%0 Journal Article
%T Linear Preservers (strong) g- Tridiagonal and g- upper triangular majorization R^n
%A Aryamanesh. S
%J specialty journal of engineering and applied science
%@ 2520-5943
%D 2019
%V 4
%N 2
%P 82-90
%X In this article, we study the conditions that if there is a g- tridiagonaly doubly stochastic matrix for x=Ay.x.y∈R^n, Then we call x as the g-tridiagonal majorized by y and represent all strong linear preservers of ≺gut on R^n and in addition, we check that if X.Y∈ M_(n.m) are two elements of the set of n × m matrices, then there is the upper triangular g-row stochastic matrix R where it represents X = RY and some ≺gut prerequisites on R^n and it reviews linear preservers )strong) of ≺gut on R^n.
%U https://sciarena.com/article/linear-preservers-strong-g-tridiagonal-and-g-upper-triangular-majorization-rn