The parameterized complexity of some geometric problems in unbounded dimension

Abstract

We study the parameterized complexity of the following fundamental geometric problems with respect to the dimension d: i) Given n points in , compute their minimum enclosing cylinder. ii) Given two n-point sets in , decide whether they can be separated by two hyperplanes. iii) Given a system of n linear inequalities with d variables, find a maximum-size feasible subsystem. We show that (the decision versions of) all these problems are W[1]-hard when parameterized by the dimension d. %and hence not solvable in O(f(d)nc) time, for any computable function f and constant c %(unless FPT=W[1]). Our reductions also give a n(d)-time lower bound (under the Exponential Time Hypothesis).