The Subspace Flatness Conjecture and Faster Integer Programming

Abstract

In a seminal paper, Kannan and Lov\'asz (1988) considered a quantity μKL(,K) which denotes the best volume-based lower bound on the covering radius μ(,K) of a convex body K with respect to a lattice . Kannan and Lov\'asz proved that μ(,K) ≤ n · μKL(,K) and the Subspace Flatness Conjecture by Dadush (2012) claims a O((2n)) factor suffices, which would match the lower bound from the work of Kannan and Lov\'asz. We settle this conjecture up to a constant in the exponent by proving that μ(,K) ≤ O(3(2n)) · μKL (,K). Our proof is based on the Reverse Minkowski Theorem due to Regev and Stephens-Davidowitz (2017). Following the work of Dadush (2012, 2019), we obtain a ((2n))O(n)-time randomized algorithm to solve integer programs in n variables. Another implication of our main result is a near-optimal flatness constant of O(n 2(2n)), improving on the previous bound of O(n4/3 O(1) (2n)).