Modularity of the q-Pochhammer symbol and application

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Centre International de Rencontres Mathématiques (CIRM)

Drappeau, Sary

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Title

Modularity of the q-Pochhammer symbol and application

Title of Series

Diophantine Problems, Determinism and Randomness, 2020

Number of Parts

Author

Drappeau, Sary

Contributors

Hennenfent, Guillaume (Filmmaker)

License

CC Attribution - NonCommercial - NoDerivatives 2.0 Generic:
You are free to use, copy, distribute and transmit the work or content in unchanged form for any legal and non-commercial purpose as long as the work is attributed to the author in the manner specified by the author or licensor.

Identifiers

10.5446/53730 (DOI)

Publisher

Centre International de Rencontres Mathématiques (CIRM)

Release Date

2020

Language

English

Content Metadata

Subject Area

Mathematics

Genre

Conference/Talk

Abstract

This talk will report on a work with S. Bettin (University of Genova) in which we obtained exact modularity relations for the q-Pochhammer symbol, which is a finite version of the Dedekind eta function. We will overview some of their useful aspects and applications, in particular to the value distribution of a certain knot invariants, the Kashaev invariants, constructed with q-Pochhammer symbols.

Keywords

q-Pochhammer symbol

dilogarithm

quantum knot invariants

modularity

limit law