Abstract

In this article we focus on the study of special parabolic points in surfaces arising as graphs of polynomials, we prove that Viro’s construction glues a class of special parabolic points that we call transversal and build families of real polynomials in two variables with a prescribed number of special parabolic points in their graphs. When $$13\le d\le $$ 10,000, we use this result to build a family of degree d real polynomials in two variables with $$(d-4)(2d-9)$$ special parabolic points in its graph. This brings the number of special parabolic points closer to the upper bound of $$(d-2)(5d-12)$$ which is the best known up until now.

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