Definition of Diagonalizable

1. Adjective. Capable of being transformed into a diagonal matrix.

Category relationships: Math, Mathematics, Maths
Partainyms: Diagonal Matrix

Definition of Diagonalizable

1. Adjective. Able to be diagonalized. ¹

¹ Source: wiktionary.com

Definition of Diagonalizable

1. [adj]

Lexicographical Neighbors of Diagonalizable

diagonal element
diagonal elements
diagonal matrix
diagonal section
diagonalis stria
diagonalisability
diagonalisation
diagonalisations
diagonalise
diagonalised
diagonalises
diagonalising
diagonalizability
diagonalizable (current term)
diagonalization
diagonalizations
diagonalize
diagonalized
diagonalizes
diagonalizing
diagonally
diagonals
diagonial
diagram
diagram chase
diagram chases
diagram chasing
diagramed

Literary usage of Diagonalizable

Below you will find example usage of this term as found in modern and/or classical literature:

1. Cartanian Geometry, Nonlinear Waves, and Control Theory by Robert Hermann (1979)
"Let A be a linear map: V + V which is diagonalizable. ... The assumption that A be diagonalizable means that V is the direct sum V1+ ..."

2. Convex Optimization & Euclidean Distance Geometry by Jon Dattorro (2005)
"For diagonalizable matrix A (§A.5), the number of 0 eigenvalues is precisely dimM{A) while the corresponding eigenvectors span AT (A). ..."

3. Cartanian Geometry, Nonlinear Waves, and Control Theory by Robert Hermann (1979)
"Let A be a linear map: V + V which is diagonalizable. ... The assumption that A be diagonalizable means that V is the direct sum V1+ ..."

4. Convex Optimization & Euclidean Distance Geometry by Jon Dattorro (2005)
"For diagonalizable matrix A (§A.5), the number of 0 eigenvalues is precisely dimM{A) while the corresponding eigenvectors span AT (A). ..."

Other Resources:

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