, we discuss our approach in a practical context. Using decalin as an example, we first show that even small molecules admit a large number of synthesis plans. We next investigate how sensitive the ordering of these plans is to changes in the yields of reactions. Finally, we compare a formal synthesis plan to a fully detailed synthesis plan from the literature, illustrating the difference in level of details included. All three aspects demonstrate that having *K* good synthesis plans available is a clear advantage over having just the single best plan.

An implementation of the algorithms in “Appendix 2: The *K* best plans algorithm” and “Appendix 3: Bond set based HoR construction” can be acquired upon request by email to the authors.

### Number of synthesis plans for decalin

Recall that decalin is a bicyclic organic molecule with ten carbon atoms (Fig. 1). It has previously been used as an example molecule in graph theoretic approaches to synthesis planning [6]. Below, we use it to demonstrate that even small molecules typically lead to a large variety of synthesis plans.

We consider synthesis plans based on bond sets up to size four. A bond set can be represented as an edge-colored molecule graph, in which red edges are in the bond set and black edges are not. From this, the number of non-isomorphic bond sets of a certain size can be calculated by a straightforward application of Pólya’s Enumeration Theorem [33]: decalin has four non-isomorphic bond sets of size one, 18^{2} non-isomorphic bond sets of size two, 47 non-isomorphic bond sets of size three, and 92 non-isomorphic bond sets of size four.

For each of the 92 bond sets of size four, we count how many different plans this leads to. We do this by creating the \({{\mathrm{HoR}}}\) based on the bond set in question (using the algorithm in “Appendix 3: Bond set based HoR construction”) and then computing the *K* shortest hyperpath for \(K = \infty\) (using the algorithm in “Appendix 2: The *K* best plans algorithm”). Of these 92 bond sets, two lead to three different synthesis plans each (these are depicted in Fig. 1), one leads to five different synthesis plans (Fig. 9), one leads to eight synthesis plans (Fig. 10), and the rest each leads to at least ten possible synthesis plans (one example is given in Fig. 11). The maximum number for a single bond set is 38 different plans. The total number of plans in the collection is 1711.^{3}

From numbers above, we see that even small molecules can have a large number of possible synthesis plans. For larger molecules, an exhaustive enumeration becomes very costly in terms of computation time, and having a polynomial time algorithm for returning the *K* best is a strong asset.

### Order of synthesis plans

We now add retro yields to the synthesis plans of decalin. For each bond set, two different sets of example retro yields were used: one for which \(\sum _{v\in T(e)} r_{v,e} = 1.25\) for each hyperarc *e* representing a reaction, and one for which \(\sum _{v\in T(e)} r_{v,e} = 2.5\). These two cases correspond to a yield of \(1/1.25 = 80\%\) and \(1/2.5 = 40\%\), respectively. For each reaction, the retro yields are distributed between the reactants in proportion to their number of carbon atoms.

As an example, consider the three synthesis plans of Fig. 1a. With a yield of 80% in each reaction, one can verify that the total weight of starting materials needed to create one gram of decalin is 2.27 g in the case where the first affixation is followed by a cyclization, and 2.34 g in the two cases where both cyclization reactions are performed in the end. With a yield of 40%, the corresponding numbers are 32.5 and 34.4 g. Fig. 5 shows the \({{\mathrm{HoR}}}\) of these three plans decorated with the retro yields corresponding to 80% yield.

As another example, consider the eight plans in Fig. 10. Using a yield of 80% in each reaction, one can verify that the best plan is the top leftmost plan. This has a total weight of starting materials of 1.87 g. With a yield of 40%, the best plan is the top rightmost plan with a total weight of starting materials of 15.63 g.

From all synthesis plans of all possible bond sets of size 4, the best possible total weight turns out to be 1.72 g if the yield is 80%, and 10.0 g if the yield in each reaction is 40% (plans not among those depicted).

*i*be the first position where these rankings disagree, i.e., the first \(i-1\) best plans are the same in the two rankings, but the

*i*’th plan is not. For each possible value of

*i*, we count how many of the 92 different bond sets have this value as the first position where the rankings disagree. These counts are listed in Table 1 as \({{\mathrm{Count}}}(i)\).

Illustrating the sensitivity of the plans to changes in the yield values from 80 to \(40\%\)

| 1 | 2 | 4 | 5 | 10 | Same ranking | Total |
---|---|---|---|---|---|---|---|

\({{\mathrm{Count}}}(i)\) | 1 | 7 | 2 | 4 | 1 | 77 | 92 |

When planning, yields are often not known with high precision (and may even change over time as lab experience with the chosen reactions grows). The above shows that some plans may be quite sensitive to the exact yield values. Running our algorithm for two different sets of yield values and a fairly large *K*, and then taking the intersection of the results, is a way to learn which among the good plans are robust towards uncertainties in the yield values.

### Detailed chemical synthesis plan for a size 2 bond set for decalin

As discussed earlier, synthesis planning often proceeds in two phases, the first of which is identification of a set of construction reactions, and the second is consideration of functionalization reactions.

