Gell-Mann-Dashen algebra
An infinite-dimensional Lie algebra occurring in quantum field theory. Let 
be a finite-dimensional Lie algebra and 
the space of Schwartz test functions (cf. Generalized functions, space of). The Lie algebra 
is defined by
 |
and can be interpreted as the Lie algebra of the group of gauge transformations (cf. Gauge transformation) [a1]. Representations of 
are called current algebras in quantum field theory. Let 
be a homomorphism of Lie algebras and let 
be a basis of 
with structure constants 
. The mapping 
defines an 
-valued distribution 
and it is true that
 |
Passing to the Fourier image one sets 
for 
; then
 |
R. Dashen and M. Gell-Mann (1966) studied and applied the latter commutation relations in the particular case when 
, [a2].
General references for current algebras are [a3], [a4].
References
| [a1] | R. Hermann, "Lie algebras and quantum mechanics" , Benjamin (1970) |
| [a2] | R. Dashen, M. Gell-Mann, "Representation of local current algebra at infinite momentum" Phys. Rev. Lett. , 17 (1966) pp. 340–343 |
| [a3] | S.L. Adler, R. Dashen, "Current algebras" , Benjamin (1968) |
| [a4] | B. Renner, "Current algebras and their applications" , Pergamon (1968) |
Gell-Mann-Dashen algebra. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Gell-Mann-Dashen_algebra&oldid=15132