Concentration of the complexity of spherical pure p-spin models at arbitrary energies

Abstract

We consider critical points of the spherical pure p-spin spin glass model with Hamiltonian HN(σ)=1N(p-1)/2Σi1,...,ip=1NJi1,...,ipσi1·sσip, where σ=(σ1,...,σN)∈ SN-1:=\ σ∈RN:\, σ 2=N\ and Ji1,...,ip are i.i.d standard normal variables. Using a second moment analysis, we prove that for p≥ 32 and any E>-E∞, where E∞ is the (normalized) ground state, the ratio of the number of critical points σ with HN(σ)≤ NE and its expectation asymptotically concentrates at 1. This extends to arbitrary E a similar conclusion of [Sub17a].