Academics

Quantisation ldeals -a novel approach to the old problem of quantisation | Integrable System Lunch Seminar

Time:2024-04-01 Mon 11:30-13:00

Venue:A4-1

Organizer:Nicolai Reshetikhin, Bart Vlaar. Ruiiie Xu

Speaker:Alexander Mikhailov University of Leeds

Abstract

We propose to revisit the problem of guantisation and look at it from an entirely new analefocusing on the guantisation of dynamical systems themselves, rather than of their Poissonstructures. We begin with a dynamical system defined on a free associative algebra fA generatedby non-commutative dynamical variables al, ac2,..., and reduce the problem of guantisation to theproblem of studying two-sided guantisation ideals. The dynamical system defines a derivation ofthe algebra 'p : fAmfA. By definition, a two-sided ideal 'cI of 'fA is said to be alemphfquantisation ideal} for (\fA, p) if it satisfies the following two properties:1. The ideal \cl is \p-stable: p(\cI) C\cI; 2. The quotient \fA/\cI admits a basis of normallyordered monomials in the dynamical variables. The multiplication rules in the quantum algebrafA/\cI are manifestly associative and consistent with the dynamics. We found first examples ofbi-guantum systems which are quantum counterparts of bi-Hamiltonian systems in the classicatheory. Moreover, the new approach enables us to define and present first examples of non.deformation guantisations of dynamical systems, i.e. quanum systems that cannot be obtained asdeformations of a classical dynamical system with commutative variables. in order to apply thenovel approach to a classical system we need firstly lift it to a system on a free algebra preservingthe most valuable properties, such as symmetries, conservation laws, or Lax integrability. The newapproach sheds light on the long standing problem of operator's ordering. We will use the wellknown Volterra hierarchy and stationary KdV equations to illustrate the methodology.


References:

[1] A.V. Mikhailov. Quantisation ideals of nonabelian integrable systems. Russ. Math. Surv..

75(5):199,2020.

[2]V. M. Buchstaber and A. V. Mikhailov. KdV hierarchies and quantum Novikovs eguationsOcnmp:12684 - Open Communications in Nonlinear Mathematical Physics, February 15, 2024.Special lssue in Memory of Decio Levi.

[3] S. Carpentier, A.V. Mikhailov and J.P. Wang. Quantisation of the Volterra hierarchy. Lett. MathPhys.. 112:94,2022.

[4] Sylvain Carpentier, Alexander V. Mikhailov, and Jing Ping Wang. Hamiltonians for the quantisedVolterra hierarchy. arXiv:2312.12077,2023.(Submitted to Nonlinearity)



DATEMarch 31, 2024
SHARE
Related News
    • 0

      A stacky approach to linearisation of non-resonant vector fields

      Algebraic Geometry SeminarOrganizers:Caucher Birkar,贾甲Speaker:Bongiorno Federico (YMSC)Time:Fri., 15:30-16:30, Dec. 13, 2024Venue:B725, Shuangqing Complex Building AOnline:Zoom Meeting ID: 262 865 5007Passcode: YMSCTitle:A stacky approach to linearisation of non-resonant vector fieldsAbstract:Whilst studying differential equations, Henri Poincar\'{e} showed that, given any non-resonan...

    • 1

      Toric vector bundles, non-abelianisation, and spectral networks | Geometry and Dynamics Seminar

      AbstractSpectral networks and non-abelianization were introduced by Gaiotto-Moore-Neitzke and theyhave many applications in mathematics and physics. in a recent work by Nho, he proved that thenon-abelianization of an almost flat local system over the spectral curve of a meromorphicguadratic differential is actually the same as the family Floer construction. Based on the mirrorsymmetry philosoph...