Home » Subject » Algebra
Importance: Medium ✭✭
Author(s):
Subject: Algebra
Keywords:
Recomm. for undergrads: no
Posted by: Miwa Lin
on: October 11th, 2008
Solved by: two commenters to the problem

Gersgorin theorem states that: all the eigenvalues of $ A=[a_{ij}]\in M_n $ are located in the union of $ n $ discs $ \bigcup\limits_{i=1}^n\{z\in C:|z-a_{ii}|\leq \sum\limits_{j=1,j\neq i}^n|a_{ij}|\} $. For some special matrices, the region can be confined to $ \bigcup\limits_{i=1}^n\{z\in C:|z-a_{ii}|\leq \sum\limits_{j=1,j\neq i}^n|a_{ij}|\}\backslash\{z\in C:|z-a_{kk}|<\sum\limits_{j=1,j\neq k}^n|a_{kj}|\} $ for some $ k $. I wonder if the new region above is valid in general?


Bibliography



* indicates original appearance(s) of problem.
3 comments

Reply

Comments are limited to a maximum of 1000 characters.
More information about formatting options