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cayle

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There are 5 letters in CAYLE ( A1C3E1L1Y4 )

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Definitions of cayle in various dictionaries:

CAYLE - In linear algebra, the Cayley–Hamilton theorem (named after the mathematicians Arthur Cayley and William Rowan Hamilton) states that every square m...

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In linear algebra, the Cayley–Hamilton theorem (named after the mathematicians Arthur Cayley and William Rowan Hamilton) states that every square matrix over a commutative ring (such as the real or complex field) satisfies its own characteristic equation.
* If A is a given n×n matrix and In is the n×n identity matrix, then the characteristic polynomial of A is defined as*
*
*
* p
* (
* λ
* )
* =
* det
* (
* λ
*
* I
*
* n
*
*
* −
* A
* )
*
* ,
*
*
* {\displaystyle p(\lambda )=\det(\lambda I_{n}-A)~,}
* where det is the determinant operation and λ is a scalar element of the base ring. Since the entries of the matrix are (linear or constant) polynomials in λ, the determinant is also an n-th order monic polynomial in λ. The Cayley–Hamilton theorem states that substituting the matrix A for λ in this polynomial results in the zero matrix,
*
*
*
*
* p
* (
* A
* )
* =
* O
* .
*
*
* {\displaystyle p(A)=O.}
* The powers of A, obtained by substitution from powers of λ, are defined by repeated matrix multiplication; the constant term of p(λ) gives a multiple of the power A0, which is defined as the identity matrix.
* The theorem allows An to be expressed as a linear combination of the lower matrix powers of A. When the ring is a field, the Cayley–Hamilton theorem is equivalent to the statement that the minimal polynomial of a square matrix divides its characteristic polynomial.
* The theorem was first proved in 1853 in terms of inverses of linear functions of quaternions, a non-commutative ring, by Hamilton. This corresponds to the special case of certain 4 × 4 real or 2 × 2 complex matrices. The theorem holds for general quaternionic matrices. Cayley in 1858 stated it for 3 × 3 and smaller matrices, but only published a proof for the 2 × 2 case. The general case was first proved by Frobenius in 1878.
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