论文信息 - Isotonicity of minimizers in polychotomous discrete interval search via lattice programming

Isotonicity of minimizers in polychotomous discrete interval search via lattice programming

Abstract. We consider several sequential search problems for an object which is hidden in a discrete interval with an arbitrary prior distribution. The searcher decomposes the momentary search interval into a fixed number of subintervals and obtains the information in which of the intervals the object is hidden. From the well-known lattice programming results of Topkis (1978) we develop a unifying method for proving in a transparent way the computationally very useful property of isotonicity of (largest and smallest) minimizers. We obtain rather natural sufficient conditions on the prior distribution and the cost structure, some of them weakening corresponding ones in Hassin/Henig (1993). We also show how these assumptions can be checked in particular cases. Some of our auxiliary results on lattices and submodular functions may be of independent interest.

Karl Hinderer | Michael Stieglitz

[1] R. Morris. Some Theorems on Sorting , 1969 .

[2] Satoru Murakami. A DICHOTOMOUS SEARCH , 1971 .

[3] Refael Hassin,et al. Monotonicity and Efficient Computation of Optimal Dichotomous Search , 1993, Discret. Appl. Math..

[4] Donald M. Topkis. The structure of sublattices of the product of n lattices , 1976 .

[5] K. Hlnderer. On dichotomous search with direction-dependent costs for a uniformly hidden object , 1990 .

[6] Donald M. Topkis,et al. Minimizing a Submodular Function on a Lattice , 1978, Oper. Res..

[7] L. Gotlieb. Optimal Multi-Way Search Trees , 1981, SIAM J. Comput..

[8] K. Hinderer,et al. Increasing Lipschitz continuous maximizers of some dynamic programs , 1991, Ann. Oper. Res..

[9] Eugene Wong,et al. A Linear Search Problem , 1964 .

[10] K. Hinderer,et al. On polychotomous search problems , 1994 .

[11] Refael Hassin. A Dichotomous Search for a Geometric Random Variable , 1984, Oper. Res..