Combinatorial study of the q-Catalan triangle and its generalizations

Abstract

We announce a series of results on the combinatorial study of the q-Catalan triangle (Cn,k(q)), defined by Cn,0(q)=qn(n-1)/2 and Cn,k(q)=Cn,k-1(q)+qn-k-1Cn-1,k(q). We establish combinatorial interpretations via a universal combinatorial family of seven components: four families of pattern-avoiding permutations weighted by inversion or co-inversion statistics, Dyck paths, binary words and triangulations. We introduce the mirror polynomial C-tilden,k(q)=qn(n-1)/2Cn,k(q-1), prove its dual recurrence and co-inversion interpretation. The q,p-Catalan triangle and a multivariate generalization opening the way to cyclotomic q-analogues are introduced. Theorems on the q-Catalan triangle via 312-avoiding permutations and the mirror recurrence are proved completely here. This is the first paper of series W0-W5 on classical and q-deformed interpretations of the Catalan triangle.