A Combinatorial Interpretation of a General Case of a Fine Identity

A remarkably simple proof is presented for an interesting generalization of a combinatorial identity given recently by L. Vietoris [Monatsh. Math. 97 (1984) 157-160]. It is also shown how this general result can be extended further to hold true for basic (or q-) series.

In this paper the generalized Fibonacci numbers of order k are combinatorially interpreted, in the context of the theory of linear species of Joyal, as the linear species of k-filtering partitions.

A new combinatorial interpretation is presented for generalized Catalan numbers [11], i.e., C¢(~) enumerates the collection of divisions of (~, fi) pints on the circumference of a circle into n~ set of v~-point-groups (1 ~<i ~<k) without "crossing".

In this note we consider a simple problem with Fibonacci numbers and then :llter it:, solution to produce a closed formula for