A max-cut formulation of 0/1 programs
Abstract
We show that the linear or quadratic 0/1 program\[P:\ cTx+xTFx : \:A\,x =b;\:x∈\0,1\n\,\]can be formulated as a MAX-CUT problem whose associated graph is simply related to the matrices and T.Hence the whole arsenal of approximation techniques for MAX-CUT can be applied. We also compare the lower boundof the resulting semidefinite (or Shor) relaxation with that of the standard LP-relaxation and the first semidefinite relaxationsassociated with the Lasserre hierarchy and the copositive formulations of P.
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