论文信息 - Infinite number of conserved quantities and extended conformal algebra in the Thirring model

Infinite number of conserved quantities and extended conformal algebra in the Thirring model

It is shown that the Thirring model has an infinite number of local conserved quantities, explicit forms of which are presented. These quantities are shown to be expressed in terms of scattering parameters. It will be shown that in this model there exists an extended symmetry algebra that includes the Virasoro algebra as its subalgebra.

Kazuhiko Inoue | M. Omote | K. Odaka

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