用Tutte不变法计算象限行走数(扩展摘要)

IF 0.7 4区 数学
Olivier Bernardi, Mireille Bousquet-M'elou, K. Raschel
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引用次数: 42

摘要

在温哥华FPSAC 2016会议上发表的扩展摘要。在20世纪70年代,Tutte开发了一种聪明的代数方法,基于某些“不变量”,来解决在枚举适当着色的三角形中出现的函数方程。限制在第一象限的平面点阵行走的枚举由类似的方程控制,并且在过去十年中导致了处理相关生成函数的性质(代数,d有限或非)的丰富的有吸引力的结果集合,这取决于允许的步骤集。我们首先采用Tutte的方法来证明(或重新证明)所有已知或推测为代数的象限模型的代数性(除了一个小例外)。这包括格塞尔著名的模型,以及第一个用加权步骤证明一个模型的方法。为了适用,该方法要求存在两个分别称为不变函数和解耦函数的有理函数。当它们存在时,代数性(几乎)自动产生。然后,我们转向已经被证明非常强大的解析观点,特别是在非d -有限情况下生成函数的积分表达式,以及非d -有限的证明。在这种情况下,我们发展了一个较弱的不变性概念。现在所有的象限模型都有不变量,对于那些附加了解耦函数的模型,我们得到了生成函数的无积分表达式,并证明了这个级数是微分代数的(即满足非线性微分方程)。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Counting quadrant walks via Tutte's invariant method (extended abstract)
Extended abstract presented at the conference FPSAC 2016, Vancouver. International audience In the 1970s, Tutte developed a clever algebraic approach, based on certain " invariants " , to solve a functional equation that arises in the enumeration of properly colored triangulations. The enumeration of plane lattice walks confined to the first quadrant is governed by similar equations, and has led in the past decade to a rich collection of attractive results dealing with the nature (algebraic, D-finite or not) of the associated generating function, depending on the set of allowed steps. We first adapt Tutte's approach to prove (or reprove) the algebraicity of all quadrant models known or conjectured to be algebraic (with one small exception). This includes Gessel's famous model, and the first proof ever found for one model with weighted steps. To be applicable, the method requires the existence of two rational functions called invariant and decoupling function respectively. When they exist, algebraicity comes out (almost) automatically. Then, we move to an analytic viewpoint which has already proved very powerful, leading in particular to integral expressions of the generating function in the non-D-finite cases, as well as to proofs of non-D-finiteness. We develop in this context a weaker notion of invariant. Now all quadrant models have invariants, and for those that have in addition a decoupling function, we obtain integral-free expressions of the generating function, and a proof that this series is differentially algebraic (that is, satisfies a non-linear differential equation).
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来源期刊
自引率
14.30%
发文量
39
期刊介绍: DMTCS is a open access scientic journal that is online since 1998. We are member of the Free Journal Network. Sections of DMTCS Analysis of Algorithms Automata, Logic and Semantics Combinatorics Discrete Algorithms Distributed Computing and Networking Graph Theory.
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