English

Identities between q-hypergeometric and hypergeometric integrals of different dimensions

Quantum Algebra 2007-05-23 v3 Mathematical Physics math.MP Representation Theory

Abstract

Given complex numbers m1,l1m_1,l_1 and nonnegative integers m2,l2m_2,l_2, such that m1+m2=l1+l2m_1+m_2=l_1+l_2, for any a,b=0,...,min(m2,l2)a,b=0, ... ,\min(m_2,l_2) we define an l2l_2-dimensional Barnes type q-hypergeometric integral Ia,b(z,μ;m1,m2,l1,l2)I_{a,b}(z,\mu;m_1,m_2,l_1,l_2) and an l2l_2-dimensional hypergeometric integral Ja,b(z,μ;m1,m2,l1,l2)J_{a,b}(z,\mu;m_1,m_2,l_1,l_2). The integrals depend on complex parameters zz and μ\mu. We show that Ia,b(z,μ;m1,m2,l1,l2)I_{a,b}(z,\mu;m_1,m_2,l_1,l_2) equals Ja,b(eμ,z;l1,l2,m1,m2)J_{a,b}(e^\mu,z;l_1,l_2,m_1,m_2) up to an explicit factor, thus establishing an equality of l2l_2-dimensional q-hypergeometric and m2m_2-dimensional hypergeometric integrals. The identity is based on the (glk,gln)(gl_k,gl_n) duality for the qKZ and dynamical difference equations.

Cite

@article{arxiv.math/0309372,
  title  = {Identities between q-hypergeometric and hypergeometric integrals of different dimensions},
  author = {V. Tarasov and A. Varchenko},
  journal= {arXiv preprint arXiv:math/0309372},
  year   = {2007}
}

Comments

Preprint (2003), 14 pages, AmsLaTeX, references updated