Enveloping Superalgebra $U(\frak o\frak s\frak p(1|2))$ and

A. Sergeev, mleites@matematik.su.se

25 April 2001

No description available.

Spectral Theory of Differential and Difference Operators in Hilbert Spaces

Nyamwala, Fredrick Oluoch

30 June 2010

With appropriate smoothness and decay conditions, it has been shown that the deficiency index and spectral properties of unbounded differential operators are superpositions of the contributions from the individual clusters. The difference operators with almost constant coefficients are limit point at infinity and the absolutely continuous spectrum of their selfadjoint extensions coincide with that of the limiting selfadjoint extension operators.

Spectral theory

Differential operators

Difference operators

ddc:510

ON THE GAUDIN AND XXX MODELS ASSOCIATED TO LIE SUPERALGEBRAS

Chenliang Huang (9115211)

28 July 2020

We describe a reproduction procedure which, given a solution of the gl(m|n) Gaudin Bethe ansatz equation associated to a tensor product of polynomial modules, produces a family P of other solutions called the population. <br>To a population we associate a rational pseudodifferential operator R and a superspace W of rational functions. <br><br>We show that if at least one module is typical then the population P is canonically identified with the set of minimal factorizations of R and with the space of full superflags in W. We conjecture that the singular eigenvectors (up to rescaling) of all gl(m|n) Gaudin Hamiltonians are in a bijective correspondence with certain superspaces of rational functions.<br><br>We establish a duality of the non-periodic Gaudin model associated with superalgebra gl(m|n) and the non-periodic Gaudin model associated with algebra gl(k).<br><br>The Hamiltonians of the Gaudin models are given by expansions of a Berezinian of an (m+n) by (m+n) matrix in the case of gl(m|n) <br>and of a column determinant of a k by k matrix in the case of gl(k). We obtain our results by proving Capelli type identities for both cases and comparing the results.<br><br>We study solutions of the Bethe ansatz equations of the non-homogeneous periodic XXX model associated to super Yangian Y(gl(m|n)).<br>To a solution we associate a rational difference operator D and a superspace of rational functions W. We show that the set of complete factorizations of D is in canonical bijection with the variety of superflags in W and that each generic superflag defines a solution of the Bethe ansatz equation. We also give the analogous statements for the quasi-periodic supersymmetric spin chains.<br>

Bethe ansatz

Gaudin system

supersymmetric spin chains

rational differential operator

difference operators

Berezinian

Capelli identity

Duality