We study rigorously a lattice gas version of the Sherrington–Kirckpatrick spin glass model. In discrete optimization literature this problem is known as unconstrained binary quadratic programming and it belongs to the class NP-hard. We prove that the fluctuations of the ground state energy tend to vanish in the thermodynamic limit, and we give a lower bound of such ground state energy. Then we present a heuristic algorithm, based on a probabilistic cellular automaton, which seems to be able to find configurations with energy very close to the minimum, even for quite large instances.
Gaussian Mean Field Lattice Gas / Scoppola, B.; Troiani, A.. - In: JOURNAL OF STATISTICAL PHYSICS. - ISSN 0022-4715. - 170:6(2018), pp. 1161-1176. [10.1007/s10955-018-1984-2]
Gaussian Mean Field Lattice Gas
Scoppola B.;Troiani A.
2018
Abstract
We study rigorously a lattice gas version of the Sherrington–Kirckpatrick spin glass model. In discrete optimization literature this problem is known as unconstrained binary quadratic programming and it belongs to the class NP-hard. We prove that the fluctuations of the ground state energy tend to vanish in the thermodynamic limit, and we give a lower bound of such ground state energy. Then we present a heuristic algorithm, based on a probabilistic cellular automaton, which seems to be able to find configurations with energy very close to the minimum, even for quite large instances.| File | Dimensione | Formato | |
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