A Parameterized Algorithm for Testing whether the Limit of a Diagram is Empty

Abstract

A limit of a (small) diagram d : J E in a complete category E can be thought of as specifying a set of equations involving the objects of E. To motivate this intuitively, one can think of each object d(j) as a "variable" and each morphism in J as a "constraint" connecting these variables. If E has an initial object, a natural question arises: does our set of equations have any solution at all? Equivalently, we can ask: is the limit of d initial? In this paper we consider the computational problem that, given finite diagram d in a finitely complete category E, asks whether its limit is empty. We construct a fast algorithm (in the sense of parameterized complexity theory) that solves this problem when E is of the form FinSetJ for a finite category J and d is a structured co-decomposition, i.e. a diagram arising from the opposite of the Grothendieck construction of a simple graph.