Bendixson's inequality

In mathematics, Bendixson's inequality is a quantitative result in the field of matrices derived by Ivar Bendixson in 1902.^[1] The inequality puts limits on the imaginary parts of Characteristic roots (eigenvalues) of real matrices. A special case of this inequality leads to the result that characteristic roots of a real symmetric matrix are always real.

Mathematically, the inequality is stated as:

Let $A=\left(a_{ij}\right)$ be a real $n\times n$ matrix and $\alpha =\max _{1\leq i,j\leq n}{\frac {1}{2}}\left|a_{ij}-a_{ji}\right|$ . If $\lambda$ is any characteristic root of $A$ , then

\left|\operatorname {Im} (\lambda )\right|\leq \alpha {\sqrt {\frac {n(n-1)}{2}}}.\,{}

^[2]

If $A$ is symmetric then $\alpha =0$ and consequently the inequality implies that $\lambda$ must be real.

References[]

^ Mirsky, L. (3 December 2012). An Introduction to Linear Algebra. p. 210. ISBN 9780486166445. Retrieved 14 October 2018.
^ Axelsson, Owe (29 March 1996). Iterative Solution Methods. p. 633. ISBN 9780521555692. Retrieved 14 October 2018.

[1] Mirsky, L. (3 December 2012). An Introduction to Linear Algebra. p. 210. ISBN 9780486166445. Retrieved 14 October 2018.

[2] Axelsson, Owe (29 March 1996). Iterative Solution Methods. p. 633. ISBN 9780521555692. Retrieved 14 October 2018.

[1]

[2]

Bendixson's inequality

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