Difference between revisions of "Double and dual numbers"
From Encyclopedia of Mathematics
(Importing text file) |
Ulf Rehmann (talk | contribs) m (tex encoded by computer) |
||
| Line 1: | Line 1: | ||
| − | + | <!-- | |
| + | d0338601.png | ||
| + | $#A+1 = 70 n = 0 | ||
| + | $#C+1 = 70 : ~/encyclopedia/old_files/data/D033/D.0303860 Double and dual numbers | ||
| + | Automatically converted into TeX, above some diagnostics. | ||
| + | Please remove this comment and the {{TEX|auto}} line below, | ||
| + | if TeX found to be correct. | ||
| + | --> | ||
| − | + | {{TEX|auto}} | |
| + | {{TEX|done}} | ||
| + | |||
| + | Hypercomplex numbers of the form $ a + be $, | ||
| + | where $ a $ | ||
| + | and $ b $ | ||
| + | are real numbers, and where the double numbers satisfy the relation $ e ^ {2} = 1 $, | ||
| + | while the dual numbers satisfy the relation $ e ^ {2} = 0 $( | ||
| + | cf. [[Hypercomplex number|Hypercomplex number]]). Addition of double and dual numbers is defined by | ||
| + | |||
| + | $$ | ||
| + | ( a _ {1} + b _ {1} e) + ( a _ {2} + b _ {2} e) = \ | ||
| + | ( a _ {1} + a _ {2} ) + ( b _ {1} + b _ {2} ) e. | ||
| + | $$ | ||
Multiplication of double numbers is defined by | Multiplication of double numbers is defined by | ||
| − | + | $$ | |
| + | ( a _ {1} + b _ {1} e) ( a _ {2} + b _ {2} e ) = \ | ||
| + | ( a _ {1} a _ {2} + b _ {1} b _ {2} ) + ( a _ {1} b _ {2} + | ||
| + | a _ {2} b _ {1} ) e , | ||
| + | $$ | ||
and that of dual numbers by | and that of dual numbers by | ||
| − | + | $$ | |
| + | ( a _ {1} + b _ {1} e )( a _ {2} + b _ {2} e ) = a _ {1} a _ {2} + | ||
| + | ( a _ {1} b _ {2} + a _ {2} b _ {1} ) e . | ||
| + | $$ | ||
Complex numbers, double numbers and dual numbers are also called complex numbers of hyperbolic, elliptic and parabolic types, respectively. These numbers are sometimes used to represent motions in the three-dimensional spaces of Lobachevskii, Riemann and Euclid (see, for instance, [[Helical calculus|Helical calculus]]). | Complex numbers, double numbers and dual numbers are also called complex numbers of hyperbolic, elliptic and parabolic types, respectively. These numbers are sometimes used to represent motions in the three-dimensional spaces of Lobachevskii, Riemann and Euclid (see, for instance, [[Helical calculus|Helical calculus]]). | ||
| − | Both double and dual numbers form two-dimensional (with base 1 and | + | Both double and dual numbers form two-dimensional (with base 1 and $ e $) |
| + | associative-commutative algebras over the field of real numbers. As distinct from the field of complex numbers, these algebras comprise zero divisors, all these having the form $ a \pm ae $ | ||
| + | in the algebra of double numbers. The algebra of double numbers may be split into a direct sum of two real number fields. Hence yet another name for double numbers — splitting complex numbers. Double numbers have yet another appellation — paracomplex numbers. The algebra of dual numbers is considered not only over the field $ \mathbf R $ | ||
| + | of real numbers, but also over an arbitrary field or commutative ring. Let $ A $ | ||
| + | be a commutative ring and let $ M $ | ||
| + | be an $ A $- | ||
| + | module. The direct sum of $ A $- | ||
| + | modules $ A \oplus M $ | ||
