"Differential Galois theory"의 두 판 사이의 차이

2021년 2월 17일 (수) 02:11 기준 최신판

introduction

differential galois theory
Liouville
2008년 12월 9일 MCF 'differential Galois theory'

historical origin

integration in finite terms
quadrature of second order differential equation (Fuchsian differential equation)

solution by quadrature

일계 선형미분방정식\(\frac{dy}{dx}+a(x)y=b(x)\)\(y(x)e^{\int a(x)\,dx}=\int b(x)e^{\int a(x)\,dx} \,dx+C\)
\(y''-2xy'=0\)\(y=\int e^{x^2}\, dx\)
note that the integral of an exponential naturally shows up in expression solutions

differential field

a pair \((F,\partial)\) such that
- \(\partial(a+b)=\partial a+\partial b\)
- \(\partial(ab)=(\partial a)b+a(\partial b)\)
\(C_F=\ker \partial\)

solvable by quadratures

basic functions : basic elementary functions
allowed operatrions : compositions, arithmetic operations, differentiation, integration
examples
- an elliptic integral is representable by quadrature

elementary extension

it is allowed to take exponentials and logarithms to make a field extension
elementary element
difference between Liouville extension
- exponential+ integral <=> differentiation + exponential of integral
- in elementary extension, we are not allowed to get an integrated element

Liouville extension

an element is said to be representable by a generalized quadrature
we can capture these properties using the concept of Liouville extension
to get a Liouville extension, we can adjoin
- integrals
- exponentials of integrals
- algebraic extension (generalized Liouville extension)
  - from these we can include the following operations
    - exponential
    - logarithm
For\(K_{i}=K_{i-1}(e_i)\) , one of the following condition holds
- \(e_i'\in K_{i-1}\), i.e. \(e_i=\int e_i'\in K_i\)
- \(e_{i}'/e_{i}\in K_{i-1}\) i.e. \((\log e_i)' \in K_{i-1}\)
- \(e_{i}\) is algebraic over \(K_{i-1}\)
remark on exponentiation
- Let \(a,a'\in F\). Is \(b=e^a\in K\) where K is a Liouville extension?
- \(b'=a' e^a=a'b\) implies \(a'=\frac{b'}{b}\in F\).
- the exponential of the integral of a' i.e. \(e^{\int a'}=e^a+c\) must be in the Liouville extension. So \(b=e^a\in K\).
remark on logarithm
- \(b=\log a\) is the integral of \(a'/a\in F\). So \(b\in K\)

a few result
- K/F is a Liouville extension iff the differential Galois group K over F is solvable.
- K/F is a generalized Liouville extension iff the differential Galois group K over F has the solvable component of the identity

Picard-Vessiot extension

framework for linear differential equation
field extension is made by including solutions of DE to the base field (e.g. rational function field)
consider monic differential equations over a differential field F\(\mathcal{L}[Y]=Y^{(n)}+a_{n-1}Y^{(n-1)}+\cdots+a_{1}Y^{(1)}+a_0\), \(a_i\in F\)
\((E,\partial_E)\supseteq (F,\partial_F)\) is a Picard-Vessiot extension for \(\mathcal{L}\) if
- E/F is generated by n linear independent solution to \(\mathcal{L}\), i.e. adjoining basis of \(V=\mathcal{L}^{-1}(0)\) to F
- \(C_E=C_F\), \(\partial_E\mid_F=\partial_F\)
this corresponds to the concept of the splitting fields(or Galois extensions)
examples
- algebraic extension
- adjoining an integral
- adjoining the exponential of an integral
we can define a Galois group for a linear differential equation\(\operatorname{Gal}(E/F)=\{\sigma\in\operatorname{Aut}E|\partial(\sigma(n))=\sigma(\partial a), \sigma\mid _F=\operatorname{id} \}\)
- the action of an element of the Galois group is determined by its action on a basis of V

theorem

If a Picard-Vessiot extension is a Liouville extension, then the Galois group of this extension is solvable.

