30 research outputs found
Representations of affine Lie algebras, elliptic r-matrix systems, and special functions
There were some errors in paper hep-th/9303018 in formulas 6.1, 6.6, 6.8,
6.11. These errors have been corrected in the present version of this paper.
There are also some minor changes in the introduction.Comment: 33 pages, no figure
On the idempotents of Hecke algebras
We give a new construction of primitive idempotents of the Hecke algebras
associated with the symmetric groups. The idempotents are found as evaluated
products of certain rational functions thus providing a new version of the
fusion procedure for the Hecke algebras. We show that the normalization factors
which occur in the procedure are related to the Ocneanu--Markov trace of the
idempotents.Comment: 11 page
Bethe Subalgebras in Twisted Yangians
We study analogues of the Yangian of the Lie algebra for the other
classical Lie algebras and . We call them twisted Yangians. They
are coideal subalgebras in the Yangian of and admit
homomorphisms onto the universal enveloping algebras and
respectively. In every twisted Yangian we construct a family of maximal
commutative subalgebras parametrized by the regular semisimple elements of the
corresponding classical Lie algebra. The images in and of
these subalgebras are also maximal commutative.Comment: 26 pages, amstex, misprints correcte
Matching Higher Conserved Charges for Strings and Spins
We demonstrate that the recently found agreement between one-loop scaling
dimensions of large dimension operators in N=4 gauge theory and energies of
spinning strings on AdS_5 x S^5 extends to the eigenvalues of an infinite
number of hidden higher commuting charges. This dynamical agreement is of a
mathematically highly intricate and non-trivial nature. In particular, on the
gauge side the generating function for the commuting charges is obtained by
integrable quantum spin chain techniques from the thermodynamic density
distribution function of Bethe roots. On the string side the generating
function, containing information to arbitrary loop order, is constructed by
solving exactly the Backlund equations of the integrable classical string sigma
model. Our finding should be an important step towards matching the integrable
structures on the string and gauge side of the AdS/CFT correspondence.Comment: Latex, 33 pages, v2: new section added (completing the analytic proof
that the entire infinite towers of commuting gauge and string charges match);
references adde
Non-diagonal solutions of the reflection equation for the trigonometric vertex model
We obtain a class of non-diagonal solutions of the reflection equation for
the trigonometric vertex model. The solutions can be expressed
in terms of intertwinner matrix and its inverse, which intertwine two
trigonometric R-matrices. In addition to a {\it discrete} (positive integer)
parameter , , the solution contains {\it continuous}
boundary parameters.Comment: Latex file, 14 pages; V2, minor typos corrected and a reference adde
Analytical Bethe ansatz in gl(N) spin chains
We present a global treatment of the analytical Bethe ansatz for gl(N) spin
chains admitting on each site an arbitrary representation. The method applies
for closed and open spin chains, and also to the case of soliton non-preserving
boundaries.Comment: Talk given at Integrable Systems, Prague (Czech Republic), 16--18
June 2005 Integrable Models and Applications, EUCLID meeting, Santiago
(Spain), 12--16 Sept. 200
Exact solution of the trigonometric vertex model with non-diagonal open boundaries
The trigonometric vertex model with {\it generic
non-diagonal} boundaries is studied. The double-row transfer matrix of the
model is diagonalized by algebraic Bethe ansatz method in terms of the
intertwiner and the corresponding face-vertex relation. The eigenvalues and the
corresponding Bethe ansatz equations are obtained.Comment: Latex file, 25 pages; V2: minor typos corrected, the version appears
in JHE
A system of difference equations with elliptic coefficients and Bethe vectors
An elliptic analogue of the deformed Knizhnik-Zamolodchikov equations is
introduced. A solution is given in the form of a Jackson-type integral of Bethe
vectors of the XYZ-type spin chains.Comment: 20 pages, AMS-LaTeX ver.1.1 (amssymb), 15 figures in LaTeX picture
environment
Macdonald Polynomials from Sklyanin Algebras: A Conceptual Basis for the -Adics-Quantum Group Connection
We establish a previously conjectured connection between -adics and
quantum groups. We find in Sklyanin's two parameter elliptic quantum algebra
and its generalizations, the conceptual basis for the Macdonald polynomials,
which ``interpolate'' between the zonal spherical functions of related real and
\--adic symmetric spaces. The elliptic quantum algebras underlie the
\--Baxter models. We show that in the n \air \infty limit, the Jost
function for the scattering of {\em first} level excitations in the
\--Baxter model coincides with the Harish\--Chandra\--like \--function
constructed from the Macdonald polynomials associated to the root system .
The partition function of the \--Baxter model itself is also expressed in
terms of this Macdonald\--Harish\--Chandra\ \--function, albeit in a less
simple way. We relate the two parameters and of the Macdonald
polynomials to the anisotropy and modular parameters of the Baxter model. In
particular the \--adic ``regimes'' in the Macdonald polynomials correspond
to a discrete sequence of XXZ models. We also discuss the possibility of
``\--deforming'' Euler products.Comment: 25 page
Factorization in integrable systems with impurity
This article is based on recent works done in collaboration with M. Mintchev,
E. Ragoucy and P. Sorba. It aims at presenting the latest developments in the
subject of factorization for integrable field theories with a reflecting and
transmitting impurity.Comment: 7 pages; contribution to the XIVth International Colloquium on
Integrable systems, Prague, June 200