Physics – Condensed Matter – Disordered Systems and Neural Networks
Scientific paper
2007-03-08
Physics
Condensed Matter
Disordered Systems and Neural Networks
10 pages. Submitted to J. Phys. Soc. Jpn
Scientific paper
10.1143/JPSJ.76.074711
We derive a rigorous lower bound on the average local energy for the Ising model with quenched randomness. The result is that the lower bound is given by the average local energy calculated in the absence of all interactions other than the one under consideration. The only condition for this statement to hold is that the distribution function of the random interaction under consideration is symmetric. All other interactions can be arbitrarily distributed including non-random cases. A non-trivial fact is that any introduction of other interactions to the isolated case always leads to an increase of the average local energy, which is opposite to ferromagnetic systems where the Griffiths inequality holds. Another inequality is proved for asymmetrically distributed interactions. The probability for the thermal average of the local energy to be lower than that for the isolated case takes a maximum value on the Nishimori line as a function of the temperature. In this sense the system is most stable on the Nishimori line.
Aoki Akira
Kitatani Hidetsugu
Nishimori Hidetoshi
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