Poles of a two-variable 𝑃-adic complex power

Strauss, Leon

doi:10.1090/S0002-9947-1983-0701506-2

Poles of a two-variable $P$-adic complex power
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Trans. Amer. Math. Soc. 278 (1983), 481-493 Request permission

Abstract:

For almost all $P$-adic completions of an algebraic number field, if $s \in {\mathbf {C}}$ is a pole of ${f^s} = \int _{}^{} {\int _{}^{} {|f(x,y){|^s}|dx{|_{{K_p}}}|dy{|_{{K_p}}}} }$ , where $f$ is a polynomial whose only singular point is the origin, $f(0,0) = 0$, and $f$ is irreducible in $\overline K [[x,y]]$, then $\operatorname {Re} (s)$ is $- 1$ or one of an explicitly given set of rational numbers, whose cardinality is the number of characteristic exponents of $f = 0$.

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