The Random Quadratic Assignment Problem

Abstract

Optimal assignment of classes to classrooms dickey, design of DNA microarrays carvalho, cross species gene analysis kolar, creation of hospital layouts citeelshafei, and assignment of components to locations on circuit boards steinberg are a few of the many problems which have been formulated as a quadratic assignment problem (QAP). Originally formulated in 1957, the QAP is one of the most difficult of all combinatorial optimization problems. Here, we use statistical mechanical methods to study the asymptotic behavior of problems in which the entries of at least one of the two matrices that specify the problem are chosen from a random distribution P. Surprisingly, this case has not been studied before using statistical methods despite the fact that the QAP was first proposed over 50 years ago Koopmans. We find simple forms for C min and C max, the costs of the minimal and maximum solutions respectively. Notable features of our results are the symmetry of the results for C min and C max and the dependence on P only through its mean and standard deviation, independent of the details of P. After the asymptotic cost is determined for a given QAP problem, one can straightforwardly calculate the asymptotic cost of a QAP problem specified with a different random distribution P.