Motzkin numbers and related sequences modulo powers of 2

Abstract

We show that the generating function Σn0Mn\,zn for Motzkin numbers Mn, when coefficients are reduced modulo a given power of 2, can be expressed as a polynomial in the basic series Σ e0 z4e/( 1-z2· 4e) with coefficients being Laurent polynomials in z and 1-z. We use this result to determine Mn modulo 8 in terms of the binary digits of~n, thus improving, respectively complementing earlier results by Eu, Liu and Yeh [Europ. J. Combin. 29 (2008), 1449-1466] and by Rowland and Yassawi [J. Th\'eorie Nombres Bordeaux 27 (2015), 245-288]. Analogous results are also shown to hold for related combinatorial sequences, namely for the Motzkin prefix numbers, Riordan numbers, central trinomial coefficients, and for the sequence of hex tree numbers.