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Degree Estimates for Polynomials Constant on a Hyperplane

Complex Variables 2008-01-16 v2 Algebraic Geometry

Abstract

The study of proper rational mappings between balls in complex Euclidean spaces naturally leads to the relationship between the degree and imbedding dimension of such a mapping. The special case for monomial mappings is equivalent to the question discussed in this paper. Estimate the degree dd of a polynomial in nn real variables, assumed to have non-negative coefficients and to be constant on a hyperplane, in terms of the number NN of its terms. No such estimate is possible when n=1n=1. The sharp bound d2N3d\le 2N-3 is known when n=2n=2. This paper includes two main results. The first provides a bound, not sharp for n3n\ge 3, for all n2n\ge 2. This bound implies the more easily stated bound d4(2N3)3(2n3)d\le {4(2N-3)\over 3(2n-3)} for n3n\ge 3. The second result is a stabilization theorem; if nn is sufficiently large given dd, then the sharp bound dN1n1d \le {N-1 \over n-1} holds. In this situation we determine all polynomials for which the bound is sharp.

Keywords

Cite

@article{arxiv.math/0609713,
  title  = {Degree Estimates for Polynomials Constant on a Hyperplane},
  author = {John P. D'Angelo and Jiri Lebl and Han Peters},
  journal= {arXiv preprint arXiv:math/0609713},
  year   = {2008}
}

Comments

20 pages, minor corrections, accepted to Michigan Math. J