# Valuations on convex functions and convex sets and Monge-Ampere   operators

**Authors:** Semyon Alesker

arXiv: 1703.08778 · 2017-04-04

## TL;DR

This paper explores the relationship between valuations on convex functions and convex sets, utilizing Monge-Ampere operators across various algebraic settings to generate new examples and establish structural properties.

## Contribution

It constructs a natural linear map linking valuations on convex functions to those on convex bodies, proving its dense image and infinite-dimensional kernel, and extends the framework using complex and quaternionic Monge-Ampere operators.

## Key findings

- Established a linear map with dense image from valuations on convex functions to convex bodies.
- Proved the kernel of this map is infinite dimensional.
- Extended valuation constructions using complex, quaternionic, and octonionic Monge-Ampere operators.

## Abstract

The notion of a valuation on convex bodies is very classical. The notion of a valuation on a class of functions was recently introduced and studied by M. Ludwig and others. We study an explicit relation between continuous valuations on convex functions which are invariant under adding arbitrary linear functionals, and translations invariant continuous valuations on convex bodies. More precisely, we construct a natural linear map from the former space to the latter and prove that it has dense image and infinite dimensional kernel. The proof uses the author's irreducibility theorem and few properties of the real Monge-Ampere operators due to A.D. Alexandrov and Z. Blocki. Fur- thermore we show how to use complex, quaternionic, and octonionic Monge-Ampere operators to construct more examples of continuous valuations on convex functions in an analogous way.

## Full text

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## References

22 references — full list in the complete paper: https://tomesphere.com/paper/1703.08778/full.md

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Source: https://tomesphere.com/paper/1703.08778