Proving a Theorem, related to Gerschgorin

syj · Sep 21, 2011

Homework Statement

Here is the theorem I need to prove:

For A=(a_ij)\inC_nxn

we have

p(A)\leqmax_{i}\Sigma^{n}_{j=1}|a_ij|

Homework Equations

The Attempt at a Solution

I have no idea how to go about this. :cry:

CompuChip · Sep 21, 2011

Some definitions might be nice.
What is C_{n \times n}? What is p(A)? What does i run over?

syj · Sep 21, 2011

Sorry,
C_nxn is the set of nxn matrices with entries in the complex number system.

p(A)= max{|\lambda₁|, |\lambda₂|, ...}

p(A) is the smallest circle in the comple plane, centered at the origin, which contains all the characteristic values of A.

CompuChip · Sep 21, 2011

Maybe it's a good idea to start with the simple case, where A is diagonalizable.

Proving a Theorem, related to Gerschgorin

Homework Statement

Homework Equations

The Attempt at a Solution

Thread 'Prove that the integral is equal to ##\pi^2/8##'

Similar threads

Hot Threads

Prove that the integral is equal to ##\pi^2/8##

Calculating radius of gyration of plane figure about x-axis

Solve this problem that involves induction

The volume of a "spherical cap" using triple integrals

Finding the modulus and argument of ##\dfrac{a}{(b±ci)^n}##

Recent Insights

Insights Why Entangled Photon-Polarization Qubits Violate Bell’s Inequality

Insights Quantum Entanglement is a Kinematic Fact, not a Dynamical Effect

Insights What Exactly is Dirac’s Delta Function? - Insight

Insights Relativator (Circular Slide-Rule): Simulated with Desmos - Insight

Insights Fixing Things Which Can Go Wrong With Complex Numbers

Insights Fermat's Last Theorem