Form factors and action of U-1(sl2~) on infinite-cycles

Abstract

Let p=\Pn,l\n,l∈ 0 n-2l=m be a sequence of skew-symmetric polynomials in X1,...,Xl satisfying XjPn,l n-1, whose coefficients are symmetric Laurent polynomials in z1,...,zn. We call p an ∞-cycle if Pn+2,l+1|Xl+1=z-1,zn-1=z,zn=-z =z-n-1Πa=1l(1-Xa2z2)· Pn,l holds for all n,l. These objects arise in integral representations for form factors of massive integrable field theory, i.e., the SU(2)-invariant Thirring model and the sine-Gordon model. The variables αa=- Xa are the integration variables and βj= zj are the rapidity variables. To each ∞-cycle there corresponds a form factor of the above models. Conjecturally all form-factors are obtained from the ∞-cycles. In this paper, we define an action of U-1(sl2) on the space of ∞-cycles. There are two sectors of ∞-cycles depending on whether n is even or odd. Using this action, we show that the character of the space of even (resp. odd) ∞-cycles which are polynomials in z1,...,zn is equal to the level (-1) irreducible character of sl2 with lowest weight -0 (resp. -1). We also suggest a possible tensor product structure of the full space of ∞-cycles.

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