Cayley numbers (Algebra)
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- Work cat.: 2002035555: On quaternions and octonions, c2002:CIP introd. (developed by John T. Graves in 1843-44 but first publ. in 1845 by Cayley, octonions were known as Cayley numbers)
- CRC concise encyc. math.(Cayley number: (1) one of the eight elements in a Cayley algebra, also known as an octonion, having the form (a + bi₀ + ci₁ + di₂ + ei₃ + fi₄ + gi₅ + hi₆) where each of the triplets (i₀,i₁,i₃), (i₁,i₂,i₄) etc. behaves like the quaternions (i,j,k)); (2) the second type of Cayley number is a quantity which describes a Del Pezzo surface)
- Eisenreich. Mathematik(Cayley['s] numbers; Cayley['s] octave; AL)
- Encyc. dict. math.:under Cayley algebras (the elements of a general Cayley algebra are called Cayley numbers)
- Acad. Press dict. sci. tech.:Cayley numbers (an older term for the elements of a Cayley algebra)
In mathematics, the octonions are a normed division algebra over the real numbers, a kind of hypercomplex number system. The octonions are usually represented by the capital letter O, using boldface O or blackboard bold O {\displaystyle \mathbb {O} } . Octonions have eight dimensions; twice the number of dimensions of the quaternions, of which they are an extension. They are noncommutative and nonassociative, but satisfy a weaker form of associativity; namely, they are alternative. They are also power associative. Octonions are not as well known as the quaternions and complex numbers, which are much more widely studied and used. Octonions are related to exceptional structures in mathematics, among them the exceptional Lie groups. Octonions have applications in fields such as string theory, special relativity and quantum logic. Applying the Cayley–Dickson construction to the octonions produces the sedenions.
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