Refinements of Lattice paths with flaws

Abstract

The classical Chung-Feller theorem [2] tells us that the number of Dyck paths of length n with m flaws is the n-th Catalan number and independent on m. In this paper, we consider the refinements of Dyck paths with flaws by four parameters, namely peak, valley, double descent and double ascent. Let pn,m,k be the number of all the Dyck paths of semi-length n with m flaws and k peaks. First, we derive the reciprocity theorem for the polynomial Pn,m(x)=Σk=1npn,m,kxk. Then we find the Chung-Feller properties for the sum of pn,m,k and pn,m,n-k. Finally, we provide a Chung-Feller type theorem for Dyck paths of length n with k double ascents: the number of all the Dyck paths of semi-length n with m flaws and k double ascents is equal to the number of all the Dyck paths that have semi-length n, k double ascents and never pass below the x-axis, which is counted by the Narayana number. Let vn,m,k (resp. dn,m,k) be the number of all the Dyck paths of semi-length n with m flaws and k valleys (resp. double descents). Some similar results are derived.