25
views
0
recommends
+1 Recommend
0 collections
    0
    shares
      • Record: found
      • Abstract: found
      • Article: found
      Is Open Access

      Constrained Monotone Function Maximization and the Supermodular Degree

      Preprint
      ,

      Read this article at

      Bookmark
          There is no author summary for this article yet. Authors can add summaries to their articles on ScienceOpen to make them more accessible to a non-specialist audience.

          Abstract

          The problem of maximizing a constrained monotone set function has many practical applications and generalizes many combinatorial problems. Unfortunately, it is generally not possible to maximize a monotone set function up to an acceptable approximation ratio, even subject to simple constraints. One highly studied approach to cope with this hardness is to restrict the set function. An outstanding disadvantage of imposing such a restriction on the set function is that no result is implied for set functions deviating from the restriction, even slightly. A more flexible approach, studied by Feige and Izsak, is to design an approximation algorithm whose approximation ratio depends on the complexity of the instance, as measured by some complexity measure. Specifically, they introduced a complexity measure called supermodular degree, measuring deviation from submodularity, and designed an algorithm for the welfare maximization problem with an approximation ratio that depends on this measure. In this work, we give the first (to the best of our knowledge) algorithm for maximizing an arbitrary monotone set function, subject to a k-extendible system. This class of constraints captures, for example, the intersection of k-matroids (note that a single matroid constraint is sufficient to capture the welfare maximization problem). Our approximation ratio deteriorates gracefully with the complexity of the set function and k. Our work can be seen as generalizing both the classic result of Fisher, Nemhauser and Wolsey, for maximizing a submodular set function subject to a k-extendible system, and the result of Feige and Izsak for the welfare maximization problem. Moreover, when our algorithm is applied to each one of these simpler cases, it obtains the same approximation ratio as of the respective original work.

          Related collections

          Most cited references17

          • Record: found
          • Abstract: not found
          • Article: not found

          An analysis of approximations for maximizing submodular set functions—I

            Bookmark
            • Record: found
            • Abstract: not found
            • Article: not found

            Maximizing a Monotone Submodular Function Subject to a Matroid Constraint

              Bookmark
              • Record: found
              • Abstract: not found
              • Article: not found

              Best Algorithms for Approximating the Maximum of a Submodular Set Function

                Bookmark

                Author and article information

                Journal
                2014-07-23
                2014-08-28
                Article
                1407.6328
                bd6209bc-1d90-416c-abc2-fa0dad195cd0

                http://arxiv.org/licenses/nonexclusive-distrib/1.0/

                History
                Custom metadata
                23 pages
                cs.DS

                Data structures & Algorithms
                Data structures & Algorithms

                Comments

                Comment on this article