Objective
The main topic of this proposal is the study of the Statistical Mechanics of Integrable systems, a particular class of dynamical systems for which the behaviour is fully predictable from the initial data. All relevant information about the dynamics is encoded in a particular matrix L, called Lax matrix. We want to compute the maximum amplitude for the solution of the Ablowitz-Laddik lattice, and the correlation functions for the Volterra lattice, and the Exponential Toda one. The first quantity is instrumental to study the phenomenon of rouge waves formations, and the second one to compute transport coefficients of specific lattices. To compute these quantities, we need to obtain the distribution and the fluctuations of the eigenvalues of the Lax matrix when the initial data are sample according to a Generalized Gibbs Ensemble, thus the Lax matrix becomes a random matrix. To study these objects, we use Large Deviations principles. Furthermore, we also considered the focusing Ablowitz--Laddik lattice, the focusing Schur flow, and the family of Itoh--Narita--Bogoyavleskii lattices. The eigenvalues of the Lax matrices of these systems, when the initial data is sample according to a Generalized Gibbs Ensemble, lay on the complex plane. We plan to compute the density of states, and the joint eigenvalues distribution of the random Lax matrices by using the Inverse Scattering Transform, that is a canonical transformation between the physical variables and the spectral variables of the Lax matrices, the Hermitization technique and the Brown measure characterization. In the end, thanks to this analysis, we will be able to define some new random matrix ensembles on the complex plane, for which it is possible to compute the eigenvalues distribution, and the joint eigenvalues density explicitly. So, we will define some new beta-ensembles.
Keywords
Project’s keywords as indicated by the project coordinator. Not to be confused with the EuroSciVoc taxonomy (Fields of science)
Project’s keywords as indicated by the project coordinator. Not to be confused with the EuroSciVoc taxonomy (Fields of science)
Programme(s)
Multi-annual funding programmes that define the EU’s priorities for research and innovation.
Multi-annual funding programmes that define the EU’s priorities for research and innovation.
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HORIZON.1.2 - Marie Skłodowska-Curie Actions (MSCA)
MAIN PROGRAMME
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Topic(s)
Calls for proposals are divided into topics. A topic defines a specific subject or area for which applicants can submit proposals. The description of a topic comprises its specific scope and the expected impact of the funded project.
Calls for proposals are divided into topics. A topic defines a specific subject or area for which applicants can submit proposals. The description of a topic comprises its specific scope and the expected impact of the funded project.
Funding Scheme
Funding scheme (or “Type of Action”) inside a programme with common features. It specifies: the scope of what is funded; the reimbursement rate; specific evaluation criteria to qualify for funding; and the use of simplified forms of costs like lump sums.
Funding scheme (or “Type of Action”) inside a programme with common features. It specifies: the scope of what is funded; the reimbursement rate; specific evaluation criteria to qualify for funding; and the use of simplified forms of costs like lump sums.
HORIZON-TMA-MSCA-PF-EF - HORIZON TMA MSCA Postdoctoral Fellowships - European Fellowships
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Call for proposal
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Procedure for inviting applicants to submit project proposals, with the aim of receiving EU funding.
(opens in new window) HORIZON-MSCA-2022-PF-01
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Net EU financial contribution. The sum of money that the participant receives, deducted by the EU contribution to its linked third party. It considers the distribution of the EU financial contribution between direct beneficiaries of the project and other types of participants, like third-party participants.
75794 PARIS
France
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