| + | equipped with the multiplication | ||
| − | + | $$ | |
| + | ( a , m ) ( a ^ \prime , m ^ \prime ) = ( aa ^ \prime , am ^ \prime + | ||
| + | a ^ \prime m ) | ||
| + | $$ | ||
| − | is a commutative | + | is a commutative $ A $- |
| + | algebra and is denoted by $ I _ {A} ( M) $. | ||
| + | It is known as the algebra of dual numbers with respect to the module $ M $. | ||
| + | The $ A $- | ||
| + | module $ M $ | ||
| + | is identical with the ideal of the algebra $ I _ {A} ( M) $ | ||
| + | which is the kernel of the augmentation homomorphism | ||
| − | + | $$ | |
| + | \epsilon : I _ {A} ( M) \rightarrow A \ ( ( a , m ) \rightarrow a ) . | ||
| + | $$ | ||
| − | The square | + | The square $ M ^ {2} $ |
| + | of this ideal is zero, while $ I _ {A} ( M) / M \simeq A $. | ||
| + | If $ A $ | ||
| + | is a regular ring the converse is also true: If $ B $ | ||
| + | is an $ A $- | ||
| + | algebra and $ M $ | ||
| + | is an ideal in $ B $ | ||
| + | such that $ M ^ {2} = 0 $ | ||
| + | and $ B/M \simeq A $, | ||
| + | then $ B \simeq I _ {A} ( M) $, | ||
| + | where $ M $ | ||
| + | is regarded as an $ A $- | ||
| + | module [[#References|[4]]]. | ||
| − | If | + | If $ M = A $, |
| + | the algebra $ I _ {A} ( M) $( | ||
| + | then denoted by $ I _ {A} $) | ||
| + | is isomorphic to the quotient algebra of the algebra of polynomials $ A( T) $ | ||
| + | by the ideal $ T ^ { 2 } $. | ||
| + | Many properties of an $ A $- | ||
| + | module may be formulated as properties of the algebra $ I _ {A} ( M) $; | ||
| + | as a result, many problems on $ A $- | ||
| + | modules can be reduced to corresponding problems in the theory of rings [[#References|[2]]]. | ||
| − | Let | + | Let $ B $ |
| + | be an arbitrary $ A $- | ||
| + | algebra, let $ \phi : B \rightarrow A $ | ||
| + | be a homomorphism and let $ \partial : B \rightarrow M $ | ||
| + | be a derivation (cf. [[Derivation in a ring|Derivation in a ring]]) of $ B $ | ||
| + | with values in the $ A $- | ||
| + | module $ M $, | ||
| + | regarded as a $ B $- | ||
| + | module with respect to the homomorphism $ \phi $. | ||
| + | The mapping $ \overline \partial \; : B \rightarrow I _ {A} ( M) $( | ||
| + | $ b \rightarrow ( \phi ( b), \partial ( b)) $) | ||
| + | will then be a homomorphism of $ A $- | ||
| + | algebras. Conversely, for any homomorphism of $ A $- | ||
| + | algebras $ f : B \rightarrow I _ {A} ( M) $ | ||
| + | the composition $ \epsilon ^ \prime \circ f : B \rightarrow M $, | ||
| + | where $ \epsilon ^ \prime : I _ {A} ( M) \rightarrow M $ | ||
| + | is the projection of $ I _ {A} ( M) $ | ||
| + | onto $ M $, | ||
| + | is an $ A $- | ||
| + | derivation of $ B $ | ||
| + | with values in $ M $, | ||
| + | regarded as a $ B $- | ||
| + | module with respect to the homomorphism $ \epsilon \circ f : B \rightarrow A $. | ||
| + | This property of double and dual numbers is utilized for the description of the tangent space to an arbitrary functor in the category of schemes [[#References|[1]]], [[#References|[3]]]. | ||
====References==== | ====References==== | ||
