4 research outputs found
Mean-Field Equations for Spin Models with Orthogonal Interaction Matrices
We study the metastable states in Ising spin models with orthogonal
interaction matrices. We focus on three realizations of this model, the random
case and two non-random cases, i.e.\ the fully-frustrated model on an infinite
dimensional hypercube and the so-called sine-model. We use the mean-field (or
{\sc tap}) equations which we derive by resuming the high-temperature expansion
of the Gibbs free energy. In some special non-random cases, we can find the
absolute minimum of the free energy. For the random case we compute the average
number of solutions to the {\sc tap} equations. We find that the
configurational entropy (or complexity) is extensive in the range
T_{\mbox{\tiny RSB}}. Finally we present an apparently
unrelated replica calculation which reproduces the analytical expression for
the total number of {\sc tap} solutions.Comment: 22+3 pages, section 5 slightly modified, 1 Ref added, LaTeX and
uuencoded figures now independent of each other (easier to print). Postscript
available http://chimera.roma1.infn.it/index_papers_complex.htm