On the Degree Growth of Birational Mappings in Higher Dimension

Abstract

Let f be a birational map of Cd, and consider the degree complexity, or asymptotic degree growth rate δ(f)=n∞( deg(fn))1/n. We introduce a family of elementary maps, which have the form f=L J, where L is (invertible) linear, and J(x1,...,xd)=(x1-1,...,xd-1). We develop a method of regularization and show how it can be used to compute δ for an elementary map.

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