Faster integer multiplication using short lattice vectors
arXiv:1802.07932 · doi:10.2140/obs.2019.2.293
Abstract
We prove that $n$-bit integers may be multiplied in $O(n \log n \, 4^{\log^* n})$ bit operations. This complexity bound had been achieved previously by several authors, assuming various unproved number-theoretic hypotheses. Our proof is unconditional, and depends in an essential way on Minkowski's theorem concerning lattice vectors in symmetric convex sets.
16 pages