Trichotomy for the HRT Conjecture for mixed integer configuration

Abstract

We consider the HRT conjecture in the mixed-integer setting, where a finite configuration in d×d consists of N-1 points in d×d and one point (α,β) outside the lattice. Assuming a linear dependence among the corresponding time-frequency shifts of a nonzero Schwartz function, we apply the Zak transform to obtain a cocycle over translation by γ=(-α,β) on 2d and study the orbit closure \[ H=\nγ 2d:n∈\. \] We show that this reduction yields a trichotomy. The dense-orbit case is impossible because a Zak zero propagates to a dense zero set, forcing the Zak transform to vanish identically. The finite-orbit case reduces to a rational configuration, and hence to the lattice case covered by Linnell's theorem. Thus any mixed-integer counterexample for a Schwartz window must occur in the infinite proper case. For that remaining case, we prove that the nonvanishing set of the Zak transform is H-saturated, that the averaged logarithmic growth of the modulus cocycle along H exists and vanishes identically, and that the restriction to each nonvanishing H0-coset satisfies a smooth cohomological equation. This yields small-divisor compatibility conditions for the induced translation on H0. We further obtain an arithmetic rigidity condition. These results isolate a collection of necessary dynamical, cohomological, and arithmetic constraints that any mixed-integer counterexample must satisfy.