Approximation methods for nonlinear eigenvalue problems - Erik Lindgren (KTH Royal Institute of Technology, Sweden)
Event details
When
May 10, 2017
from 12:00 PM to 01:00 PM
from 12:00 PM to 01:00 PM
Where
Dipartimento di Matematica e Informatica - Aula 3
Contact Name
Michele Miranda
Abstract
In this talk, I will discuss two novel methods for approximating extremals of "nonlinear" Rayleigh quotients. The first approximation scheme is based on the method of inverse iteration for square matrices. The second method is based on the large time behavior of solutions of a doubly nonlinear evolution, corresponding to the heat equation in the case of the eigenvalue problem for the Laplace operator. Both schemes have the property that the Rayleigh quotient is nonincreasing along solutions and that properly scaled solutions converge to an extremal of the Rayleigh quotient. I will focus on concrete examples in Sobolev spaces where our results apply. The talk is based on joint work with Ryan Hynd (University of Pennsylvania).