A Tight Degree 4 Sum-of-Squares Lower Bound for the Sherrington-Kirkpatrick Hamiltonian
Abstract
We show that, if W ∈ RN × Nsym is drawn from the gaussian orthogonal ensemble, then with high probability the degree 4 sum-of-squares relaxation cannot certify an upper bound on the objective N-1 · x W x under the constraints xi2 - 1 = 0 (i.e. x ∈ \ 1 \N) that is asymptotically smaller than λ(W) ≈ 2. We also conjecture a proof technique for lower bounds against sum-of-squares relaxations of any degree held constant as N ∞, by proposing an approximate pseudomoment construction.
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