Intangible Life

Functorial Connections in Relational Biology

  • A.H. Louie

Part of the Anticipation Science book series (ANTISC, volume 2)

Table of contents

  1. Front Matter
    Pages i-xxiii
  2. Potestas The Power Set Functor

    1. Front Matter
      Pages 25-26
    2. A. H. Louie
      Pages 27-43
    3. A. H. Louie
      Pages 45-62
    4. A. H. Louie
      Pages 63-78
    5. A. H. Louie
      Pages 79-92
  3. Sicut: Natural Law and the Modelling Relation

    1. Front Matter
      Pages 93-94
    2. A. H. Louie
      Pages 95-110
    3. A. H. Louie
      Pages 111-130
    4. A. H. Louie
      Pages 131-152
    5. A. H. Louie
      Pages 153-171
  4. Dimissio: From Invertibility to Adjunction

    1. Front Matter
      Pages 173-174
    2. A. H. Louie
      Pages 175-189
    3. A. H. Louie
      Pages 191-202
    4. A. H. Louie
      Pages 203-219
    5. A. H. Louie
      Pages 221-232
    6. A. H. Louie
      Pages 233-252
  5. Back Matter
    Pages 253-264

About this book


This rare publication continues an exploratory journey in relational biology, a study of biology in terms of the organization of networked connections in living systems. It builds on the author’s two earlier monographs which looked at the epistemology of life and the ontogeny of life. Here the emphasis is on the intangibility of life, that the real nature of living systems is conveyed not by their tangible material basis but by their intangible inherent processes. 
Relational biology is the approach that hails ‘function dictates structure’; it is mathematics decoded into biological realizations. Therefore, the work begins with a concise introduction to category theory, equiping the reader with the mathematical metalanguage of relation biology. The book is organized around three parts:
Part I is a comprehensive study of the most important functor in relational biology, the power set functor.  The author
lays the set-theoretic foundations of the functorial connections in relational biology, exploring relations, mappings, and set-valued mappings.
In Part II, Natural Law receives a new mathematical formulation founded on two axioms: ‘Everything is a set.’ and ‘Every process is a set-valued mapping.’ The reader sees how Metabolism–Repair networks, equipped with set-valued processors, expand their role from models of biological entities to generic models of all natural systems.  
Part III expounds the various shades of invertibility in general, and the inversion of encoding to decoding in particular.  A plethora of mathematical and biological examples illustrate the category-theoretic concepts of equivalence and adjunction.
This book's algebraic approach to biological models will appeal to researchers and graduate students in mathematics, biology, and the philosophy of science.


Relational Biology Category Theory Modeling Relation Metabolism and Repair Set-valued Mapping Decoding, Invertibility, and Adjunction

Authors and affiliations

  • A.H. Louie
    • 1
  1. 1.OttawaCanada

Bibliographic information