Etienne Granet, Maurizio Fagotti, Fabian H. L. Essler
Published 2020-03-19Version 1
We consider the problems of calculating the dynamical order parameter two-point function at finite temperatures and the one-point function after a quantum quench in the transverse field Ising chain. Both of these can be expressed in terms of form factor sums in the basis of physical excitations of the model. We develop a general framework for carrying out these sums based on a decomposition of form factors into partial fractions, which leads to a factorization of the multiple sums and permits them to be evaluated asymptotically. This naturally leads to systematic low density expansions. At late times these expansions can be summed to all orders by means of a determinant representation. Our method has a natural generalization to semi-local operators in interacting integrable models.
Correlation functions of an interacting spinless fermion model at finite temperature
Fluctuations of linear statistics of free fermions in a harmonic trap at finite temperature
Density profile of noninteracting fermions in a rotating $2d$ trap at finite temperature
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