Affiliation:
1. Ghent University
2. Institute of Physics, University of Amsterdam
Abstract
We present the inner products of eigenstates in integrable
Richardson-Gaudin models from two different perspectives and derive two
classes of Gaudin-like determinant expressions for such inner products.
The requirement that one of the states is on-shell arises naturally by
demanding that a state has a dual representation. By implicitly
combining these different representations, inner products can be recast
as domain wall boundary partition functions. The structure of all
involved matrices in terms of Cauchy matrices is made explicit and used
to show how one of the classes returns the Slavnov determinant
formula.Furthermore, this framework provides a further connection between two
different approaches for integrable models, one in which everything is
expressed in terms of rapidities satisfying Bethe equations, and one in
which everything is expressed in terms of the eigenvalues of conserved
charges, satisfying quadratic equations.
Funder
Fonds Wetenschappelijk Onderzoek
Subject
General Physics and Astronomy
Cited by
25 articles.
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