## Speaker:

Shiwen Zhang

## Institution:

U Minnesota

## Time:

Wednesday, May 18, 2022 - 2:00pm to 3:00pm

## Location:

440R

we study 1-d random Schrödinger operators on a finite interval with Dirichlet boundary conditions. We are interested in the approximation of the ground state energy using the minimum of the effective potential. For the 1-d continuous Anderson Bernoulli model, we show that the ratio of the ground state energy and the minimum of the effective potential approaches

*π*^2/8