On the Containment Problem for Linear Sets

Abstract

It is well known that the containment problem (as well as the equivalence problem) for semilinear sets is -complete in 2p. It had been shown quite recently that already the containment problem for multi-dimensional linear sets is -complete in 2p (where hardness even holds for a unary encoding of the numerical input parameters). In this paper, we show that already the containment problem for 1-dimensional linear sets (with binary encoding of the numerical input parameters) is -hard (and therefore also -complete) in 2p. However, combining both restrictions (dimension 1 and unary encoding), the problem becomes solvable in polynomial time.