Lattice Paths and Uniform Partitions

Aug 13, 2012

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2. Online. Part I. Functions of uniform-partition typePart II. A characterization of cyclic permutations of a sequencePart III. Refinements of the Chung-Feller TheoremPart IV. Combinatorial interpretations for a class of function equations. 3. Part I. Functions of uniform-partition type Dyck path

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Lattice Paths and Uniform Partitions

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1. 1 Lattice Paths and Uniform Partitions Coauthors: Po-yi Huang, Shu-Chung Liu , Jun Ma,Yi Wang Speaker: Yeong-Nan Yeh Institute of Mathematics, Academia Sinica, Taipei, 2011

2. 2 Online Part I. Functions of uniform-partition type Part II. A characterization of cyclic permutations of a sequence Part III. Refinements of the Chung-Feller Theorem Part IV. Combinatorial interpretations for a class of function equations

3. 3 Part I. Functions of uniform-partition typeDyck paths An n-Dyck path is a lattice path from (0,0) to (2n,0) in the plane integer lattice Z x Z consisting of up-step (1,1) and down-step (1,-1).

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