Landweber exact functor theorem

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Revision as of 14:37, 14 November 2013 by en>TakuyaMurata ("important theorem" is like "adding additional data")
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In mathematics, the spectral abscissa of a matrix or a bounded linear operator is the supremum among the real part of the elements in its spectrum, sometimes denoted as η(A)

Matrices

Let λ1, ..., λs be the (real or complex) eigenvalues of a matrix ACn × n. Then its spectral abscissa is defined as:

η(A)=maxi{Re(λi)}

It is often used as a measure of stability in control theory, where a continuous system is stable if all its eigenvalues are located in the left half plane, i.e. η(A)<0

See also

Spectral radius


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