Difference between revisions of "Hypercomplex number"
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− | + | An element of a finite-dimensional algebra with a unit element over the field of real numbers $ \mathbf R $( | |
+ | formerly known as a hypercomplex system). Historically, hypercomplex numbers arose as a generalization of complex numbers (cf. [[Complex number|Complex number]]). Operations on complex numbers correspond to geometrical transformations of the plane (translation, rotation, dilation, and combinations of such operations). In trying to construct numbers whose role with respect to three-dimensional space corresponds to the role played by complex numbers with respect to the plane, it became clear that a full analogy is not possible; this gave rise to the development of the theory of systems of hypercomplex numbers. | ||
− | of | + | A hypercomplex system of rank $ n $ |
+ | is obtained by introducing a multiplication in the $ n $- | ||
+ | dimensional real space $ \mathbf R ^ {n} $ | ||
+ | which satisfies the axioms of an algebra over a field. Let 1 be the unit of a hypercomplex system $ U $ | ||
+ | and let $ 1, i _ {1} \dots i _ {n-} 1 $ | ||
+ | be some basis of $ \mathbf R ^ {n} $. | ||
+ | The hypercomplex number | ||
− | + | $$ | |
+ | \overline \alpha \; = a _ {0} - a _ {1} i _ {1} - \dots - a _ {n} i _ {n} $$ | ||
− | + | of $ U $ | |
+ | is said to be the conjugate hypercomplex number of | ||
− | + | $$ | |
+ | \alpha = a _ {0} + a _ {1} i _ {1} + \dots + a _ {n} i _ {n} . | ||
+ | $$ | ||
+ | |||
+ | Let $ U ^ {(} 2) = \{ u _ {1} + u _ {2} e \} $, | ||
+ | where $ u _ {1} , u _ {2} \in U $ | ||
+ | and $ e $ | ||
+ | is some new symbol. The set $ U ^ {(} 2) $ | ||
+ | may be converted into a hypercomplex system by defining addition by | ||
+ | |||
+ | $$ | ||
+ | ( u _ {1} + u _ {2} e) + ( v _ {1} + v _ {2} e) = \ | ||
+ | ( u _ {1} + v _ {1} ) + ( u _ {2} + v _ {2} ) e | ||
+ | $$ | ||
and multiplication by | and multiplication by | ||
− | + | $$ | |
+ | ( u _ {1} + u _ {2} e) ( v _ {1} + v _ {2} e) = \ | ||
+ | ( u _ {1} v _ {1} - \overline{ {v _ {2} }}\; u _ {2} ) + | ||
+ | ( v _ {2} u _ {1} + u _ {2} \overline{ {v _ {1} }}\; ) e. | ||
+ | $$ | ||
− | The hypercomplex system | + | The hypercomplex system $ U ^ {(} 2) $ |
+ | is called the doubling of $ U $. | ||
Examples of hypercomplex systems are: the real numbers, the complex numbers, the quaternions, and the Cayley numbers (in this list each successive system is obtained by doubling the preceding one, cf. [[Quaternion|Quaternion]]; [[Cayley numbers|Cayley numbers]]). Other examples include [[Double and dual numbers|double and dual numbers]], and hypercomplex systems of the form | Examples of hypercomplex systems are: the real numbers, the complex numbers, the quaternions, and the Cayley numbers (in this list each successive system is obtained by doubling the preceding one, cf. [[Quaternion|Quaternion]]; [[Cayley numbers|Cayley numbers]]). Other examples include [[Double and dual numbers|double and dual numbers]], and hypercomplex systems of the form | ||
− | + | $$ | |
+ | A = a _ {0} \cdot 1 + | ||
+ | \sum _ {\gamma = 1 } ^ { {2 ^ {n} - 1 } } | ||
+ | a _ \gamma i _ \gamma , | ||
+ | $$ | ||
− | which, if | + | which, if $ n = 4 $, |
+ | are known as Clifford–Lipschitz numbers (these hypercomplex numbers are elements of the [[Clifford algebra|Clifford algebra]] of rank $ 2 ^ {n} $). | ||
+ | An important example of hypercomplex systems are complete matrix algebras over $ \mathbf R $. | ||
The definition of a system of hypercomplex numbers may include the requirement of associativeness of multiplication; one also identifies the concepts of an algebra and a hypercomplex system. | The definition of a system of hypercomplex numbers may include the requirement of associativeness of multiplication; one also identifies the concepts of an algebra and a hypercomplex system. |
Revision as of 22:11, 5 June 2020
An element of a finite-dimensional algebra with a unit element over the field of real numbers $ \mathbf R $(
formerly known as a hypercomplex system). Historically, hypercomplex numbers arose as a generalization of complex numbers (cf. Complex number). Operations on complex numbers correspond to geometrical transformations of the plane (translation, rotation, dilation, and combinations of such operations). In trying to construct numbers whose role with respect to three-dimensional space corresponds to the role played by complex numbers with respect to the plane, it became clear that a full analogy is not possible; this gave rise to the development of the theory of systems of hypercomplex numbers.
