Connections between S-operators and restriction estimates for spheres over finite fields
Abstract
In this paper, we introduce a new operator, S, which is closely related to the restriction problem for spheres in Fqd, the d-dimensional vector space over the finite field Fq with q elements. The S operator is considered as a specific operator that maps functions on Fqd to functions on Fqd+1. We explore a relationship between the boundedness of the S operator and the restriction estimate for spheres in Fqd. Consequently, using this relationship, we prove that the L2 restriction conjectures for spheres hold in all dimensions when the test functions are restricted to homogeneous functions of degree zero.
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