On the union of essentially distinct δ-tubes

Abstract

We say two δ-tubes (dimension δ×·s×δ×1) in Rn are essentially distinct if the measure of their intersection is smaller than a half of a single δ-tube. For a collection of essentially distinct δ-tubes, we give the asymptotically sharp lower bound for the measure of their union. Then we characterize all sharp examples. We will give a new measurement of convexity based on the X-ray transform.