On the SOS Rank of Simple and Diagonal Biquadratic Forms

Abstract

We study the sum-of-squares (SOS) rank of simple and diagonal biquadratic forms. For simple biquadratic forms in 3 × 3 variables, we show that the maximum SOS rank is exactly 6, attained by a specific six-term form. We further prove that for any m 3, there exists an m × m simple biquadratic form whose SOS rank is exactly 2m. Moreover, we show that for all m, n 3, the maximum SOS rank over m × n simple biquadratic forms is at least m+n, which implies BSR(m,n) m+n. For diagonal biquadratic forms with nonnegative coefficients, we prove an SOS rank upper bound of 7, improving the general bound of 8 for 3 × 3 forms. These results provide new lower and upper bounds on the worst-case SOS rank of biquadratic forms and highlight the role of structure in reducing the required number of squares.