Difference Operators and Duality for Trigonometric Gaudin and Dynamical Hamiltonians

Abstract

We study the difference analog of the quotient differential operator from [Tarasov V., Uvarov F., Lett. Math. Phys. 110 (2020), 3375-3400, arXiv:1907.02117]. Starting with a space of quasi-exponentials W= αixpij(x),\, i=1,…, n,\, j=1,…, ni, where αi∈ C* and pij(x) are polynomials, we consider the formal conjugate SW of the quotient difference operator SW satisfying S =SWSW. Here, SW is a linear difference operator of order W annihilating W, and S is a linear difference operator with constant coefficients depending on αi and pij(x) only. We construct a space of quasi-exponentials of dimension ord SW, which is annihilated by SW and describe its basis and discrete exponents. We also consider a similar construction for differential operators associated with spaces of quasi-polynomials, which are linear combinations of functions of the form xzq(x), where z∈ C and q(x) is a polynomial. Combining our results with the results on the bispectral duality obtained in [Mukhin E., Tarasov V., Varchenko A., Adv. Math. 218 (2008), 216-265, arXiv:math.QA/0605172], we relate the construction of the quotient difference operator to the (glk,gln)-duality of the trigonometric Gaudin Hamiltonians and trigonometric dynamical Hamiltonians acting on the space of polynomials in kn anticommuting variables.