New Nikodym set constructions over finite fields
Abstract
For any fixed dimension d ≥ 3 we construct a Nikodym set in Fqd of cardinality qd - (d-2 2 +1+o(1)) qd-1 q in the limit q ∞, when q is an odd prime power. This improves upon the naive random construction, which gives a set of cardinality qd - (d-1+o(1)) qd-1 q, and is new in the regime where Fq has unbounded characteristic and q not a perfect square. While the final proofs are completely human generated, the initial ideas of the construction were inspired by output from the tools AlphaEvolve and DeepThink. We also present a simple construction of Nikodym sets in Fq2 for q a perfect square that is a special case of known unital-based constructions, and matches the existing bounds of q2 - q3/2 + O(q q), assuming that q is not the square of a prime p 3 4.
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