Generalized set of Pauli elements for a basis for the linear transformations on the vector space

2

I have been doing some practice problems from "Gentle introduction to Quantum Computing". I am a little bit lost with this one:

The generalized Pauli group $\mathcal G_n$ is defined by all elements of $\mathcal G_n$ being of the form $\mu A_1\otimes A_2 \otimes \ldots\otimes A_n$ where $A_j\in\left\lbrace I, X, Y, Z\right\rbrace$ and $\mu\in\left\lbrace 1, i, -1, -i\right\rbrace$.

Show that generalized set of Pauli elements for a basis for the linear transformations on the vector space associated with an n-qubit system.

Is there any formal proof for this problem? And how do I approach it?

olliej4

Posted 2020-05-29T21:00:15.010

Reputation: 21

Question was closed 2020-06-03T18:50:45.077

1+1. But what is meant here by "THE generalized set of Pauli elements"? – user1271772 – 2020-05-29T21:39:48.963

No answers