کلیدواژهها
|
,Classical r-matrix, Deformation, sigma model, WZW model
Graded classical Yang-Baxter equation, Lie superalgebra
|
چکیده
|
We proceed to generalize the Yang-Baxter (YB) deformation of Wess-Zumino-Witten (WZW) model to the Lie supergroups case.
This generalization enables us to utilize various kinds of solutions of the
(modified) graded classical Yang-Baxter equation ((m)GCYBE) to classify
the YB deformations of WZW models based on the Lie supergroups.
We obtain the inequivalent solutions (classical r-matrices)
of the (m)GCYBE for the $gl(1|1)$ and $({\cal C}^3 +{\cal A})$ Lie superalgebras
in the non-standard basis,
in such a way that the corresponding automorphism transformations are employed.
Then, the YB deformations of the WZW models based on the $GL(1|1)$ and $(C^3 + A)$ Lie supergroups
are specified by skew-supersymmetric
classical r-matrices satisfying (m)GCYBE.
In some cases for both families of deformed models,
the metrics remain invariant under the deformation, while the components of $B$-fields are changed.
After checking the conformal invariance of the models up to one-loop order, it is concluded that
the $GL(1|1)$ and $(C^3 + A)$ WZW models are
conformal theories within the classes of the YB deformations preserving the conformal invariance.
However, our results are interesting in themselves,
but at a constructive level, may prompt many new insights into (generalized) supergravity solutions.
|