On the Sample Complexity of Privately Learning Axis-Aligned Rectangles

Abstract

We revisit the fundamental problem of learning Axis-Aligned-Rectangles over a finite grid Xd⊂eqRd with differential privacy. Existing results show that the sample complexity of this problem is at most \ d·|X| \;,\; d1.5·(*|X| )1.5\. That is, existing constructions either require sample complexity that grows linearly with |X|, or else it grows super linearly with the dimension d. We present a novel algorithm that reduces the sample complexity to only O\d·(*|X|)1.5\, attaining a dimensionality optimal dependency without requiring the sample complexity to grow with |X|.The technique used in order to attain this improvement involves the deletion of "exposed" data-points on the go, in a fashion designed to avoid the cost of the adaptive composition theorems. The core of this technique may be of individual interest, introducing a new method for constructing statistically-efficient private algorithms.