Globally Positive Solutions of Linear Parabolic PDEs of Second Order with Robin Boundary Conditions

We study the limit of the solution of linear and semilinear second order PDEs of parabolic type, with rapidly oscillating periodic coefficients, singular drift, and singular coefficient of the zeroth order term. Our method of proof is fully probabilistic and builds upon the arguments in earlier work

We treat linear partial differential equations of first order with distributional coefficients naturally related to physical conservation laws in the spirit of our Ž . preceding papers which concern ordinary differential equations : the solutions are consistent with the classical ones. Under compati

## Abstract We use rearrangement techniques to investigate the decay of the parabolic Dirichlet problem in a bounded domain. The coefficients of the second order term are used to introduce an isoperimetric problem. The resulting isoperimetric function together with the divergence of the first order

This note deals with linear second-order homogeneous ordinary differential equations associated with linear homogeneous boundary conditions. We find those solutions of the differential equation that satisfy a given boundary condition. Also, we determine the set of all those boundary conditions that