Definition

The Frobenius norm of a matrix is defined as:

Alternatively:

where:

  • is the trace operator,
  • ,
  • are the singular values of .

Properties

  1. Non-Negativity:
    , with equality only if .

  2. Scaling:
    for .

  3. Triangle Inequality:
    .

  4. Unitary Invariance:
    For unitary and , .

  5. Relation to Vector Norm:
    Treating as a vector by concatenating rows or columns gives:


Examples

Example 1: Frobenius Norm of a Small Matrix

Let:

Compute:


Example 2: Using Singular Values

For with singular values and :