Propagation of Gibbsianness for Infinite-dimensional Gradient Brownian Diffusions

We prove uniqueness of "invariant measures," i.e., solutions to the equation L \* µ = 0 where L = ∆ + B • ∇ on R n with B satisfying some mild integrability conditions and µ being a probability measure on R n . This solves an open problem posed by S. R. S. Varadhan in 1980. The same conditions are s

## Abstract Hardware‐related delays between the requested and actual start times of the gradient waveforms on each physical axis are of particular importance for multidimensional selective excitation in which the synchronization of gradient and radiofrequency (RF) waveforms is critical. A method is

The system with two fluxes, a solvent substance and a heat flux is considered. The analytical solution 'of the diffusion equation for an extended source of infinite extent for a steady heat flux and constant temperature gradient for a short time and coordinates along which the thermodiffusion proces