We have recently proved that the generators of the second quantized centedess Virasoro (or Witt)-Zamolodchikov- w ∞ algebra can be expressed in terms of the Renormalized Higher Powers of White Noise (RHPWN) and conjectured that this inclusion might in fact be an identity, in the sense that the converse is also true. In this paper we prove that this conjecture is true. We also explain the difference between this result and the boson representation of the centerless Virasoro algebra, which realizes, in the 1-mode case (in particular without renormalization), an inclusion of this algebra into the full oscillator algebra. This inclusion was known in the physics literature and some heuristic results were obtained in the direction of the extension of this inclusion to the 1-mode centerless Virasoro (or Witt)-Zamolodchikov- w ∞ algebra. However, the possibility of an identification of the second quantizations of these two algebras was not even conjectured in the physics literature.
[1]
Alexander B. Zamolodchikov,et al.
Infinite additional symmetries in two-dimensional conformal quantum field theory
,
1985
.
[2]
L. Accardi,et al.
ug 2 00 6 HIGHER POWERS OF WHITE NOISE AND CONFORMAL FIELD THEORY
,
2006
.
[3]
L. Accardi,et al.
RENORMALIZED HIGHER POWERS OF WHITE NOISE (RHPWN) AND CONFORMAL FIELD THEORY
,
2006,
math-ph/0608047.
[4]
René Schott,et al.
Algebraic Structures and Operator Calculus
,
1993
.
[5]
L. Accardi,et al.
The emergence of the Virasoro and $w_infty$ algebras through the renormalized higher powers of quantum white noise
,
2006
.
[6]
S. Ketov.
Conformal Field Theory
,
1995
.