In this paper we discuss convex underestimators for bivariate functions. We first present a method for deriving convex envelopes over the simplest two-dimensional polytopes, i.e., triangles. Next, we propose a technique to compute the value at some point of the convex envelope over a general two-dimensional polytope, together with a supporting hyperplane of the convex envelope at that point. Noting that the envelopes might be of quite complicated form and their computation not easy, we move later on to the discussion of a method, based on the solution of a semidefinite program, to derive convex underestimators (not necessarily convex envelopes) of simple enough form for bivariate quadratic functions over general two-dimensional polytopes.
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