Rational and lacunary algebraic curves
Abstract
We give a bound on the number Z of intersection points in a ball of the complex plane, between a rational curve and a lacunary algebraic curve Q=0. This bound depends only on the lacunarity diagram of Q, and in particular is uniform in the coefficients of Q. Our bound shows that Z=O(dm), where d is the degree of Q and m is the number of its monomials.
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