New method to evaluate divergent series via the Wigner function

H\'ector Moya-Cessa; Roberto de Jes\'us Le\'on-Montiel; and Erwin A.; Mart\'i-Paname\~no

arXiv:0806.3995·quant-ph·March 6, 2013

New method to evaluate divergent series via the Wigner function

H\'ector Moya-Cessa, Roberto de Jes\'us Le\'on-Montiel, and Erwin A., Mart\'i-Paname\~no

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TL;DR

This paper proposes a novel approach that uses the measurable Wigner function to evaluate divergent series, bridging quantum physics and mathematical analysis.

Contribution

It introduces a new method leveraging the Wigner function to assign values to divergent series, a novel intersection of physics and mathematics.

Findings

01

Demonstrates the feasibility of using the Wigner function for divergent series evaluation

02

Provides a theoretical framework linking quantum measurements to mathematical series summation

03

Suggests potential applications in quantum physics and mathematical analysis

Abstract

It is shown how a physical function, namely the Wigner function, that in principle may be measured, can be used to evaluate divergent series.

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Taxonomy

TopicsScientific Measurement and Uncertainty Evaluation