A Universal Reproducing Kernel Hilbert Space from Polynomial Alignment and IMQ Distance

Abstract

We introduce the Yat kernel kb,(w,x)=(wx+b)2\|x-w\|2+, b 0,\ >0, a rational hidden-unit primitive whose units are Mercer sections over a shared input/weight space. For b 0 the kernel is PSD; for b>0 it dominates a scaled inverse-multiquadric (IMQ) in the Loewner order, yielding fixed-kernel universality, characteristicness, and strict positive definiteness on every compact domain. The polynomial numerator opens nonradial alignment channels absent from finite IMQ expansions, witnessed by the directional far-field trace T∞ g(·;w,b)(u)=(uw)2. Algebraically, a second finite difference in the bias recovers any IMQ atom from three positive-bias Yat atoms exactly, sharp at three atoms in every dimension at exact pointwise equality. A trained shared-(b,) Yat layer is therefore a finite learned-center expansion in a fixed universal characteristic RKHS, with closed-form norm αKα and explicit diagonal (\|x\|2+b)2/ driving a Rademacher generalization bound.