On a Restriction Problem of Hickman and Wright for the Parabola in Z/NZ for Squarefree N

Abstract

Hickman and Wright proved an L2 restriction estimate for the parabola in Z/NZ of the form (1||Σm∈|f(m)|2 )12≤ Cε Nε· N-1(Σx∈ (Z/NZ)2|f(x)|65)56 for all functions f:(Z/NZ)2→ C and any ε>0, and that this bound is sharp when N has a large square factor, and especially for N = p2 for p a prime. In contrast, Mockenhaupt and Tao proved in the special case N = p the stronger estimate (1||Σm∈|f(m)|2 )12≤ C N-1(Σx∈ (Z/NZ)2|f(x)|43)34. We extend the Mockenhaupt-Tao bound to the case of squarefree N, proving (1||Σm∈|f(m)|2 )12≤ Cε Nε· N-1(Σx∈ (Z/NZ)2|f(x)|43)34, and discuss applications of this result to uncertainty principles and signal recovery.