Effective Angular Asymptotics and the Sharp D-3 Horoconvex Gap Scale

Abstract

We prove first-band large-diameter asymptotics for the Dirichlet spectrum on horoconvex domains in real hyperbolic space. After Chebyshev centering, a divergent sequence compactifies to a horospherical support-envelope deficit \[V\] on \[ Sn-1\]. For graph domains \[r<R-V(θ)\], the first band satisfies \[ λj+1=α2+π2R2 +2π2R3(ηj(Tn+V)-b0)+o(R-3), j=0,1, \] where \[Tn\] is the nonlocal spherical operator with multiplier \[ψ(+α)-ψ(α)\]. Consequently the horoconvex fundamental gap has the sharp \[D-3\] polynomial scale, and the leading large-diameter constant is characterized by the compact variational formula \[ 16π2∈fV∈ An (η1(Tn+V)-η0(Tn+V)). \] Geodesic balls realize the polynomial scale, but an explicit admissible axial perturbation lowers the reduced leading-constant value at first order.