We classify the operator content of local hermitian scalar operators in the SinhGordon model by means of independent solutions of the form-factor bootstrap equations. The corresponding linear space is organized into a tower-like structure of dimension n for the form factors F 2n and F 2n−1 . Analyzing the cluster property of the form factors, a particular class of these solutions can be identified with the matrix elements of the operators e kgφ . We also present the complete expression of the form factors of the elementary field φ(x) and the trace of the energy-momentum tensor Θ(x).
We analyze the algebraic structure of φ 1,2 perturbed minimal models relating them to graph-state models with an underlying Birman-Wenzl-Murakami algebra.Using this approach one can clarify some physical properties and reformulate the bootstrap equations. These are used to calculate the S-matrix elements of higher kinks, and to determine the breather spectrum of the φ 1,2 perturbations of the unitary minimal models M r,r+1 .
The space of local operators in massive deformations of conformal field theories is analysed. For several model systems it is shown that one can define chiral sectors in the theory, such that the chiral field content is in a one-to-one correspondence with that of the underlying conformal field theory. The full space of operators consists of the descendent spaces of all scalar fields. If the theory contains asymptotic states which satisfy generalised statistics, the form factor equations admit in addition also solutions corresponding to the descendent spaces of the para-fermionic operators of the same spin as the asymptotic states. The derivation of these results uses q-sum expressions for the characters and q-difference equations used in proving Rogers-Ramanujan type identities.
The form-factor bootstrap approach is applied to the perturbed minimal models M 2,2n+3 in the direction of the primary field φ 1,3 . These theories are integrable and contain n massive scalar particles, whose S-matrix is purely elastic. The formfactor equations do not refer to a specific operator. We use this fact to classify the operator content of these models. We show that the perturbed models contain the same number of primary fields as the conformal ones. Explicit solutions are constructed and conjectured to correspond to the off-critical primary fields φ 1,k .
We compute the S-matrix of the Tricritical Ising Model perturbed by the subleading magnetic operator using Smirnov's RSOS reduction of the Izergin-Korepin model. The massive model contains kink excitations which interpolate between two degenerate asymmetric vacua. As a consequence of the different structure of the two vacua, the crossing symmetry is implemented in a non-trivial way. We use finite-size techniques to compare our results with the numerical data obtained by the Truncated Conformal Space Approach and find good agreement.
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