Forall-exist statements in pseudopolynomial time
Abstract
Given a convex set Q ⊂eq Rm and an integer matrix W ∈ Zm × n, we consider statements of the form ∀ b ∈ Q Zm ∃ x ∈ Zn s.t. Wx ≤ b. Such statements can be verified in polynomial time with the algorithm of Kannan and its improvements if n is fixed and Q is a polyhedron. The running time of the best-known algorithms is doubly exponential in~n. In this paper, we provide a pseudopolynomial-time algorithm if m is fixed. Its running time is (m )O(m2), where = \|W\|∞. Furthermore it applies to general convex sets Q.
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