Asymptotic Distribution of Residues in Pascal's Triangle mod p

Abstract

Fix a prime p and define Tp(n) to be the number of nonzero residues in the nth row of pascal's triangle mod p, and define φp(n) to be the number of nonzero residues in the first n rows of pascal's triangle mod p. We generalize these to sequences T(n) and φ(n) for a Dirichlet character of modulus p. We prove many properties of these sequences that generalize those of Tp(n) and φp(n). Define An(r) to be the number of occurrences of r in the first n rows of Pascal's triangle mod p. Guy Barat and Peter Grabner showed that for all primes p and nonzero residues r, An(r) 1p-1φp(n). We provide an alternative proof of this fact that yields explicit bounds on the error term. We also discuss the distribution of Ap(r).