Asymptotics of multivariate sequences

Authors

Assistant Professor Mark Wilson, Department of Mathematical Sciences, University of Montana, Missoula

Document Type

Presentation Abstract

Presentation Date

3-30-2000

Abstract

Sequences (a_n) of complex numbers (usually integers) indexed by lattice points in the positive orthant of R^d are ubiquitous in mathematics, particularly in counting problems and discrete probability. For many purposes, it is desirable to understand the asymptotic behavior of a_n as n approaches infinity.

Analytic methods involving the study of the sequence's generating function have proven to be very powerful when d=1. Surprisingly, analogous techniques for several variables are almost entirely missing from the literature.

I will report on a major ongoing project with Robin Pemantle (Ohio State) which aims to create a decent multivariate theory. I will outline the basic problem, our approach and some results to date. Several examples will be discussed.

Additional Details

Thursday, 30 March 2000
4:10 p.m. in Math 109
Coffee/treats at 3:30 p.m. Math 104 (lounge)

Recommended Citation

Wilson, Assistant Professor Mark, "Asymptotics of multivariate sequences" (2000). Colloquia of the Department of Mathematical Sciences. 62.
https://scholarworks.umt.edu/mathcolloquia/62