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  Fermionic anti-commutation relations

+ 3 like - 0 dislike
5069 views

For Pauli's exclusion principle to be followed by fermions, we need these anti-commutators $$[a_{\lambda},a_{\lambda}]_+=0 $$ and $$[a_{\lambda}^{\dagger},a_{\lambda}^{\dagger}]_+=0 $$ Then $$n_{\lambda}^{2}=a_{\lambda}^{\dagger}a_{\lambda}a_{\lambda}^{\dagger}a_{\lambda}=a_{\lambda}^{\dagger}\left(1-a_{\lambda}^{\dagger}a_{\lambda}\right)a_{\lambda}=a_{\lambda}^{\dagger}a_{\lambda}=n_{\lambda}.$$ which gives $ n_{\lambda}=0,1 $. Here we used the anti-commutator $$[a_{\lambda},a_{\lambda^{\prime}}^{\dagger}]_+= \delta_{\lambda,\lambda^{\prime}} $$ But we could have used even a commutator instead of the anti-commutator and still got the same result i.e. if we choose $[a_{\lambda},a_{\lambda^{\prime}}^{\dagger}]_{-}=\delta_{\lambda,\lambda^{\prime}} $ then $n_{\lambda}^{2}=a_{\lambda}^{\dagger}a_{\lambda}a_{\lambda}^{\dagger}a_{\lambda}=a_{\lambda}^{\dagger}\left(1+a_{\lambda}^{\dagger}a_{\lambda}\right)a_{\lambda}=a_{\lambda}^{\dagger}a_{\lambda}=n_{\lambda} $ which also gives $n_{\lambda}=0,1 $
What conditions make us impose the last anti-commutation relation $$[a_{\lambda},a_{\lambda^{\prime}}^{\dagger}]_+= \delta_{\lambda,\lambda^{\prime}} $$ instead of $[a_{\lambda},a_{\lambda^{\prime}}^{\dagger}]_{-}=\delta_{\lambda,\lambda^{\prime}} $ ?

I mean, we do not need all relations to be anti-commuting. I can take 2 of them to be anti-commuting but the third one i.e. relation between creation and annihilation operator to be commuting and still maintain the Pauli's exclusion

This post imported from StackExchange Physics at 2014-05-04 11:38 (UCT), posted by SE-user cleanplay
asked Sep 15, 2013 in Theoretical Physics by cleanplay (80 points) [ no revision ]
Perhaps my eyes are deceiving me, but it seems that you actually used the anti-commutator you were wondering about in your second equality after "because."

This post imported from StackExchange Physics at 2014-05-04 11:38 (UCT), posted by SE-user joshphysics
@joshphysics made the change. I mean, I could have used even a commutator instead the anti-commutator and still got the same result

This post imported from StackExchange Physics at 2014-05-04 11:38 (UCT), posted by SE-user cleanplay
Related: physics.stackexchange.com/q/17893/2451

This post imported from StackExchange Physics at 2014-05-04 11:38 (UCT), posted by SE-user Qmechanic
@Qmechanic : thanks, though it addresses the question but it is a bit vague for me.

This post imported from StackExchange Physics at 2014-05-04 11:38 (UCT), posted by SE-user cleanplay

3 Answers

+ 3 like - 0 dislike

We need it because we want the "occupied" state to have $n_\lambda=1$; I will omit the $\lambda$ argument everywhere. In other words, we need $$ n a^\dagger |0\rangle \equiv a^\dagger a a^\dagger |0\rangle = 1\cdot a^\dagger $$ But the left hand side has the operator that is $$a^\dagger a a^\dagger |0\rangle = a^\dagger ([a,a^\dagger]_+ - a^\dagger a) = a^\dagger [a,a^\dagger]_+ $$ where the last term was dropped in the last term because $(a^\dagger)^2=0$. So we demand $$a^\dagger[a,a^\dagger]_+ |0\rangle = a^\dagger|0\rangle.$$ In combination with your other conditions, this is only possible if the anticommutator is one – we may "cancel" the $|0\rangle$ ket vector because a similar condition may be derived for $|1\rangle$ as the ket vector.

