The Complexity of Approximation Reoptimization Algorithms for Discrete Optimization

The objective of postoptimality analysis and reoptimization using approximation methods is applying knowledge of the solution of the initial instance I of the problem (problem with the set values of input parameters) in order to either achieve a better quality of approximation (approximation ratio) of I′ (revised instance) or create a more efficient algorithm for determining an optimal or close to optimal solution of I′. This paper offers theoretical foundations for the acquisition, exploration, and use of bounds in the postoptimality analysis, as well as further development and improvement of approximation algorithms of reoptimization for discrete optimization problems. In particular, the upper and lower bounds on approximation ratio of approximate reoptimization algorithms for the constraint satisfaction problems (CSPs) are obtained using linear and semidefinite relaxations of the initial problem. In addition, sufficient conditions for the existence of polynomial approximation or threshold reoptimization algorithms for CSPs are obtained.