We demonstrate the existence of a topological disconnection threshold, recently found by Borgonovi et al. [J. Stat. Phys. 116, 1435 (2004)], for generic 1−d anisotropic Heisenberg models interacting with an interparticle potential R−α when 0<α<1 (here R is the distance among spins). We also show that if α is greater than the embedding dimension d then the ratio between the disconnected energy region and the total energy region goes to zero when the number of spins becomes very large. On the other hand, numerical simulations in d=2,3 for the long-range case α<d support the conclusion that such a ratio remains finite for large N values. The disconnection threshold can thus be thought of as a distinctive property of anisotropic long-range interacting systems.
Borgonovi, F., Celardo, G., Musesti, A., Trasarti Battistoni, R., Vachal, P., Topological nonconnectivity threshold in long-range spin systems, <<PHYSICAL REVIEW E, STATISTICAL, NONLINEAR, AND SOFT MATTER PHYSICS>>, 2006; 73 (N/A): N/A-N/A. [doi:10.1103/PhysRevE.73.026116] [http://hdl.handle.net/10807/90644]
Topological nonconnectivity threshold in long-range spin systems
Borgonovi, Fausto;Celardo, Giuseppe;Musesti, Alessandro;Trasarti Battistoni, Roberto;
2006
Abstract
We demonstrate the existence of a topological disconnection threshold, recently found by Borgonovi et al. [J. Stat. Phys. 116, 1435 (2004)], for generic 1−d anisotropic Heisenberg models interacting with an interparticle potential R−α when 0<α<1 (here R is the distance among spins). We also show that if α is greater than the embedding dimension d then the ratio between the disconnected energy region and the total energy region goes to zero when the number of spins becomes very large. On the other hand, numerical simulations in d=2,3 for the long-range case α
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