arXiv:hep-th/9507053 Abstract

arXiv:hep-th/9507053Abstract References Reviews Resources

Massless Boundary Sine-Gordon at the Free Fermion Point: Correlation and Partition Functions with Applications to Quantum Wires

Published 1995-07-09Version 1

In this report we compute the boundary states (including the boundary entropy) for the boundary sine-Gordon theory. From the boundary states, we derive both correlation and partition functions. Through the partition function, we show that boundary sine-Gordon maps onto a doubled boundary Ising model. With the current-current correlators, we calculate for finite system size the ac-conductance of tunneling quantum wires with dimensionless free conductance 1/2 (or, alternatively interacting quantum Hall edges at filling fraction 1/2). In the dc limit, the results of C. Kane and M. Fisher, Phys. Rev. B46 (1992) 15233, are reproduced.

Comments: 24 pages; Tex with harvmac macros; 4 Postscript figures, uuencoded

Categories: hep-th, cond-mat

Keywords: partition function, free fermion point, massless boundary sine-gordon, quantum wires, interacting quantum hall edges

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