Publication at Faculty of Mathematics and Physics |
2008
Abstract
We prove that every Borel bimeasurable mapping can be decomposed to a $\sigma$-discrete family of extended Borel isomorphisms and a mapping with a $\sigma$-discrete range.
We prove that every Borel bimeasurable mapping can be decomposed to a $\sigma$-discrete family of extended Borel isomorphisms and a mapping with a $\sigma$-discrete range.