Jacobi-Type Continued Fractions and Congruences for Binomial Coefficients Modulo Integers h ≥ 2

Abstract

We prove two new forms of Jacobi-type J-fraction expansions generating the binomial coefficients, x+nn and xn, over all n ≥ 0. Within the article we establish new forms of integer congruences for these binomial coefficient variations modulo any (prime or composite) h ≥ 2 and compare our results with existing known congruences for the binomial coefficients modulo primes p and prime powers pk. We also prove new exact formulas for these binomial coefficient cases from the expansions of the hth convergent functions to the infinite J-fraction series generating these coefficients for all n.