Add to ORKGA new rigourous approach to conformal field theory is presented. The ba-sic objects are families of complex-valued amplitudes, which define a meromorphic conformal field theory (or chiral algebra) and which lead naturally to the definition of topological vector spaces, between which vertex operators act as continuous operators. In fact, in order to develop the theory, Möbius invariance rather than full conformal invariance is required but it is shown that every Möbius theory can be extended to a conformal theory by the construction of a Virasoro field. In this approach, a representation of a conformal field theory is naturally defined in terms of a family of amplitudes with appropriate analytic properties. It is shown that these amplitudes ...
Some aspects of conformal field theory over Riemann surfaces are examined. We study, in particular, ...
Two dimensional conformal field theories have received a lot of attention due to their relevance in ...
We formulate axioms of conformal theory (CT) in dimensions $>2$ modifying Segal's axioms...
We have two different axiomatic approaches to chiral conformal field theory (CFT). The conformal net...
We have two different axiomatic approaches to chiral conformal field theory (CFT). The conformal net...
This article develops new techniques for understanding the relationship between the three different ...
This thesis describes a new approach to conformal field theory. This approach combines the method of...
We present an operator algebraic formulation of chiral conformal field theory and show how it is rel...
This thesis contains results relevant for two different classes of conformal field theory. We partly...
23 pages, 12 figures, LateX. To appear in MATHPHYS ODYSSEY 2001 --Integrable Models and Beyond, ed. ...
Chiral algebras form the primary algebraic structure of modern conformal field theory. Each chiral a...
Starting from a chiral conformal Haag-Kastler net of local observables on two-dimensional Minkowski ...
There are several reasons to be interested in conformal field theories in two dimensions. Apart from...
Two dimensional conformal field theories have received a lot of attention due to their relevance in ...
There are several reasons to be interested in conformal field theories in two dimensions. Apart from...
Some aspects of conformal field theory over Riemann surfaces are examined. We study, in particular, ...
Two dimensional conformal field theories have received a lot of attention due to their relevance in ...
We formulate axioms of conformal theory (CT) in dimensions $>2$ modifying Segal's axioms...
We have two different axiomatic approaches to chiral conformal field theory (CFT). The conformal net...
We have two different axiomatic approaches to chiral conformal field theory (CFT). The conformal net...
This article develops new techniques for understanding the relationship between the three different ...
This thesis describes a new approach to conformal field theory. This approach combines the method of...
We present an operator algebraic formulation of chiral conformal field theory and show how it is rel...
This thesis contains results relevant for two different classes of conformal field theory. We partly...
23 pages, 12 figures, LateX. To appear in MATHPHYS ODYSSEY 2001 --Integrable Models and Beyond, ed. ...
Chiral algebras form the primary algebraic structure of modern conformal field theory. Each chiral a...
Starting from a chiral conformal Haag-Kastler net of local observables on two-dimensional Minkowski ...
There are several reasons to be interested in conformal field theories in two dimensions. Apart from...
Two dimensional conformal field theories have received a lot of attention due to their relevance in ...
There are several reasons to be interested in conformal field theories in two dimensions. Apart from...
Some aspects of conformal field theory over Riemann surfaces are examined. We study, in particular, ...
Two dimensional conformal field theories have received a lot of attention due to their relevance in ...
We formulate axioms of conformal theory (CT) in dimensions $>2$ modifying Segal's axioms...