Conjectural duality for iterated q-integrals on P1 minus four generic points

Abstract

We propose a conjectural q-analogue of the classical duality for iterated integrals on P1 minus four points, arising from the involutive M\"obius transformation which exchanges the four marked points in pairs. To this end, we introduce iterated q-integrals with position-dependent q-shifts of the parameters and define a functional on admissible words in the six pairwise letters. The conjecture states that this functional is invariant under a natural anti-automorphism of the word algebra. We relate the conjecture to Yamamoto's duality for one-variable multiple q-polylogarithms. Finally, we prove the conjecture in several special cases.