A first efficient algorithm for enumerating all the extreme points of a bisubmodular polyhedron
Abstract
Efficiently enumerating all the extreme points of a polytope identified by a system of linear inequalities is a well-known challenge issue.We consider a special case and present an algorithm that enumerates all the extreme points of a bisubmodular polyhedron in O(n4|V|) time and O(n2) space complexity, where n is the dimension of underlying space and V is the set of outputs. We use the reverse search and signed poset linked to extreme points to avoid the redundant search. Our algorithm is a generalization of enumerating all the extreme points of a base polyhedron which comprises some combinatorial enumeration problems.
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