Abstract:
General solution of quantum Gelfand–Levitan–Marchenko equations for sine-Gordon model with $\gamma=\pi/\nu$ ($\nu$ being integer) is obtained. Matrix elements of operators
$ευπ(\pm i\sqrt{2\gamma}\times
u(x_0, x_1))$ between the vacuum and arbitrary state are calculated. The series for
two-point Green functions are obtained. The coincidence with the case of free massive
Fermi field for $\gamma=\pi/2$ is verified. The possibility of obtaining similar formulas for other
local operators is discussed.
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