2020
DOI: 10.1007/s10107-020-01558-2
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A tight degree 4 sum-of-squares lower bound for the Sherrington–Kirkpatrick Hamiltonian

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Cited by 7 publications
(7 citation statements)
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“…To complete that computation, we will show moreover that Y (n) and the associated pseudoexpectation E arise from a particular case of the spectral extension construction proposed by [KB20,Kun20] which describes Y (n) as a Gram matrix of certain polynomials under the apolar inner product. This observation will allow us to rephrase the computation of the eigenvalues Y (n) in terms of this Hilbert space of polynomials, which we can carry out in closed form.…”
Section: Main Results and Proof Ideasmentioning
confidence: 99%
See 2 more Smart Citations
“…To complete that computation, we will show moreover that Y (n) and the associated pseudoexpectation E arise from a particular case of the spectral extension construction proposed by [KB20,Kun20] which describes Y (n) as a Gram matrix of certain polynomials under the apolar inner product. This observation will allow us to rephrase the computation of the eigenvalues Y (n) in terms of this Hilbert space of polynomials, which we can carry out in closed form.…”
Section: Main Results and Proof Ideasmentioning
confidence: 99%
“…Using these, we prove and elaborate on Laurent's observations.Our arguments have two features that may be of independent interest. First, we show that the Grigoriev-Laurent pseudomoments are a special case of a Gram matrix construction of pseudomoments proposed by Bandeira and Kunisky (2020). Second, we find a new realization of the irreducible representations of the symmetric group corresponding to Young diagrams with two rows, as spaces of multivariate polynomials that are multiharmonic with respect to an equilateral simplex.…”
mentioning
confidence: 82%
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“…To the best of our knowledge, a variation of [47] for the diluted model (p < 1) has not yet been discussed. Furthermore, there is an integrality gap for the SDP relaxation of this problem in the Gaussian setting [40,48] whenever λ = 0. As we discuss in more detail in Appendix B, this implies that the value of the problem in the case τ ij = 1 converges to the largest eigenvalue of A in the limit n → ∞.…”
Section: Quadratic Quantum Speedups and Classical Speedups For Generic Instances And Spin Glassesmentioning
confidence: 99%
“…The following random instances of the MaxQP have received significant attention in recent literature [48,40,31]: we define the Gaussian orthogonal ensemble (GOE) to be the random matrix distribution over symmetric n × n matrices A with i.i.d. normal entries A ii ∼ N (0, 2/n) on the diagonal and A ij ∼ N (0, 1/n) for i < j.…”
Section: A Norms Of Random Matricesmentioning
confidence: 99%