A hypercomplex system of rank $ n $ is obtained by introducing a multiplication in the $ n $- dimensional real space $ \mathbf R ^ {n} $ which satisfies the axioms of an algebra over a field. Let 1 be the unit of a hypercomplex system $ U $ and let $ 1, i _ {1} \dots i _ {n-} 1 $ be some basis of $ \mathbf R ^ {n} $. The hypercomplex number
$$ \overline \alpha \; = a _ {0} - a _ {1} i _ {1} - \dots - a _ {n} i _ {n} $$
of $ U $ is said to be the conjugate hypercomplex number of
$$ \alpha = a _ {0} + a _ {1} i _ {1} + \dots + a _ {n} i _ {n} . $$
Let $ U ^ {(} 2) = \{ u _ {1} + u _ {2} e \} $, where $ u _ {1} , u _ {2} \in U $ and $ e $ is some new symbol. The set $ U ^ {(} 2) $ may be converted into a hypercomplex system by defining addition by
$$ ( u _ {1} + u _ {2} e) + ( v _ {1} + v _ {2} e) = \ ( u _ {1} + v _ {1} ) + ( u _ {2} + v _ {2} ) e $$
and multiplication by
$$ ( u _ {1} + u _ {2} e) ( v _ {1} + v _ {2} e) = \ ( u _ {1} v _ {1} - \overline{ {v _ {2} }}\; u _ {2} ) + ( v _ {2} u _ {1} + u _ {2} \overline{ {v _ {1} }}\; ) e. $$
The hypercomplex system $ U ^ {(} 2) $ is called the doubling of $ U $.
Examples of hypercomplex systems are: the real numbers, the complex numbers, the quaternions, and the Cayley numbers (in this list each successive system is obtained by doubling the preceding one, cf. Quaternion; Cayley numbers). Other examples include double and dual numbers, and hypercomplex systems of the form
$$ A = a _ {0} \cdot 1 + \sum _ {\gamma = 1 } ^ { {2 ^ {n} - 1 } } a _ \gamma i _ \gamma , $$
which, if $ n = 4 $, are known as Clifford–Lipschitz numbers (these hypercomplex numbers are elements of the Clifford algebra of rank $ 2 ^ {n} $). An important example of hypercomplex systems are complete matrix algebras over $ \mathbf R $.
The definition of a system of hypercomplex numbers may include the requirement of associativeness of multiplication; one also identifies the concepts of an algebra and a hypercomplex system.
References
[1] | I.L. Kantor, A.S. Solodovnikov, "Hyperkomplexe Zahlen" , Teubner (1978) (Translated from Russian) |
[2] | L.A. Kaluzhnin, "Introduction to general algebra" , Moscow (1973) (In Russian) |
Hypercomplex number. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Hypercomplex_number&oldid=47293