On the Complexity of Recognizing Integrality and Total Dual Integrality of the \0,1/2\-Closure
Abstract
The \0,12\-closure of a rational polyhedron \ x Ax b \ is obtained by adding all Gomory-Chv\'atal cuts that can be derived from the linear system Ax b using multipliers in \0,12\. We show that deciding whether the \0,12\-closure coincides with the integer hull is strongly NP-hard. A direct consequence of our proof is that, testing whether the linear description of the \0,12\-closure derived from Ax b is totally dual integral, is strongly NP-hard.
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