- Source: Birkhoff factorization
In mathematics, Birkhoff factorization or Birkhoff decomposition, introduced by George David Birkhoff (1909), is the factorization of an invertible matrix
M
{\displaystyle M}
with coefficients that are Laurent polynomials in
z
{\displaystyle z}
into a product
M
=
M
+
M
0
M
−
{\displaystyle M=M^{+}M^{0}M^{-}}
, where
M
+
{\displaystyle M^{+}}
has entries that are polynomials in
z
{\displaystyle z}
,
M
0
{\displaystyle M^{0}}
is diagonal, and
M
−
{\displaystyle M^{-}}
has entries that are polynomials in
z
−
1
{\displaystyle z^{-1}}
. There are several variations where the general linear group is replaced by some other reductive algebraic group, due to Alexander Grothendieck (1957).
Birkhoff factorization implies the Birkhoff–Grothendieck theorem of Grothendieck (1957) that vector bundles over the projective line are sums of line bundles.
Birkhoff factorization follows from the Bruhat decomposition for affine Kac–Moody groups (or loop groups), and conversely the Bruhat decomposition for the affine general linear group follows from Birkhoff factorization together with the Bruhat decomposition for the ordinary general linear group.
See also
Birkhoff decomposition (disambiguation)
Riemann–Hilbert problem
References
Birkhoff, George David (1909), "Singular points of ordinary linear differential equations", Transactions of the American Mathematical Society, 10 (4): 436–470, doi:10.2307/1988594, ISSN 0002-9947, JFM 40.0352.02, JSTOR 1988594
Grothendieck, Alexander (1957), "Sur la classification des fibrés holomorphes sur la sphère de Riemann", American Journal of Mathematics, 79: 121–138, doi:10.2307/2372388, ISSN 0002-9327, JSTOR 2372388, MR 0087176
Khimshiashvili, G. (2001) [1994], "Birkhoff factorization", Encyclopedia of Mathematics, EMS Press
Pressley, Andrew; Segal, Graeme (1986), Loop groups, Oxford Mathematical Monographs, The Clarendon Press Oxford University Press, ISBN 978-0-19-853535-5, MR 0900587
Kata Kunci Pencarian:
- Ranah integral
- Birkhoff factorization
- Birkhoff decomposition
- George David Birkhoff
- Birkhoff–Grothendieck theorem
- Bruhat decomposition
- Riemann–Hilbert problem
- Irreducible polynomial
- Well-ordering principle
- Greatest common divisor
- Integral domain