Supercongruences for sums involving Domb numbers

Abstract

We prove some supercongruence and divisibility results on sums involving Domb numbers, which confirm four conjectures of Z.-W. Sun and Z.-H. Sun. For instance, by using a transformation formula due to Chan and Zudilin, we show that for any prime p 5, align* Σk=0p-13k+1(-32)k Domb(k) (-1)p-12p+p3Ep-3 p4, align* which is regarded as a p-adic analogue of the following interesting formula for 1/π due to Rogers: align* Σk=0∞3k+1(-32)k Domb(k)=2π. align* Here Domb(n) and En are the famous Domb numbers and Euler numbers.