For any A subset of reals with Hausdorff dimension s in (0,1/2], either upper box dim(AA) or lower box dim(A+A) is at least 29s/23 (or 33s/26 for differences).
Projections, Furstenberg sets, and theABCsum-product problem
2 Pith papers cite this work. Polarity classification is still indexing.
2
Pith papers citing it
fields
math.CA 2years
2026 2verdicts
UNVERDICTED 2representative citing papers
A survey sketching the proof of the three-dimensional Kakeya conjecture by Wang and Zahl.
citing papers explorer
-
A note on the sum-product problem for fractal sets
For any A subset of reals with Hausdorff dimension s in (0,1/2], either upper box dim(AA) or lower box dim(A+A) is at least 29s/23 (or 33s/26 for differences).
-
The Kakeya conjecture, after Wang and Zahl
A survey sketching the proof of the three-dimensional Kakeya conjecture by Wang and Zahl.