Frobenius norm

Definition

For a matrix with real entries

Suppose $m, n$ are positive integers and $A$ is a $m \times n$ matrix. The Frobenius norm of $A$ , denoted $| A |_{F}$ , can be defined in the following equivalent ways:

It is the square root of the sum of squares of all the entries of $A$ , i.e., it is the sum $\sqrt{\sum_{i = 1}^{m} \sum_{j = 1}^{n} a_{i j}^{2}}$ .
It is the square root of the trace of the $m \times m$ matrix $A A^{T}$ , where $A^{T}$ is the matrix transpose of $A$ .
It is the square root of the trace of the $n \times n$ matrix $A^{T} A$ , where $A^{T}$ is the matrix transpose of $A$ .
It is the square root of the sum of squares of the $min {m, n}$ many singular values of $A$ .

The Frobenius norm is invariant under orthogonal transformations (and in particular, under rotations) and is an easy-to-compute invariant.

For a matrix with complex entries

Suppose $m, n$ are positive integers and $A$ is a $m \times n$ matrix. The Frobenius norm of $A$ , denoted $| A |_{F}$ , can be defined in the following equivalent ways:

It is the square root of the sum of squares of the moduli of the entries of $A$ , i.e., it is the sum $\sum_{i = 1}^{m} \sum_{j = 1}^{n} | a_{i j} |^{2}$ .
It is the square root of the trace of the matrix $A A^{*}$ where $A^{*}$ is the matrix conjugate transpose of $A$ .
It is the square root of the trace of the matrix $A^{*} A$ where $A^{*}$ is the matrix conjugate transpose of $A$ .
It is the square root of the sum of squares of the $min {m, n}$ many singular values of $A$ .