Journées du réseau Dijon-Lyon-Metz de physique mathématique
de
jeudi 10 octobre 2024 (14:00)
à
vendredi 11 octobre 2024 (12:15)
lundi 7 octobre 2024
mardi 8 octobre 2024
mercredi 9 octobre 2024
jeudi 10 octobre 2024
14:00
Laplace coupling quantization
-
Christian Brouder
(
IMPMC, Sorbonne Université
)
Laplace coupling quantization
Christian Brouder
(
IMPMC, Sorbonne Université
)
14:00 - 14:45
Room: Salle A318
Quantization can be seen as a well-known deformation of the product of a cocommutative Hopf algebra (called twisted product or circle product). After a short introduction to Hopf algebras, the principle of this deformation is presented and illustrated by the operator product and the time-ordered product in quantum field theory. The first step of the renormalization of time-ordered products will be sketched.
15:00
Fredholm Determinants and Random Matrices
-
Xavier Navand
(
Université de Bourgogne
)
Fredholm Determinants and Random Matrices
Xavier Navand
(
Université de Bourgogne
)
15:00 - 15:45
Room: Salle A318
First, random matrix theory will be briefly introduced, summarizing the main results necessary to discuss the cumulative distribution for the largest eigenvalue of the Gaussian Unitary Ensemble. When the size of the matrix becomes infinite, this limiting distribution becomes a Fredholm determinant which can be evaluated by a functional formula, yielding the Tracy-Widom distribution. Then, a generalized setup will be described and motivated. Finally, our recent result about these generalized considerations will be presented as a deformation of the Tracy-Widom distribution.
16:00
Coffee break
Coffee break
16:00 - 16:30
Room: Salle A318
16:30
$\hbar$-expansion of Wightman distributions
-
Giuseppe Dito
(
Université de Bourgogne
)
$\hbar$-expansion of Wightman distributions
Giuseppe Dito
(
Université de Bourgogne
)
16:30 - 17:15
Room: Salle A318
Twisted $\hbar$-deformations by classical wave operators are introduced for the $\lambda \Phi^4$-theory in Minkowski spacetime. These deformations are non-perturbative in the coupling constant $\lambda$. The corresponding Wightman $n$-functions are defined as evaluations at $0$ of the $n$-fold deformed products of classical solutions of the $\lambda \Phi^4$ wave equation. We show that, in this setting, the $2$-point function is well-defined as a formal series in $\hbar$ of tempered distributions. Interestingly, these twisted deformations appear to possess an inherent renormalization scheme.
vendredi 11 octobre 2024
09:00
Introduction to $n$-Poisson (and $n$-Dirac) manifolds (2) : examples and Lie $n$-algebras.
-
Philippe Bonneau
(
Université de Lorraine
)
Introduction to $n$-Poisson (and $n$-Dirac) manifolds (2) : examples and Lie $n$-algebras.
Philippe Bonneau
(
Université de Lorraine
)
09:00 - 09:45
Room: Salle A318
Reminders on what are $n$-Poisson (and $n$-Dirac) manifolds, without using groupoids (only in terms of some structures in the generalised tangent space). Examples of such structures. Natural structure(s) of Lie $n$-algebra coming from these manifolds.
10:00
Coffee break
Coffee break
10:00 - 10:30
Room: Salle A318
10:30
Existence of crystallographic-invariant exponentially localized Wannier functions in topological insulators
-
Marco D'Agostino
(
INSA, Lyon
)
Existence of crystallographic-invariant exponentially localized Wannier functions in topological insulators
Marco D'Agostino
(
INSA, Lyon
)
10:30 - 11:15
Room: Salle A318
The problem of investigating the presence of topological obstructions to the existence of crystallographic invariant exponentially localized Wannier functions in topological insulators is addressed. When crystallographic groups are considered, twists in ordinary K-theory must be taken into account. The case of the Haldane model is used to demonstrate how an explicit algorithmic procedure can be set up to effectively construct invariant exponentially localized Wannier functions whenever no topological obstructions are present.
11:30
Cohomology, deformations and structure of local homogeneous Poisson brackets of arbitrary degree
-
Guido Carlet
(
Université de Bourgogne
)
Cohomology, deformations and structure of local homogeneous Poisson brackets of arbitrary degree
Guido Carlet
(
Université de Bourgogne
)
11:30 - 12:15
Room: Salle A318
Dubrovin and Novikov initiated the study of local homogeneous differential-geometric Poisson brackets of arbitrary degree $k$ in their seminal 1984 paper. Despite many efforts, and several results in low degree, very little is known about their structure for arbitrary $k$. After an introduction to the topic we report on our recent results on the structure of DN brackets of degree $k$. By applying homological algebra methods to the computation of their Poisson cohomology (or rather of an associated differential complex) we show that certain linear combinations of the coefficients of a degree $k$ DN bracket define $k$ flat connections. Moreover the Poisson cohomology of such brackets is related with the Chevalley-Eilenberg cohomology of an associate finite-dimensional Lie algebra. Work in progress with M. Casati.