Class Central is learner-supported. When you buy through links on our site, we may earn an affiliate commission.

YouTube

Is There a Triangle Inequality for Measures of Compact, Convex Sets?

Hausdorff Center for Mathematics via YouTube

Overview

Explore the intriguing world of convex geometry and measure theory in this 25-minute talk from the Hausdorff Center for Mathematics. Delve into the properties of convex bodies and their relationships, starting with the fundamental concept that a convex body K contained within another convex body L implies a smaller surface area for K. Examine the supermodularity inequality for Minkowski sums of convex bodies A, B, and C using Lebesgue measure. Investigate weighted analogues of these properties by replacing Lebesgue measure with Borel measures, and learn about recent findings by G. Saracco and G. Stefani regarding monotonicity properties of measures with density. Analyze the supermodularity property for Radon measures and its equivalence to a variant of the monotonicity problem. Discover the conclusion that a Radon measure exhibiting supermodularity must be the Lebesgue measure. Finally, consider restricted versions of this problem to gain a deeper understanding of measure theory in the context of compact, convex sets.

Syllabus

Dylan Langharst: Is there a triangle inequality for measures of compact, convex sets?

Taught by

Hausdorff Center for Mathematics

Reviews

Start your review of Is There a Triangle Inequality for Measures of Compact, Convex Sets?

Never Stop Learning.

Get personalized course recommendations, track subjects and courses with reminders, and more.

Someone learning on their laptop while sitting on the floor.