Determining the validity of cumulant expansions for central spin models
Piper Fowler-Wright, Kristín B. Arnardóttir, Peter Kirton, Brendon W. Lovett, Jonathan Keeling
Abstract
For a model with many-to-one connectivity it is widely expected that mean-field theory captures the exact many-particle $N\ensuremath{\rightarrow}\ensuremath{\infty}$ limit, and that higher-order cumulant expansions of the Heisenberg equations converge to this same limit whilst providing improved approximations at finite $N$. Here we show that this is in fact not always the case. Instead, whether mean-field theory correctly describes the large-$N$ limit depends on how the model parameters scale with $N$, and the convergence of cumulant expansions may be nonuniform across even and odd orders. Further, even when a higher-order cumulant expansion does recover the correct limit, the error is not monotonic with $N$ and may exceed that of mean-field theory.