In this section, we want to illustrate the difference between a skeleton plan from the first phase and a detailed synthesis plan including the functionalization reactions from the second phase. As will be apparent, the difference can be large. Hence, the single best plan from phase one may easily turn out to be infeasible under actual lab conditions. Being able to find the *K* best plans in phase one gives a much more robust strategy, since this gives a number good plans on which practitioners can build in phase two.

We use the synthesis of the Wieland-Miescher Ketone (WMK) as an example. WMK is a key building block [34] in the total synthesis of numerous natural products possessing a wide spectrum of biological activity. The reaction (also known as Hajos-Parrish-Eder-Sauer-Wiechert reaction) is one of the first examples of asymmetric organocatalysis. The overall reaction is depicted in the top left of Fig. 12. It corresponds to the phase one plan shown in top right of Fig. 12, which has decalin as skeleton molecule and a bond set of size two. Interestingly, only the shown size two bond set has been under heavy investigation, and many different organocatalysts have been tried out to improve the yield and enatiomeric access of the reaction. Alternative bond sets, however, have only occasionally been tried out, which is surprising given the central role of WMK as a versatile building block in natural product synthesis. The affixation and cyclization steps require quite heavy valence electron rearrangements as illustrated by arrows in the two bracketed transition states in the lower part of Fig. 12. Furthermore, the synthetic target WMK is garnished with functional groups and chiral centers which are not considered in the phase one plan.

## Conclusions

We have demonstrated that a core part of chemical synthesis planning can be phrased as a combinatorial optimization problem on hypergraphs by modeling individual synthesis plans as directed hyperpaths embedded in a hypergraph of reactions (\({{\mathrm{HoR}}}\)) representing the chemistry of interest. An immediate consequence is that the *K* best synthesis plans for a given target can be computed in polynomial time [20] for a number of quality measures of practical importance, and indeed for any measure which can be expressed as an additive weight function. The polynomial runtime makes it feasible to do this even for big *K* and large molecules. Having *K* good plans to choose from has many benefits: it makes the synthesis planning process much more robust towards actual feasibility when in later stages adding functionalization reactions and other chemical details, it allows one to combine several quality measures, and it provides a way to deal with imprecise yield estimates.

Looking at the standard retrosynthetic approach, the obvious type of \({{\mathrm{HoR}}}\) is defined using a fixed target and a bond set, cf. the algorithm described in “Appendix 3: Bond set based HoR construction”. However, our modeling is not restricted to this. For instance, it is possible to combine any number of known synthesis plans for a target molecule into a \({{\mathrm{HoR}}}\), from which new hybrid plans may arise. More generally, any database of reactions and starting materials can be used to define a \({{\mathrm{HoR}}}\).

Along the way, we also demonstrated that the classic quality measure \({{\mathrm{EPL}}}\) has a built-in inconsistency which could render its use in synthesis planning questionable.

The work presented here is one step towards improving chemical synthesis planning in the light of developments in graph and hypergraph algorithms. A natural next step would be to attempt to add more chemical detail in the modeling. For instance, one could try to include refunctionalization reactions and to consider strategies for introducing and removing protective groups within this modeling framework.

## Footnotes

- 1.
Not to be confused with the simpler concept of (non-hyper) paths in the often used bipartite graph representation of hypergraphs.

- 2.
Note that Bertz [6] also counts bond sets of size two, but does not consider isomorphism issues and hence arrives at a larger number.

- 3.
In this sum, we did not check for isomorphic plans arising from different bond sets.

- 4.
If several orderings are legal (cf. Definition 2), any can be used.

- 5.
In others of the synthesis plans for

*t*, this intermediate molecule may not appear because its parts are combined with other intermediate molecules, which is the reason why such a bond set can be meaningful - 6.
Smith’s original definition was for synthesis plans modeled as hypergraphs. We here use unary-binary trees in order to compare to Hendrickson’s definition.

## Notes

### Authors’ contributions

The order of authors is alphabetical, following the tradition from computer science. All authors contributed the the design of the study, the mathematical results, and the writing of the manuscript. All authors read and approved the final manuscript.

## Acknowledgements

We thank Daniel Fentz Johansen and Carsten Grønbjerg Lützen for their implementation of the algorithm for finding the *K* best synthesis plans as a part of their MSc thesis.

## Competing interests

The authors declare that they have no competing interests.

## Availability of data and materials

Not applicable.

## Consent for publication

Not applicable.

## Ethics approval and consent to participate

Not applicable.

## Funding

This work was supported in part by the COST Action CM1304 “Emergence and Evolution of Complex Chemical Systems”, in part by the Volkswagen Stiftung Project no. I/82719, in part by the Independent Research Fund Denmark, Natural Sciences, Grants DFF-1323-00247 and DFF-7014-00041, in part by the National Science Foundation (INSPIRE 1648973), and by the Danish foundation Oticon Fonden.

## Publisher’s Note

Springer Nature remains neutral with regard to jurisdictional claims in published maps and institutional affiliations.

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