Haldane Gaps of Large-S Heisenberg Antiferromagnetic Chains and Asymptotic Behavior

Abstract

The one-dimensional Heisenberg antiferromagnets of large-integer-S spins are studied; their Haldane gaps are estimated by the numerical diagonalization method for S=5 and 6. We successfully obtain a monotonically increasing sequence of finite-size energy difference data corresponding to the Haldane gaps from the huge-scale parallel calculations of diagonalization under the twisted boundary condition and create a monotonically decreasing sequence within the range of system sizes treated in this study from the monotonically increasing sequence. Consequently, the gaps for S=5 and 6 are estimated to be 0.000050 0.000005 and 0.0000030 0.0000005, respectively. The asymptotic formula of the Haldane gap for S→∞ is examined from the new estimates to determine the coefficient in the formula more precisely.