Taylor expansions for Catalan and Motzkin numbers
نویسندگان
چکیده
In this paper we introduce two new expansions for the generating functions of Catalan numbers and Motzkin numbers. The novelty of the expansions comes from writing the Taylor remainder as a functional of the generating function. We give combinatorial interpretations of the coefficients of these two expansions and derive several new results. These findings can be used to prove some old formulae associated with Catalan and Motzkin numbers. In particular, our expansion for Catalan number provides a simple proof of the classic Chung–Feller theorem; similar result for the Motzkin paths with flaws is also given. 2002 Elsevier Science (USA). All rights reserved.
منابع مشابه
Parametric Catalan Numbers and Catalan Triangles
Here presented a generalization of Catalan numbers and Catalan triangles associated with two parameters based on the sequence characterization of Bell-type Riordan arrays. Among the generalized Catalan numbers, a class of large generalized Catalan numbers and a class of small generalized Catalan numbers are defined, which can be considered as an extension of large Schröder numbers and small Sch...
متن کاملTaylor expansions for the m-Catalan numbers
By a Taylor expansion of a generating function, we mean that the remainder of the expansion is a functional of the generating function itself. In this paper, we consider the Taylor expansion for the generating function Bm(t) of them-Catalan numbers. In order to give combinatorial interpretations of the coefficients of these expansions, we study a new collection of partial Grand Dyck paths, that...
متن کاملSeveral Explicit and Recursive Formulas for the Generalized Motzkin Numbers
In the paper, the authors find two explicit formulas and recover a recursive formula for the generalized Motzkin numbers. Consequently, the authors deduce two explicit formulas and a recursive formula for the Motzkin numbers, the Catalan numbers, and the restricted hexagonal numbers respectively.
متن کامل2000]Primary 11B68, 11B75; Secondary 11M06 TANGENT AND BERNOULLI NUMBERS RELATED TO MOTZKIN AND CATALAN NUMBERS BY MEANS OF NUMERICAL TRIANGLES
It is shown that Bernoulli numbers and tangent numbers (the derivatives of the tangent funcion at 0) can be obtained by means of easily defined triangles of numbers in several ways, some of them very similar to the Catalan triangle and a Motzkin-like triangle. Our starting point in order to show this is a new expression of ζ(2n) involving Motzkin paths.
متن کاملA Classification of Motzkin Numbers Modulo 8
The well-known Motzkin numbers were conjectured by Deutsch and Sagan to be nonzero modulo 8. The conjecture was first proved by Sen-Peng Eu, Shu-chung Liu and Yeong-Nan Yeh by using the factorial representation of the Catalan numbers. We present a short proof by finding a recursive formula for Motzkin numbers modulo 8. Moreover, such a recursion leads to a full classification of Motzkin numbers...
متن کاملذخیره در منابع من
با ذخیره ی این منبع در منابع من، دسترسی به آن را برای استفاده های بعدی آسان تر کنید
عنوان ژورنال:
دوره شماره
صفحات -
تاریخ انتشار 2002