In my talk I consider weakly null sequences in the Banach
space of functions of bounded variation $BV(R^d)$. I will show that for
any such sequence ${f_n}$ the jump parts of the gradients of functions
$f_n$ tend to 0 strongly as measures.This resembles the well known Schur
property enjoyed e.g. by the space $\ell^1$. During the talk I will
briefly discuss our motivation and present the proof. Talk is based on a
joint work with A. Tselishchev and M. Wojciechowski.
Meeting-ID: 928 5819 3267
Password: 440719