Parameterized Extension Complexity of Independent Set and Related Problems

Abstract

Let G be a graph on n vertices and STABk(G) be the convex hull of characteristic vectors of its independent sets of size at most k. We study extension complexity of STABk(G) with respect to a fixed parameter k (analogously to, e.g., parameterized computational complexity of problems). We show that for graphs G from a class of bounded expansion it holds that xc(STABk(G))≤slant O(f(k)· n) where the function f depends only on the class. This result can be extended in a simple way to a wide range of similarly defined graph polytopes. In case of general graphs we show that there is no function f such that, for all values of the parameter k and for all graphs on n vertices, the extension complexity of STABk(G) is at most f(k)· nO(1). While such results are not surprising since it is known that optimizing over STABk(G) is FPT for graphs of bounded expansion and W[1]-hard in general, they are also not trivial and in both cases stronger than the corresponding computational complexity results.