Finding an Integral vector in an Unknown Polyhedral Cone
Abstract
We present an algorithm to find an integral vector in the polyhedral cone =\X | AX ≤ 0\, without assuming the explicit knowledge of A. About the polyhedral cone, , it is only given that, (i) the elements of A are in \-d,-d+1,\...,0,\...,d-1,d\, d ∈ N, and, (ii) Y=[y(1),y(2),\...,y(n)] is a non-zero integral solution to . The proposed algorithm finds a non-zero integral vector in such that its maximum element is less than (2d)2n-1-1/2n-1.
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