Fuchsian differential equation

differential equation with regular singularities
indicial equation\(x(x-1)+px+q=0\)

theorem

A Fuchsian linear differential equation is solvable by quadratures if and only if the monodromy group of this equation is solvable.

solution by quadrature

related items

encyclopedia

expositions

Singer, M. F., and J. H. Davenport. ‘Elementary and Liouvillian Solutions of Linear Differential Equations’. In EUROCAL ’85, edited by Bob F. Caviness, 595–96. Lecture Notes in Computer Science 204. Springer Berlin Heidelberg, 1985. http://link.springer.com/chapter/10.1007/3-540-15984-3_335.

articles

Sanchez, Omar Leon, and Joel Nagloo. “On Parameterized Differential Galois Extensions.” arXiv:1507.06338 [math], July 22, 2015. http://arxiv.org/abs/1507.06338.
Maurischat, Andreas. “A Categorical Approach to Picard-Vessiot Theory.” arXiv:1507.04166 [math], July 15, 2015. http://arxiv.org/abs/1507.04166.
Hardouin, Charlotte, and Alexey Ovchinnikov. ‘Calculating Galois Groups of Differential Equations with Parameters’. arXiv:1505.07068 [math], 26 May 2015. http://arxiv.org/abs/1505.07068.
Blázquez-Sanz, David, Juan José Morales-Ruiz, and Jacques-Arthur Weil. ‘Differential Galois Theory and Lie Symmetries’. arXiv:1503.09023 [math], 31 March 2015. http://arxiv.org/abs/1503.09023.
Mitschi, Claude. “Some Applications of the Parameterized Picard-Vessiot Theory.” arXiv:1503.01361 [math], March 4, 2015. http://arxiv.org/abs/1503.01361.
Crespo, Teresa, Zbigniew Hajto, and Elzbieta Sowa-Adamus. ‘Galois Correspondence Theorem for Picard-Vessiot Extensions’. arXiv:1502.08026 [math], 27 February 2015. http://arxiv.org/abs/1502.08026.
Singer, Michael F. ‘Liouvillian First Integrals of Differential Equations’. Transactions of the American Mathematical Society 333, no. 2 (1 October 1992): 673–88. doi:10.2307/2154053.

books

Group Theory and Differential Equations
- Lawrence Markus, 1960
An introduction to differential algebra
- Irving Kaplansky
algebraic theory of differential equations
http://gigapedia.info/1/galois_theory
http://gigapedia.info/1/differential+galois+theory
http://gigapedia.info/1/Kolchin
http://gigapedia.info/1/ritt
http://gigapedia.info/1/Galois'+dream
http://gigapedia.info/1/differntial+algebra

메타데이터

위키데이터

ID : Q2383624

Spacy 패턴 목록

[{'LOWER': 'differential'}, {'LOWER': 'galois'}, {'LEMMA': 'theory'}]

