Abstract
We consider the following capital budgeting problem. A firm is given a set of investment opportunities \(X=\{x_1,\ldots ,x_n\}\) and a number m of portfolios. Every investment \(x_i\), \(1\le i\le n\), has a return of \(r_i\) and a price of \(p_{i}\). Further for every portfolio j there is capacity \(c_j\). The task is to choose m disjoint portfolios \(X'_1,\ldots , X'_m\) from X such that for every \(1\le j\le m\) the prices in \(X'_j\) do not exceed the capacity \(c_j\) and the total return of this selection is maximized. From a computational point of view this problem is intractable, even for \(m=1\) [8]. Since the problem is defined on inputs of various informations, in this paper we consider the fixed-parameter tractability for several parameterized versions of the problem. For a lot of small parameter values we obtain efficient solutions for the partitioning capital budgeting problem. We also consider the connection to pseudo-polynomial algorithms.
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References
Ausiello, G., Crescenzi, P., Gambosi, G., Kann, V., Marchetti-Spaccamela, A., Protasi, M.: Complexity and Approximation: Combinatorial Optimization Problems and Their Approximability Properties. Springer, Berlin (1999)
Cornuejols, G., Tütüncü, R.: Optimization Methods in Finance. Cambridge University Press, New York (2013)
Downey, R., Fellows, M.: Fundamentals of Parameterized Complexity. Springer, New York (2013)
Garey, M., Johnson, D.: Computers and Intractability: A Guide to the Theory of NP-Completeness. W.H. Freeman and Company, San Francisco (1979)
Gurski, F., Rethmann, J., Yilmaz, E.: Capital budgeting problems: A parameterized point of view. In: Operations Research Proceedings (OR 2014), Selected Papers. Springer (2015) (To appear)
Jansen, K.: A fast approximation scheme for the multiple knapsack problem. In: Proceedings of the Conference on Current Trends in Theory and Practice of Computer Science, vol. 7147, pp. 313–324. Springer, LNCS (2012)
Kannan, R.: Minkowski’s convex body theorem and integer programming. Math. Op. Res. 12, 415–440 (1987)
Kellerer, H., Pferschy, U., Pisinger, D.: Knapsack Problems. Springer, Berlin (2010)
Lorie, J., Savage, L.: Three problems in capital rationing. J. Bus. 28, 229–239 (1955)
Marx, D.: Parameterized complexity and approximation algorithms. Comput. J. 51(1), 60–78 (2008)
Pisinger, D., Toth, P.: Knapsack problems. In: Handbook of Combinatorial Optimization, vol. A, pp. 299–428. Kluwer Academic Publishers (1999)
Weingartner, H.: Capital budgeting of interrelated projects: survey and synthesis. Manag. Sci. 12(7), 485–516 (1966)
Weingartner, H., Martin, H.: Mathematical Programming and the Analysis of Capital Budgeting Problems. Prentice Hall Inc, Englewood Cliffs (1963)
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Gurski, F., Rethmann, J., Yilmaz, E. (2017). Computing Partitions with Applications to Capital Budgeting Problems. In: Dörner, K., Ljubic, I., Pflug, G., Tragler, G. (eds) Operations Research Proceedings 2015. Operations Research Proceedings. Springer, Cham. https://doi.org/10.1007/978-3-319-42902-1_11
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DOI: https://doi.org/10.1007/978-3-319-42902-1_11
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