This post imported from StackExchange Physics at 2014-05-04 11:38 (UCT), posted by SE-user Luboš Motl
answered Sep 15, 2013 by Luboš Motl (10,278 points) [ no revision ]
@Motl I mean we could also use the commutator $ [a_{\lambda},a_{\lambda^{\prime}}^{\dagger}]_{-}=\delta_{\lambda,\lambda^{\prime‌​}} $ and still get the same result. Why should I use only the anti-commutator ? I can use the anti-commutators $$[a_{\lambda},a_{\lambda}]_+=0 $$ and $$[a_{\lambda}^{\dagger},a_{\lambda}^{\dagger}]_+=0, $$ along with $$ [a_{\lambda},a_{\lambda^{\prime}}^{\dagger}]_{-}=\delta_{\lambda,\lambda^{\prime‌​}} $$

This post imported from StackExchange Physics at 2014-05-04 11:38 (UCT), posted by SE-user cleanplay
+ 3 like - 0 dislike

Suppose $a$ and $a^{+}$ operators satisfy $$ \left\{ a,a\right\} =0\mbox{ and }\left[a,a^{+}\right]=1 $$ We have basically $a^{2}=0$ and $aa^{+}=a^{+}a+1$.

Now consider $aaa^{+}$.

$$ 0=aaa^{+}=a\left(a^{+}a+1\right)=aa^{+}a+a=a^{+}aa+2a=2a. $$

So we get $a=0$.

This post imported from StackExchange Physics at 2014-05-04 11:38 (UCT), posted by SE-user Louis Yang
answered Mar 7, 2014 by Louis Yang (90 points) [ no revision ]
+ 1 like - 0 dislike

You are obviously wrong.

When you have operators with anti-commutation relations, you have :

$${a^+}_\lambda {a^+}_{\lambda'} + {a^+}_{\lambda'} {a^+}_{\lambda} = 0 \tag{1}$$

Taking $\lambda = \lambda'$, you get :

$${a^+}_\lambda {a^+}_{\lambda} = 0 \tag{2}$$

If you have operators with commutation relations, you have :

$${a^+}_\lambda {a^+}_{\lambda'} - {a^+}_{\lambda'} {a^+}_{\lambda} = 0 \tag{3}$$

Taking $\lambda = \lambda'$, you get :

$${a^+}_\lambda {a^+}_{\lambda} - {a^+}_{\lambda} {a^+}_{\lambda} = 0 \tag{4}$$ which is a trivial equation ($x=x$)

So, it is not true, with commutation relations, that you have : ${a^+}_\lambda {a^+}_{\lambda} = 0$, so your equation $n_\lambda ^2=n_\lambda$ is obviously false for operators with commutations relations.

This post imported from StackExchange Physics at 2014-05-04 11:38 (UCT), posted by SE-user Trimok
answered Sep 15, 2013 by Trimok (955 points) [ no revision ]
My question is only about the last anti-commutation relation which you did not use in your proof. I understand that you need the two anti-commutation relations that you have used, in order to prove the Pauli's exclusion principle. My question is on what basis we choose the third relation i.e the relation of the creation and annihilation operator to be of anti-commutator type and not commutator type. Read my comment in response to Lubos Motl's answer.

This post imported from StackExchange Physics at 2014-05-04 11:38 (UCT), posted by SE-user cleanplay
@cleanplay : This is an other question... In short, this has to do with the spin-statistics theorem. For instance, in quantum field theory, if you write the hamiltonian for a fermionic field (for instance a Dirac field), you will find something like $H = \sum_k (b^+_kb_k - d_kd^+_k)$ ($b$ concerns particles and $d$ concerns anti-particles). But this hamiltonian has to be bounded below, and you have to choose anti-commutation relations, to have $H = \sum_k (b^+_kb_k + d^+_k d_k)$, up to a (infinite) constant.

This post imported from StackExchange Physics at 2014-05-04 11:38 (UCT), posted by SE-user Trimok

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