"Differential Galois theory"의 두 판 사이의 차이

2021년 2월 17일 (수) 02:11 기준 최신판

목차

introduction

historical origin

solution by quadrature

differential field

solvable by quadratures

elementary extension

Liouville extension

Picard-Vessiot extension

Fuchsian differential equation

solution by quadrature

related items

encyclopedia

expositions

articles

books

메타데이터

위키데이터

Spacy 패턴 목록

둘러보기 메뉴

검색

@@ 2번째 줄: / 2번째 줄: @@
 * differential galois theory
 * Liouville
 * [[2008년 12월~09년 1월 한국 방문|2008년 12월]] 9일 MCF 'differential Galois theory'
 ==historical origin==
 * integration in finite terms
-* quadrature of second order differential equation (Fuchsian differential equation)
+* quadrature of second order differential equation (Fuchsian differential equation)
 ==solution by quadrature==
-* [http://pythagoras0.springnote.com/pages/4913609 일계 선형미분방정식]<br><math>\frac{dy}{dx}+a(x)y=b(x)</math><br><math>y(x)e^{\int a(x)\,dx}=\int b(x)e^{\int a(x)\,dx} \,dx+C</math><br>
+* [http://pythagoras0.springnote.com/pages/4913609 일계 선형미분방정식]<math>\frac{dy}{dx}+a(x)y=b(x)</math><math>y(x)e^{\int a(x)\,dx}=\int b(x)e^{\int a(x)\,dx} \,dx+C</math>
-* <math>y''-2xy'=0</math><br><math>y=\int e^{x^2}\, dx</math><br>
+* <math>y''-2xy'=0</math><math>y=\int e^{x^2}\, dx</math>
 * note that the integral of an exponential naturally shows up in expression solutions
 ==differential field==
-*  a pair <math>(F,\partial)</math> such that<br>
+*  a pair <math>(F,\partial)</math> such that
 ** <math>\partial(a+b)=\partial a+\partial b</math>
 ** <math>\partial(ab)=(\partial a)b+a(\partial b)</math>
 * <math>C_F=\ker \partial</math>
 ==solvable by quadratures==
 * basic functions : basic elementary functions
-* allowed operatrions : compositions, arithmetic operations, differentiation, integration
+* allowed operatrions : compositions, arithmetic operations, differentiation, integration
-*  examples<br>
+*  examples
 ** an elliptic integral is representable by quadrature
 ==elementary extension==
@@ 54번째 줄: / 54번째 줄: @@
 * it is allowed to take exponentials and logarithms to make a field extension
 * elementary element
-*  difference between Liouville extension<br>
+*  difference between Liouville extension
 ** exponential+ integral <=> differentiation + exponential of integral
 ** in elementary extension, we are not allowed to get an integrated element
 ==Liouville extension==
-* an element is said to be representable by a generalized quadrature
+* an element is said to be representable by a generalized quadrature
 * we can capture these properties using the concept of Liouville extension
-*  to get a Liouville extension, we can adjoin<br>
+*  to get a Liouville extension, we can adjoin
 ** integrals
 ** exponentials of integrals
-**  algebraic extension (generalized Liouville extension)<br>
+**  algebraic extension (generalized Liouville extension)
-***  from these we can include the following operations<br>
+***  from these we can include the following operations
 **** exponential
 **** logarithm
-*  For<math>K_{i}=K_{i-1}(e_i)</math> , one of the following condition holds<br>
+*  For<math>K_{i}=K_{i-1}(e_i)</math> , one of the following condition holds
-** <math>e_i'\in K_{i-1}</math>, i.e. <math>e_i=\int e_i'\in K_i</math><br>
+** <math>e_i'\in K_{i-1}</math>, i.e. <math>e_i=\int e_i'\in K_i</math>
-** <math>e_{i}'/e_{i}\in K_{i-1}</math> i.e. <math>(\log e_i)' \in K_{i-1}</math><br>
+** <math>e_{i}'/e_{i}\in K_{i-1}</math> i.e. <math>(\log e_i)' \in K_{i-1}</math>
-** <math>e_{i}</math> is algebraic over <math>K_{i-1}</math><br>
+** <math>e_{i}</math> is algebraic over <math>K_{i-1}</math>