<table><TR><TD valign="top">[1]</TD> <TD valign="top"> D. Mumford, "Lectures on curves on an algebraic surface" , Princeton Univ. Press (1966)</TD></TR><TR><TD valign="top">[2]</TD> <TD valign="top"> R. Fossum, P.A. Griffith, I. Reiten, "Trivial extensions of Abelian categories. Homological algebra of trivial extensions of Abelian categories with applications to ring theory" , Springer (1975)</TD></TR><TR><TD valign="top">[3]</TD> <TD valign="top"> M. Demazure, A. Grothendieck, "Schémas en groupes I" , ''Lect. notes in math.'' , '''151–153''' , Springer (1970)</TD></TR><TR><TD valign="top">[4]</TD> <TD valign="top"> S. Lichtenbaum, M. Schlessinger, "The cotangent complex of a morphism" ''Trans. Amer. Math. Soc.'' , '''128''' : 1 (1967) pp. 41–70</TD></TR></table> | <table><TR><TD valign="top">[1]</TD> <TD valign="top"> D. Mumford, "Lectures on curves on an algebraic surface" , Princeton Univ. Press (1966)</TD></TR><TR><TD valign="top">[2]</TD> <TD valign="top"> R. Fossum, P.A. Griffith, I. Reiten, "Trivial extensions of Abelian categories. Homological algebra of trivial extensions of Abelian categories with applications to ring theory" , Springer (1975)</TD></TR><TR><TD valign="top">[3]</TD> <TD valign="top"> M. Demazure, A. Grothendieck, "Schémas en groupes I" , ''Lect. notes in math.'' , '''151–153''' , Springer (1970)</TD></TR><TR><TD valign="top">[4]</TD> <TD valign="top"> S. Lichtenbaum, M. Schlessinger, "The cotangent complex of a morphism" ''Trans. Amer. Math. Soc.'' , '''128''' : 1 (1967) pp. 41–70</TD></TR></table> | ||
| − | |||
| − | |||
====Comments==== | ====Comments==== | ||
| − | An old-fashioned term for an associative algebra | + | An old-fashioned term for an associative algebra $ A $ |
| + | with unit element over $ \mathbf R $ | ||
| + | is system of hypercomplex numbers, and an element of $ A $ | ||
| + | is then called a hypercomplex number. There are (up to isomorphism) precisely three of these algebras of dimension 2: the complex numbers, the dual numbers and the double numbers. | ||
====References==== | ====References==== | ||
<table><TR><TD valign="top">[a1]</TD> <TD valign="top"> M. Demazure, P. Gabriel, "Groupes algébriques" , '''1''' , Masson (1970)</TD></TR></table> | <table><TR><TD valign="top">[a1]</TD> <TD valign="top"> M. Demazure, P. Gabriel, "Groupes algébriques" , '''1''' , Masson (1970)</TD></TR></table> | ||
Latest revision as of 19:36, 5 June 2020
Hypercomplex numbers of the form $ a + be $,
where $ a $
and $ b $
are real numbers, and where the double numbers satisfy the relation $ e ^ {2} = 1 $,
while the dual numbers satisfy the relation $ e ^ {2} = 0 $(
cf. Hypercomplex number). Addition of double and dual numbers is defined by
$$ ( a _ {1} + b _ {1} e) + ( a _ {2} + b _ {2} e) = \ ( a _ {1} + a _ {2} ) + ( b _ {1} + b _ {2} ) e. $$
Multiplication of double numbers is defined by
$$ ( a _ {1} + b _ {1} e) ( a _ {2} + b _ {2} e ) = \ ( a _ {1} a _ {2} + b _ {1} b _ {2} ) + ( a _ {1} b _ {2} + a _ {2} b _ {1} ) e , $$
and that of dual numbers by
$$ ( a _ {1} + b _ {1} e )( a _ {2} + b _ {2} e ) = a _ {1} a _ {2} + ( a _ {1} b _ {2} + a _ {2} b _ {1} ) e . $$
Complex numbers, double numbers and dual numbers are also called complex numbers of hyperbolic, elliptic and parabolic types, respectively. These numbers are sometimes used to represent motions in the three-dimensional spaces of Lobachevskii, Riemann and Euclid (see, for instance, Helical calculus).
