For which real quadratic fields is Kim's octonary form universal?

Abstract

Let K=Q(D) with D>1 squarefree, and let + be the totally positive fundamental unit of OK. B. M. Kim proved in 2000 that the octonary diagonal form \[ f=x12+·s+x42++(x52+·s+x82) \] is universal over OK whenever D=n2-1 is squarefree. We complete Kim's result to an if-and-only-if classification: f is universal if and only if D=n2-1 for some n2, or D=n2-4 for some odd n3, in both cases subject to squarefreeness. The second family appears to be new in this context and contains Q(5) at n=3 as a degenerate boundary case, recovering Maaß's classical exceptional three-square phenomenon. Equivalently, f is universal over OK if and only if the Blomer--Kala invariant MD equals 1; for the two stated families we have MD=1, so the Blomer--Kala universal 8MD-variable construction specializes exactly to f. The converse leverages a continued-fraction involution τ(γ)=+γ' together with a closed formula in convergent coordinates, a three-consecutive-square-values lemma for primitive quadratic polynomials of positive fundamental discriminant, and an even-root exclusion lemma derived from complete-quotient norm bounds.