Elliptic hypergeometric function and 6j-symbols for the SL(2,C) group

Abstract

We show that the complex hypergeometric function describing 6j-symbols for SL(2,C) group is a special degeneration of the V-function -- an elliptic analogue of the Euler-Gauss 2F1 hypergeometric function. For this function, we derive mixed difference-recurrence relations as limiting forms of the elliptic hypergeometric equation and some symmetry transformations. At the intermediate steps of computations, there emerge a function describing the 6j-symbols for the Faddeev modular double and the corresponding difference equations and symmetry transformations.