@article{Reich_Zaslavski_2000, title={Infinite products of resolvents of accretive operators}, volume={15}, url={https://apcz.umk.pl/TMNA/article/view/TMNA.2000.012}, abstractNote={We study the space $\mathcal M_m$ of all $m$-accretive operators on a Banach space $X$
endowed with an appropriate complete metrizable uniformity and
the space $\overline{\mathcal M}{}^*_m$ which is the closure in $\mathcal M_m$ of all those operators which have a zero. We show that for a generic operator in $\mathcal M_m$ all infinite products of its resolvents
become eventually close to each other and that a generic operator in $\overline{\mathcal M}{}_m^*$ has
a unique zero and all the infinite products of its resolvents converge
uniformly on bounded subsets of $X$ to this zero.}, number={1}, journal={Topological Methods in Nonlinear Analysis}, author={Reich, Simeon and Zaslavski, Alexander J.}, year={2000}, month={Mar.}, pages={153–168} }