Some variational properties of tangent directions at infinity of real algebraic sets
Abstract
In this paper, we relate the set of asymptotic critical values of a polynomial function f with the set of discontinuity of two functions, the multivalued function which associate to each value t the set of tangent directions at infinity of the fiber f-1(t) and the composition of the (n-2)-dimensional volume function with the first one. This gives necessary conditions of equisingularity at infinity for the family of the fibers of a real polynomial function.
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