Multiquadratic Sum-of-Squares Lower Bounds Imply VNC1 ≠ VNP

Abstract

The sum-of-squares (SoS) complexity of a d-multiquadratic polynomial f (quadratic in each of d blocks of n variables) is the minimum s such that f = Σi=1s gi2 with each gi d-multilinear. In the case d=2, Hrubes, Wigderson and Yehudayoff (2011) showed that an n1+(1) lower bound on the SoS complexity of explicit biquadratic polynomials implies an exponential lower bound for non-commutative arithmetic circuits. In this paper, we establish an analogous connection between general multiquadratic sum-of-squares and commutative arithmetic formulas. Specifically, we show that an nd-o( d) lower bound on the SoS complexity of explicit d-multiquadratic polynomials, for any d = d(n) with ω(1) d(n) O( n n), would separate the algebraic complexity classes VNC1 and VNP.

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