We study the metastability of the ferromagnetic Ising model on a random $r$-regular graph in the zero temperature limit. We prove that in the presence of a small positive external field the time that it takes to go from the all minus state to the all plus state behaves like ${\exp(\beta (r/2+ \mathcal{O}(\sqrt{r}))n)}$ when the inverse temperature $\beta\rightarrow\infty$ and the number of vertices $n$ is large enough. The proof is based on the so-called pathwise approach and bounds on the isoperimetric number of random regular graphs.
Metastability in the reversible inclusion process
Metastability for the contact process with two types of particles and priorities
Annealed limit theorems for the ising model on random regular graphs
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