Chaos in lattices of many interacting classical spins
by
Astrid S. de Wijn(Stockholm University)
→
Europe/Stockholm
122:026
122:026
Description
We investigate how generic the onset of chaos in interacting many-body
classical systems is in the context of lattices of classical spins with
nearest-neighbor anisotropic couplings. Seven large lattices in different
spatial dimensions were considered. For each lattice, more than 2000 largest
Lyapunov exponents for randomly sampled Hamiltonians were numerically computed.
Our results strongly suggest the absence of integrable nearest-neighbor
Hamiltonians for the infinite lattices except for the trivial Ising case. In
the vicinity of the Ising case, the largest Lyapunov exponents exhibit a
power-law growth, while further away they become rather weakly sensitive to the
Hamiltonian anisotropy. We also provide an analytical derivation of these
results.