Definition:Matrix Similarity

Definition
Let $R$ be a ring with unity.

Let $n\geq1$ be a natural number.

Let $\mathbf A, \mathbf B$ be square matrices of order $n$ over $R$.

Let there exist an invertible square matrix $\mathbf P$ of order $n$ over $R$ such that $\mathbf B = \mathbf P^{-1} \mathbf A \mathbf P$.

Then $\mathbf A$ and $\mathbf B$ are similar, and we can write $\mathbf A \sim \mathbf B$.

Thus, from the corollary to Change of Basis Matrix under Linear Transformation, two matrices are similar they are the matrices of the same linear operator, relative to (possibly) different ordered bases.

Also see

 * Definition:Matrix Equivalence
 * Definition:Matrix Congruence


 * Change of Basis Matrix under Linear Transformation/Corollary