-*  remark on exponentiation<br>
+*  remark on exponentiation
-**  Let <math>a,a'\in F</math>. Is <math>b=e^a\in K</math> where K is a Liouville extension?<br>
+**  Let <math>a,a'\in F</math>. Is <math>b=e^a\in K</math> where K is a Liouville extension?
-** <math>b'=a' e^a=a'b</math> implies <math>a'=\frac{b'}{b}\in F</math>.<br>
+** <math>b'=a' e^a=a'b</math> implies <math>a'=\frac{b'}{b}\in F</math>.
-**  the exponential of the integral of a' i.e. <math>e^{\int a'}=e^a+c</math> must be in the Liouville extension. So <math>b=e^a\in K</math>.<br>
+**  the exponential of the integral of a' i.e. <math>e^{\int a'}=e^a+c</math> must be in the Liouville extension. So <math>b=e^a\in K</math>.
-*  remark on logarithm<br>
+*  remark on logarithm
-** <math>b=\log a</math> is the integral of <math>a'/a\in F</math>. So <math>b\in K</math><br>
+** <math>b=\log a</math> is the integral of <math>a'/a\in F</math>. So <math>b\in K</math>
-*  a few result<br>
+*  a few result
-**  K/F is a Liouville extension iff the differential Galois group K over F is solvable.<br>
+**  K/F is a Liouville extension iff the differential Galois group K over F is solvable.
-**  K/F is a generalized Liouville extension iff the differential Galois group K over F has the solvable component of the identity<br>
+**  K/F is a generalized Liouville extension iff the differential Galois group K over F has the solvable component of the identity
 ==Picard-Vessiot extension==
 * framework for linear differential equation
-* field extension is made by including solutions of DE to the base field (e.g. rational function field)
+* field extension is made by including solutions of DE to the base field (e.g. rational function field)
-*  consider monic differential equations over a differential field F<br><math>\mathcal{L}[Y]=Y^{(n)}+a_{n-1}Y^{(n-1)}+\cdots+a_{1}Y^{(1)}+a_0</math>, <math>a_i\in F</math><br>
+*  consider monic differential equations over a differential field F<math>\mathcal{L}[Y]=Y^{(n)}+a_{n-1}Y^{(n-1)}+\cdots+a_{1}Y^{(1)}+a_0</math>, <math>a_i\in F</math>
-* <math>(E,\partial_E)\supseteq (F,\partial_F)</math> is a Picard-Vessiot extension for <math>\mathcal{L}</math> if<br>
+* <math>(E,\partial_E)\supseteq (F,\partial_F)</math> is a Picard-Vessiot extension for <math>\mathcal{L}</math> if
 ** E/F is generated by n linear independent solution to <math>\mathcal{L}</math>, i.e. adjoining basis of <math>V=\mathcal{L}^{-1}(0)</math> to F
 ** <math>C_E=C_F</math>, <math>\partial_E\mid_F=\partial_F</math>
 * this corresponds to the concept of the splitting fields(or Galois extensions)
-*  examples<br>
+*  examples
 ** algebraic extension
 ** adjoining an integral
 ** adjoining the exponential of an integral
-*  we can define a Galois group for a linear differential equation<br><math>\operatorname{Gal}(E/F)=\{\sigma\in\operatorname{Aut}E|\partial(\sigma(n))=\sigma(\partial a), \sigma\mid _F=\operatorname{id} \}</math><br>
+*  we can define a Galois group for a linear differential equation<math>\operatorname{Gal}(E/F)=\{\sigma\in\operatorname{Aut}E|\partial(\sigma(n))=\sigma(\partial a), \sigma\mid _F=\operatorname{id} \}</math>
 ** the action of an element of the Galois group is determined by its action on a basis of V
@@ 112번째 줄: / 112번째 줄: @@
 If a Picard-Vessiot extension is a Liouville extension, then the Galois group of this extension is solvable.
 ==Fuchsian differential equation==
-* differential equation with regular singularities
+* differential equation with regular singularities
-*  indicial equation<br><math>x(x-1)+px+q=0</math><br>
