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The eñe product over a commutative ring

Abstract : We define the eñe product for the multiplicative group of polynomials and formal power series with coefficients on a commutative ring and unitary constant coefficient. This defines a commutative ring structure where multiplication is the additive structure and the eñe product is the multiplicative one. For polynomials with complex coefficients, the eñe product acts as a multiplicative convolution of their divisor. We study its algebraic properties, its relation to symmetric functions on an infinite number of variables, to tensor products, and Hecke operators. The exponential linearizes also the eñe product. The eñe product extends to rational functions and formal meromorphic functions. We also study the analytic properties over the complex numbers, and for entire functions. The eñe product respects Hadamard-Weierstrass factorization and is related to the Hadamard product. The eñe product plays a central role in predicting the phenomenon of the "statistics on Riemann zeros" for Riemann zeta function and general Dirichlet L-functions discovered by the author in [6]. It also gives reasons to believe in the Riemann Hypothesis as explained in [7].
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Contributor : Ricardo Pérez-Marco Connect in order to contact the contributor
Submitted on : Wednesday, November 20, 2019 - 8:38:06 PM
Last modification on : Sunday, June 26, 2022 - 9:56:11 AM


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  • HAL Id : hal-02373243, version 1


Ricardo Pérez-Marco. The eñe product over a commutative ring. 2019. ⟨hal-02373243⟩



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