The algebraic Bethe ansatz for scalar products inSU(3)-invariant integrable models

Abstract: We study SU (3)-invariant integrable models solvable by nested algebraic Bethe ansatz. We obtain a determinant representation for the particular case of scalar products of Bethe vectors. This representation can be used for the calculation of form factors and correlation functions of XXX SU (3)-invariant Heisenberg chain.

“…In particular, the transfer matrix action in models with so(3)-symmetry contains similar contributions, however, a determinant representation for the scalar product of on-shell and off-shell vectors is known [34]. It is also worth mentioning that determinant formulas are known for some particular cases of the scalar products in models with gl(3) and gl(2|1) symmetry algebras [35][36][37]. This gives a hope that there is some generalization of our method to the models with higher symmetry rank.…”

Why scalar products in the algebraic Bethe ansatz have determinant representation

“…In particular, the transfer matrix action in models with so(3)-symmetry contains similar contributions, however, a determinant representation for the scalar product of on-shell and off-shell vectors is known [34]. It is also worth mentioning that determinant formulas are known for some particular cases of the scalar products in models with gl(3) and gl(2|1) symmetry algebras [35][36][37]. This gives a hope that there is some generalization of our method to the models with higher symmetry rank.…”

Why scalar products in the algebraic Bethe ansatz have determinant representation

“…No tractable expression, such as a determinant, is known for the corresponding objects in models based on higher rank algebras. For recent progress on this topic, see [16,17].…”

Variations on Slavnov’s scalar product

“…The calculation of scalar product and form factors have been addressed for some specific algebras. The case of the Y (gl 3 ) algebra has been studied in a series of works presenting some explicit forms of Bethe vectors [38], the calculation of their scalar product [39][40][41][42][43] and the expression of the form factors as determinants [44,45]. Results for models based on the deformed version U q ( gl 3 ) have been also obtained: explicit forms of Bethe vectors can be found in [46], their scalar products in [47][48][49] and a determinant expression for scalar products and form factors of diagonal elements was presented in [50].…”

Scalar products and norm of Bethe vectors for integrable models based on $U_q(\widehat{\mathfrak{gl}}_{n})$