Viewing topic: Diagonalizable

See sub-topics for Diagonalizable ... >> Mathematics >> Linear Algebra >> Diagonalizable

Highest Rated Sign

No video has been submitted for this term

Nobody has posted a sign yet.

Diagonalizable

  • Definition: An nXn matrix A is diagonalizable if there is a diagonal matrix D such that A is similar to D - that is, if there is an invertible nXn matrix P such that P^(-1)AP = D. Equivalently, AP = PD.

    Source: Linear Algebra: A Modern Introduction, 3rd edition by David Poole (note-custom edition titled Matrix Algebra)

  • Listed under: Linear Algebra, Abstract Algebra, Differential Equations