Harmonic Analysis and Differential Equations Seminar
- Sponsor
- Department of Mathematics
- Speaker
- Speaker:
- Contact
- Hewan Shemtaga and Olivia Clifton
- hewan@illinois.edu and ocannon2@illinois.edu
- Views
- 40
- Originating Calendar
- Mathematics Seminar Series: Harmonic Analysis and Differential Equations (HADES)
Speaker: Rick Laugesen (UIUC)
Title: Neumann heat kernels and spectral zeta functions by probabilistic mirror coupling
Abstract:
The shape of the Neumann heat kernel p(t,x,y) on the unit ball is more easily visualized than analyzed. And so we examine a conjecture restricted to the spatial diagonal: for fixed t, is p(t,x,x) increasing as a function of r=|x|? That is, for reflected Brownian motion in the ball, does the probability of returning to one’s initial point get higher when that initial point is located closer to the boundary?Laugesen and Morpurgo raised the conjecture 30 years ago and Pascu and Gageonea proved it 15 years ago, for Euclidean space, by an ingenious application of probabilistic mirror coupling (a technique used earlier by Atar and Burdzy for the hot spots problem). We extend the theorem to geodesic balls in hyperbolic space and the hemisphere.
As a corollary, we deduce monotonicity wrt curvature of the Neumann spectral zeta function on a geodesic disk of fixed area — a result previously known only for the first nonzero Neumann eigenvalue.
This talk emphasizes intuition and will be accessible to graduate students.
[Joint with Jing Wang, Purdue University.]