Abstract
We study deformations of 2D Integrable Quantum Field Theories (IQFT) which preserve integrability (the existence of infinitely many local integrals of motion). The IQFT are understood as “effective field theories”, with finite ultraviolet cutoff. We show that for any such IQFT there are infinitely many integrable deformations generated by scalar local fields Xs, which are in one-to-one correspondence with the local integrals of motion; moreover, the scalars Xs are built from the components of the associated conserved currents in a universal way. The first of these scalars, X1, coincides with the composite field (TT¯) built from the components of the energy–momentum tensor. The deformations of quantum field theories generated by X1 are “solvable” in a certain sense, even if the original theory is not integrable. In a massive IQFT the deformations Xs are identified with the deformations of the corresponding factorizable S-matrix via the CDD factor. The situation is illustrated by explicit construction of the form factors of the operators Xs in sine-Gordon theory. We also make some remarks on the problem of UV completeness of such integrable deformations.
Highlights
A substantial number of Integrable Quantum Field Theories (IQFT) is known in two space-time dimensions
If Σ is the space of all 2D Quantum Field Theories (QFT), one can think of the subspace ΣInt ⊂ Σ of IQFT
The space T Σ|IQFT is given by the span of all local scalar fields present in a given IQFT, and the subspace T ΣInt|IQFT consists of all fields which, being added as perturbations of IFT, preserve its integrability
Summary
A substantial number of Integrable Quantum Field Theories (IQFT) is known in two space-time dimensions. If Σ is the space of all 2D Quantum Field Theories (QFT), one can think of the subspace ΣInt ⊂ Σ of IQFT. Given an IQFT, we will try to enumerate all its infinitesimal deformations which preserve integrability By definition, such deformations form the tangent space T ΣInt|IQFT, which is a subspace of T Σ|IQFT. The space T Σ|IQFT is given by the span of all local scalar fields (modulo total derivatives) present in a given IQFT, and the subspace T ΣInt|IQFT consists of all fields which, being added as perturbations of IFT, preserve its integrability. In many cases the set {Xs} form basis in T ΣInt|IQFT, but generally a finite number of additional fields have to be added to span the whole of this space.
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