The SOS Rank of a 5 × 4 Biquadratic Form via Orthogonality

Abstract

Biquadratic forms arise naturally in polynomial optimization, tensor analysis, and quantum information theory. A key problem is determining the minimal number of squares needed in a sum-of-squares (SOS) representation of such a form, known as its SOS rank. For fixed dimensions (m,n), the maximum possible SOS rank over all biquadratic forms in m and n variables is denoted BSR(m,n). Recent advances have established lower bounds on BSR(m,n) via combinatorial constructions involving bipartite graphs and the orthogonality method. In particular, for the case (m,n)=(5,4), it was shown that BSR(5,4) 11 using only nondegenerate 2-edges. In this paper, we extend this framework by incorporating a degenerate 2-edge, which introduces a cross term where the two y-indices coincide. We construct an explicit 5× 4 biquadratic form and apply the orthogonality method to prove that its SOS rank is 12, thereby improving the lower bound to BSR(5,4)12. This result demonstrates that degenerate 2-edges yield additional algebraic flexibility beyond purely combinatorial bounds and extends the applicability of the orthogonality method to forms with cross terms involving identical y-indices.

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