A polynomial Time Algorithm to Solve The Max-atom Problem
Abstract
In this paper we consider m (m ≥ 1)conjunctions of Max-atoms that is atoms of the form (z,y) + r ≥ x, where the offset r is a real constant and x,y,z are variables. We show that the Max-atom problem (MAP) belongs to P. Indeed, we provide an algorithm which solves the MAP in O(n6 m2 + n4 m3 + n2 m4) operations, where n is the number of variables which compose the max-atoms. As a by-product other problems also known to be in NP co-NP are in P. P1: the problem to know if a tropical cone is trivial or not. P2: problem of tropical rank of a tropical matrix. P3: parity game problem. P4: scheduling problem with AND/OR precedence constraints. P5: problem on hypergraph (shortest path). P6: problem in model checking and μ-calculus.
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