The Jensen-P\'olya program for various L-functions
Abstract
P\'olya proved in 1927 that the Riemann hypothesis is equivalent to the hyperbolicity of all of the Jensen polynomials of degree d and shift n for the Riemann Xi-function. Recently, Griffin, Ono, Rolen, and Zagier proved that for each degree d ≥ 1 all of the Jensen polynomials for the Riemann Xi-function are hyperbolic except for possibly finitely many n. Here we extend their work by showing the same statement is true for suitable L-functions. This offers evidence for the generalized Riemann hypothesis.
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