Levi-Civita Identity Proof Help (εijk εijl = 2δkl)

John Delaney · Oct 16, 2019

I assumed that this would be a straightforward proof, as I could just make the substitution l=j and m=l, but upon doing this, I end up with:

δjj δkl - δjl δkj

= δkl - δlk

Clearly I did not take the right approach in this proof and have no clue as to how to proceed.

Antarres · Oct 16, 2019

Well you are right that you can do it just by making a 'substitution'. However, bear in mind that summation convention is in use here. You have to sum over the indices that are repeating. With that, you should be able to get the right result.

John Delaney · Oct 16, 2019

Antarres said:

Well you are right that you can do it just by making a 'substitution'. However, bear in mind that summation convention is in use here. You have to sum over the indices that are repeating. With that, you should be able to get the right result.

Thank you for the reminder, completely forgot that δjj = 3 rather than 1.

Levi-Civita Identity Proof Help (εijk εijl = 2δkl)

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