Sum-difference exponents for boundedly many slopes, and rational complexity
Abstract
The dimension of Kakeya sets can be bounded using sum-difference exponents (R;s) for various sets of rational slopes R and output slope s; the arithmetic Kakeya conjecture, which implies the Kakeya conjecture in all dimensions, asserts that the infimum of such exponents is 1. The best upper bound on this infimum currently is 1.67513…. In this note, inspired by numerical explorations from the tool AlphaEvolve, we study the regime where the cardinality of the set of slopes R is bounded. In this regime, we establish that these exponents converge to 2 at a rate controlled by the rational complexity of s relative to R, which measures how efficiently s can be expressed as a rational combination of slopes in R.
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