Replica Field Theory for Deterministic Models: Binary Sequences with Low Autocorrelation
Abstract
We study systems without quenched disorder with a complex landscape, and we use replica symmetry theory to describe them. We discuss the Golay-Bernasconi-Derrida approximation of the low autocorrelation model, and we reconstruct it by using replica calculations. Then we consider the full model, its low properties (with the help of number theory) and a Hartree-Fock resummation of the high-temperature series. We show that replica theory allows to solve the model in the high phase. Our solution is based on one-link integral techniques, and is based on substituting a Fourier transform with a generic unitary transformation. We discuss this approach as a powerful tool to describe systems with a complex landscape in the absence of quenched disorder.
Cite
@article{arxiv.hep-th/9405148,
title = {Replica Field Theory for Deterministic Models: Binary Sequences with Low Autocorrelation},
author = {E. Marinari and G. Parisi and F. Ritort},
journal= {arXiv preprint arXiv:hep-th/9405148},
year = {2009}
}
Comments
42 pages, uufile with eps figures added in figures, ROM2F/94/15