Looking for all solutions of the Max Atom Problem (MAP)

Abstract

This present paper provides the absolutely necessary corrections to the previous work entitled A polynomial Time Algorithm to Solve The Max-atom Problem (arXiv:2106.08854v1). The max-atom-problem (MAP) deals with system of scalar inequalities (called atoms or max-atom) of the form: x ≤ a + (y,z). Where a is a real number and x,y and z belong to the set of the variables of the whole MAP. A max-atom is said to be positive if its scalar a is ≥ 0 and stricly negative if its scalar a <0. A MAP will be said to be positive if all atoms are positive. In the case of non positive MAP we present a saturation principle for system of vectorial inequalities of the form x ≤ A x + b in the so-called (,+)-algebra assuming some properties on the matrix A. Then, we apply such principle to explore all non-trivial solutions (ie ≠ -∞). We deduce a strongly polynomial method to express all solutions of a non positive MAP. In the case a positive MAP which has always the vector x1=(0) as trivial solution we show that looking for all solutions requires the enumeration of all elementary circuits in a graph associated with the MAP. However, we propose a strongly polynomial method wich provides some non trivial solutions.