Horizontal Kakeya maximal operators in finite Heisenberg groups: Exact exponents and applications

Abstract

Let q be an odd prime power. We study Kakeya maximal operators associated with horizontal lines in the finite Heisenberg groups Hn( Fq). Our principal object is the refined-direction maximal operator, whose parameter records the projective horizontal direction together with the central homogeneous coordinate determined by horizontality. In rank one, we prove \[ \|M H1rdF\|2( D1) q12 \|F\|2( H1( Fq)), \] where the exponent 12 is sharp. Combining this estimate with endpoint bounds and interpolation, we determine the exact mixed-norm growth exponent: \[ Ard1(u,v) = \ 1v,\, 1-1u,\, 2v-1u,\, 1+2v-3u \, 1 u,v∞. \] As a consequence, if E⊂ H1( Fq) meets, in at least m points, a horizontal line in each refined direction from Ω⊂ D1, then \[ |E| m2|Ω|q. \] As a benchmark, we also analyze the coarser operator parameterized only by projective horizontal directions and determine its exact uv growth exponent in every rank. In rank one, this benchmark is established by a self-contained TT* argument rather than polynomial vanishing, and the same planar estimate reappears as the zero-central-frequency component of the refined-direction proof. The nonzero central frequencies are controlled by Plancherel, character orthogonality, and a bounded-fiber property of an explicit quadratic map. Thus, the sharp refined-direction estimate is obtained by purely Fourier-analytic methods.

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