Spread of a matrix

In mathematics, and more specifically matrix theory, the spread of a matrix is the largest distance in the complex plane between any two eigenvalues of the matrix.

Definition

Let A be a square matrix with eigenvalues \lambda_1, \ldots, \lambda_n. That is, these values \lambda_i are the complex numbers such that there exists a vector v_i on which A acts by scalar multiplication:

Av_i=\lambda_i v_i.

Then the spread of A is the non-negative number

s(A) = \max \{|\lambda_i - \lambda_j| : i,j=1,\ldots n\}.

Examples

See also

References

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