1,409 research outputs found

    Integrals of motion of classical lattice sine-Gordon system

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    We compute the local integrals of motions of the classical limit of the lattice sine-Gordon system, using a geometrical interpretation of the local sine-Gordon variables. Using an analogous description of the screened local variables, we show that these integrals are in involution. We present some remarks on relations with the situation at roots of 1 and results on another latticisation (linked to the principal subalgebra of sâ„“^2\widehat{s\ell}_{2} rather than the homogeneous one). Finally, we analyse a module of ``screened semilocal variables'', on which the whole sâ„“^2\widehat{s\ell}_{2} acts.Comment: (references added

    Two character formulas for sl2^\hat{sl_2} spaces of coinvariants

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    We consider sl2^\hat{sl_2} spaces of coinvariants with respect to two kinds of ideals of the enveloping algebra U(sl_2\otimes\C[t]). The first one is generated by sl2⊗tNsl_2\otimes t^N, and the second one is generated by e⊗P(t),f⊗R(t)e\otimes P(t), f\otimes R(t) where P(t),R(t)P(t), R(t) are fixed generic polynomials. (We also treat a generalization of the latter.) Using a method developed in our previous paper, we give new fermionic formulas for their Hilbert polynomials in terms of the level-restricted Kostka polynomials and qq-multinomial symbols. As a byproduct, we obtain a fermionic formula for the fusion product of sl3sl_3-modules with rectangular highest weights, generalizing a known result for symmetric (or anti-symmetric) tensors.Comment: LaTeX, 22 pages; very minor change

    Functional realization of some elliptic Hamiltonian structures and bosonization of the corresponding quantum algebras

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    We introduce a functional realization of the Hamiltonian structure on the moduli space of P-bundles on the elliptic curve E. Here P is parabolic subgroup in SL_n. We also introduce a construction of the corresponding quantum algebras.Comment: 20 pages, Amstex, minor change

    Geometrical Description of the Local Integrals of Motion of Maxwell-Bloch Equation

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    We represent a classical Maxwell-Bloch equation and related to it positive part of the AKNS hierarchy in geometrical terms. The Maxwell-Bloch evolution is given by an infinitesimal action of a nilpotent subalgebra n+n_+ of affine Lie algebra sl^2\hat {sl}_2 on a Maxwell-Bloch phase space treated as a homogeneous space of n+n_+. A space of local integrals of motion is described using cohomology methods. We show that hamiltonian flows associated to the Maxwell-Bloch local integrals of motion (i.e. positive AKNS flows) are identified with an infinitesimal action of an abelian subalgebra of the nilpotent subalgebra n+n_+ on a Maxwell- Bloch phase space. Possibilities of quantization and latticization of Maxwell-Bloch equation are discussed.Comment: 16 pages, no figures, plain TeX, no macro

    Gaudin model and Deligne's category

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    We show that the construction of the higher Gaudin Hamiltonians associated to the Lie algebra gln\mathfrak{gl}_{n} admits an interpolation to any complex nn. We do this using the Deligne's category Dt\mathcal{D}_{t}, which is a formal way to define the category of finite-dimensional representations of the group GLnGL_{n}, when nn is not necessarily a natural number. We also obtain interpolations to any complex nn of the no-monodromy conditions on a space of differential operators of order nn, which are considered to be a modern form of the Bethe ansatz equations. We prove that the relations in the algebra of higher Gaudin Hamiltonians for complex nn are generated by our interpolations of the no-monodromy conditions. Our constructions allow us to define what it means for a pseudo-deifferential operator to have no monodromy. Motivated by the Bethe ansatz conjecture for the Gaudin model associated with the Lie superalgebra gln∣n′\mathfrak{gl}_{n\vert n'}, we show that a ratio of monodromy-free differential operators is a pseudo-differential operator without monodromy.Comment: 35 page

    Quantum Algebraic Approach to Refined Topological Vertex

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    We establish the equivalence between the refined topological vertex of Iqbal-Kozcaz-Vafa and a certain representation theory of the quantum algebra of type W_{1+infty} introduced by Miki. Our construction involves trivalent intertwining operators Phi and Phi^* associated with triples of the bosonic Fock modules. Resembling the topological vertex, a triple of vectors in Z^2 is attached to each intertwining operator, which satisfy the Calabi-Yau and smoothness conditions. It is shown that certain matrix elements of Phi and Phi^* give the refined topological vertex C_{lambda mu nu}(t,q) of Iqbal-Kozcaz-Vafa. With another choice of basis, we recover the refined topological vertex C_{lambda mu}^nu(q,t) of Awata-Kanno. The gluing factors appears correctly when we consider any compositions of Phi and Phi^*. The spectral parameters attached to Fock spaces play the role of the K"ahler parameters.Comment: 27 page
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