Both double and dual numbers form two-dimensional (with base 1 and $ e $) associative-commutative algebras over the field of real numbers. As distinct from the field of complex numbers, these algebras comprise zero divisors, all these having the form $ a \pm ae $ in the algebra of double numbers. The algebra of double numbers may be split into a direct sum of two real number fields. Hence yet another name for double numbers — splitting complex numbers. Double numbers have yet another appellation — paracomplex numbers. The algebra of dual numbers is considered not only over the field $ \mathbf R $ of real numbers, but also over an arbitrary field or commutative ring. Let $ A $ be a commutative ring and let $ M $ be an $ A $- module. The direct sum of $ A $- modules $ A \oplus M $ equipped with the multiplication
$$ ( a , m ) ( a ^ \prime , m ^ \prime ) = ( aa ^ \prime , am ^ \prime + a ^ \prime m ) $$
is a commutative $ A $- algebra and is denoted by $ I _ {A} ( M) $. It is known as the algebra of dual numbers with respect to the module $ M $. The $ A $- module $ M $ is identical with the ideal of the algebra $ I _ {A} ( M) $ which is the kernel of the augmentation homomorphism
$$ \epsilon : I _ {A} ( M) \rightarrow A \ ( ( a , m ) \rightarrow a ) . $$
The square $ M ^ {2} $ of this ideal is zero, while $ I _ {A} ( M) / M \simeq A $. If $ A $ is a regular ring the converse is also true: If $ B $ is an $ A $- algebra and $ M $ is an ideal in $ B $ such that $ M ^ {2} = 0 $ and $ B/M \simeq A $, then $ B \simeq I _ {A} ( M) $, where $ M $ is regarded as an $ A $- module [4].
If $ M = A $, the algebra $ I _ {A} ( M) $( then denoted by $ I _ {A} $) is isomorphic to the quotient algebra of the algebra of polynomials $ A( T) $ by the ideal $ T ^ { 2 } $. Many properties of an $ A $- module may be formulated as properties of the algebra $ I _ {A} ( M) $; as a result, many problems on $ A $- modules can be reduced to corresponding problems in the theory of rings [2].
Let $ B $ be an arbitrary $ A $- algebra, let $ \phi : B \rightarrow A $ be a homomorphism and let $ \partial : B \rightarrow M $ be a derivation (cf. Derivation in a ring) of $ B $ with values in the $ A $- module $ M $, regarded as a $ B $- module with respect to the homomorphism $ \phi $. The mapping $ \overline \partial \; : B \rightarrow I _ {A} ( M) $( $ b \rightarrow ( \phi ( b), \partial ( b)) $) will then be a homomorphism of $ A $- algebras. Conversely, for any homomorphism of $ A $- algebras $ f : B \rightarrow I _ {A} ( M) $ the composition $ \epsilon ^ \prime \circ f : B \rightarrow M $, where $ \epsilon ^ \prime : I _ {A} ( M) \rightarrow M $ is the projection of $ I _ {A} ( M) $ onto $ M $, is an $ A $- derivation of $ B $ with values in $ M $, regarded as a $ B $- module with respect to the homomorphism $ \epsilon \circ f : B \rightarrow A $. This property of double and dual numbers is utilized for the description of the tangent space to an arbitrary functor in the category of schemes [1], [3].
References
| [1] | D. Mumford, "Lectures on curves on an algebraic surface" , Princeton Univ. Press (1966) |
| [2] | R. Fossum, P.A. Griffith, I. Reiten, "Trivial extensions of Abelian categories. Homological algebra of trivial extensions of Abelian categories with applications to ring theory" , Springer (1975) |
| [3] | M. Demazure, A. Grothendieck, "Schémas en groupes I" , Lect. notes in math. , 151–153 , Springer (1970) |
| [4] | S. Lichtenbaum, M. Schlessinger, "The cotangent complex of a morphism" Trans. Amer. Math. Soc. , 128 : 1 (1967) pp. 41–70 |
Comments
An old-fashioned term for an associative algebra $ A $ with unit element over $ \mathbf R $ is system of hypercomplex numbers, and an element of $ A $ is then called a hypercomplex number. There are (up to isomorphism) precisely three of these algebras of dimension 2: the complex numbers, the dual numbers and the double numbers.
References
| [a1] | M. Demazure, P. Gabriel, "Groupes algébriques" , 1 , Masson (1970) |
How to Cite This Entry:
Double and dual numbers. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Double_and_dual_numbers&oldid=46769
Double and dual numbers. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Double_and_dual_numbers&oldid=46769
This article was adapted from an original article by I.V. Dolgachev (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article