On p-Gaussian-Grothendieck problem

Abstract

For p≥ 1 and (gij)1≤ i,j≤ n being a matrix of i.i.d. standard Gaussian entries, we study the n-limit of the p-Gaussian-Grothendieck problem defined as align*\Σi,j=1n gijxixj: x∈ Rn,Σi=1n |xi|p=1\.align* The case p=2 corresponds to the top eigenvalue of the Gaussian Orthogonal Ensemble; when p=∞, the maximum value is essentially the ground state energy of the Sherrington-Kirkpatrick mean-field spin glass model and its limit can be expressed by the famous Parisi formula. In the present work, we focus on the cases 1≤ p<2 and 2<p<∞. For the former, we compute the limit of the p-Gaussian-Grothendieck problem and investigate the structure of the set of all near optimizers along with stability estimates. In the latter case, we show that this problem admits a Parisi-type variational representation and the corresponding optimizer is weakly delocalized in the sense that its entries vanish uniformly in a polynomial order.