Non-commutative differential calculus and its applications in low-dimensional topology

Naef, Florian

doi:10.13097/archive-ouverte/unige:101726

Doctoral thesis

English

Non-commutative differential calculus and its applications in low-dimensional topology

ContributorsNaef, Florian

DirectorsAlexeev, Anton

Defense date2017-12-18

Abstract

This thesis studies applications of non-commutative differential calculus. In particular, it contains contributions to the theory of double brackets, the linearization problem of the Goldman-Turaev Lie bialgebra and its connection to the Kashiwara-Vergne problem, and the study of universal characteristic classes.

Affiliation entities

Faculté des sciences / Section de mathématiques

Citation (ISO format)

NAEF, Florian. Non-commutative differential calculus and its applications in low-dimensional topology. Doctoral Thesis, 2017. doi: 10.13097/archive-ouverte/unige:101726

Thesis

Identifiers

PID : unige:101726
DOI : 10.13097/archive-ouverte/unige:101726
URN : urn:nbn:ch:unige-1017266
Thesis number : Sc. 5160

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Creation19/01/2018 10:53:00

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Non-commutative differential calculus and its applications in low-dimensional topology

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