Associativity of the Morley product of invariant measures in NIP   theories

Gabriel Conant; Kyle Gannon

arXiv:2104.08298·math.LO·March 4, 2022·LoG

Associativity of the Morley product of invariant measures in NIP theories

Gabriel Conant, Kyle Gannon

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TL;DR

This paper provides a new proof that the Morley product of invariant measures is associative in NIP theories, addressing a previously identified gap.

Contribution

It offers a novel proof of associativity for the Morley product in NIP theories, filling a gap in the existing literature.

Findings

01

Established associativity of the Morley product in NIP theories

02

Provided a new proof addressing previous gaps

03

Enhanced understanding of invariant measures in model theory

Abstract

In light of a gap found by Krupi\'{n}ski, we give a new proof of associativity for the Morley (or "nonforking") product of invariant measures in NIP theories.

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