Basar, FeyziRoopaei, Hadi2024-08-042024-08-0420210139-99181337-2211https://doi.org/10.1515/ms-2021-0059https://hdl.handle.net/11616/100382Let F denote the factorable matrix and X is an element of {l(p), c(0), c, l(infinity)}. In this study, we introduce the domains X(F) of the factorable matrix in the spaces X. Also, we give the bases and determine the alpha-, beta- and gamma-duals of the spaces X(F). We obtain the necessary and sufficient conditions on an infinite matrix belonging to the classes (l(p)(F), l(infinity)), (l(p)(F), f) and (X, Y(F)) of matrix transformations, where Y denotes any given sequence space. Furthermore, we give the necessary and sufficient conditions for factorizing an operator based on the matrix F and derive two factorizations for the Cesaro and Hilbert matrices based on the Gamma matrix. Additionally, we investigate the norm of operators on the domain of the matrix F. Finally, we find the norm of Hilbert operators on some sequence spaces and deal with the lower bound of operators on the domain of the factorable matrix.eninfo:eu-repo/semantics/closedAccessdomain of factorable matrixalmost convergenceweighted mean matrixHilbert matrixgamma matrixCesaro matrixArticle7161375140010.1515/ms-2021-00592-s2.0-85121836957Q2WOS:000736982100004Q2