+*  indicial equation<math>x(x-1)+px+q=0</math>
 theorem
-A Fuchsian linear differential equation is solvable by quadratures if and only if the monodromy group of this equation is solvable.
+A Fuchsian linear differential equation is solvable by quadratures if and only if the monodromy group of this equation is solvable.
 ==solution by quadrature==
@@ 139번째 줄: / 139번째 줄: @@
 * [http://www.math.purdue.edu/%7Eagabriel/topological_galois.pdf http://www.math.purdue.edu/~agabriel/topological_galois.pdf]
 ==related items==
-* [[Class Field Theory]]<br>
+* [[Class Field Theory]]
-* [[number fields and threefolds]]<br>
+* [[number fields and threefolds]]
 * {{수학노트|url=푸크스_미분방정식(Fuchsian_differential_equation)}}
 ==encyclopedia==
@@ 163번째 줄: / 163번째 줄: @@
 * http://en.wikipedia.org/wiki/Field_extension
-==articles==
+==expositions==
+* Singer, M. F., and J. H. Davenport. ‘Elementary and Liouvillian Solutions of Linear Differential Equations’. In EUROCAL ’85, edited by Bob F. Caviness, 595–96. Lecture Notes in Computer Science 204. Springer Berlin Heidelberg, 1985. http://link.springer.com/chapter/10.1007/3-540-15984-3_335.
-* [http://www.jstor.org/stable/2154053 Liouvillian First Integrals of Differential Equations]<br>
-** Michael F. Singer, Transactions of the American Mathematical Society, Vol. 333, No. 2 (Oct., 1992), pp. 673-688
-* [http://dx.doi.org/10.1007/3-540-15984-3_335 Elementary and Liouvillian solutions of linear differential equations]<br>
-** M. F. Singer and J. H. Davenport, 1985
+==articles==
+* Sanchez, Omar Leon, and Joel Nagloo. “On Parameterized Differential Galois Extensions.” arXiv:1507.06338 [math], July 22, 2015. http://arxiv.org/abs/1507.06338.
+* Maurischat, Andreas. “A Categorical Approach to Picard-Vessiot Theory.” arXiv:1507.04166 [math], July 15, 2015. http://arxiv.org/abs/1507.04166.
+* Hardouin, Charlotte, and Alexey Ovchinnikov. ‘Calculating Galois Groups of Differential Equations with Parameters’. arXiv:1505.07068 [math], 26 May 2015. http://arxiv.org/abs/1505.07068.
+* Blázquez-Sanz, David, Juan José Morales-Ruiz, and Jacques-Arthur Weil. ‘Differential Galois Theory and Lie Symmetries’. arXiv:1503.09023 [math], 31 March 2015. http://arxiv.org/abs/1503.09023.
+* Mitschi, Claude. “Some Applications of the Parameterized Picard-Vessiot Theory.” arXiv:1503.01361 [math], March 4, 2015. http://arxiv.org/abs/1503.01361.
+* Crespo, Teresa, Zbigniew Hajto, and Elzbieta Sowa-Adamus. ‘Galois Correspondence Theorem for Picard-Vessiot Extensions’. arXiv:1502.08026 [math], 27 February 2015. http://arxiv.org/abs/1502.08026.
+* Singer, Michael F. ‘Liouvillian First Integrals of Differential Equations’. Transactions of the American Mathematical Society 333, no. 2 (1 October 1992): 673–88. doi:[http://www.jstor.org/stable/2154053 10.2307/2154053].
 ==books==
-*  Group Theory and Differential Equations<br>
+*  Group Theory and Differential Equations
 ** Lawrence Markus, 1960
-*  An introduction to differential algebra<br>
+*  An introduction to differential algebra
-**  Irving Kaplansky<br>
+**  Irving Kaplansky
-*  algebraic theory of differential equations<br>
+*  algebraic theory of differential equations
 * http://gigapedia.info/1/galois_theory
 * http://gigapedia.info/1/differential+galois+theory
@@ 192번째 줄: / 195번째 줄: @@
 * http://gigapedia.info/1/differntial+algebra
 [[분류:개인노트]]
-[[분류:math and physics]]
 [[분류:math and physics]]
 [[분류:math]]
+[[분류:migrate]]
+==메타데이터==
+===위키데이터===
+* ID :  [https://www.wikidata.org/wiki/Q2383624 Q2383624]
+===Spacy 패턴 목록===
+* [{'LOWER': 'differential'}, {'LOWER': 'galois'}, {'LEMMA': 'theory'}]