ChongGyu Lee
Published 2010-02-17, updated 2011-10-07Version 2
When we have a morphism f : P^n -> P^n, then we have an inequality \frac{1}{\deg f} h(f(P)) +C > h(P) which provides a good upper bound of $h(P)$. However, if $f$ is a rational map, then \frac{1}{\deg f} h(f(P))+C cannot be an upper bound of h(P). In this paper, we will define the $D$-ratio of a rational map $f$ which will replace the degree of a morphism in the height inequality of h(P).
Crystalline representations of G_Qp^a with coefficients
On the number of representations by certain octonary quadratic forms with coefficients 1, 2, 3, 4 and 6
Sign Changes of Coefficients and Sums of Coefficients of L-Functions
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