Mireille Bousquet-Mélou
Published 2008-05-05Version 1
Let A be a class of objects, equipped with an integer size such that for all n the number a(n) of objects of size n is finite. We are interested in the case where the generating fucntion sum_n a(n) t^n is rational, or more generally algebraic. This property has a practical interest, since one can usually say a lot on the numbers a(n), but also a combinatorial one: the rational or algebraic nature of the generating function suggests that the objects have a (possibly hidden) structure, similar to the linear structure of words in the rational case, and to the branching structure of trees in the algebraic case. We describe and illustrate this combinatorial intuition, and discuss its validity. While it seems to be satisfactory in the rational case, it is probably incomplete in the algebraic one. We conclude with open questions.
Overview of some general results in combinatorial enumeration
What is an answer? - remarks, results and problems on PIO formulas in combinatorial enumeration, part I
Polynomial equations with one catalytic variable, algebraic series, and map enumeration
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