Diagonability of matrices over commutative semirings - Details

author：

Tan, Y.-J. (Tan, Y.-J..) ^[1]

Indexed by：

Scopus

Abstract：

A　square　matrix　is　said　to　be　diagonalizable　if　it　is　similar　to　a　diagonal　matrix.　In　this　paper,　we　discuss　diagonability　of　matrices　over　commutative　semirings　and　give　an　equivalent　condition　for　an　idempotent　matrix　over　a　commutative　semiring　to　be　diagonalizable.　Also,　we　obtain　an　equivalent　description　for　a　matrix　over　a　multiplicatively　cancellative　and　commutative　semiring　to　be　diagonalizable.　©　2018,　©　2018　Informa　UK　Limited,　trading　as　Taylor　&　Francis　Group.

Keyword：

15A21; 16Y60; commutative semiring; diagonalization; idempotent matrix; J F Queiro; Matrix

Community：

[ 1 ] [Tan, Y.-J.]Department of Mathematics, Fuzhou University, Fuzhou, China

Reprint 's Address：

[Tan, Y.-J.]Department of Mathematics, Fuzhou UniversityChina

Email：

yjtan62@126.com

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Source ：

Linear and Multilinear Algebra

ISSN： 0308-1087

Year： 2018

Issue： 9

Volume： 68

Page： 1743-1752

0 . 9 6 4

JCR@2018

0 . 9 0 0

JCR@2023

ESI HC Threshold：68

JCR Journal Grade：2

CAS Journal Grade：3

Cited Count：

WoS CC Cited Count：

SCOPUS Cited Count： 1

ESI Highly Cited Papers on the List： 0 Unfold All

WanFang Cited Count：

Chinese Cited Count：

30 Days PV： 0

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