On stability of non-domination under taking products

D. Kotschick; C. Loeh; C. Neofytidis

arXiv:1507.01413·math.GT·April 5, 2016

On stability of non-domination under taking products

D. Kotschick, C. Loeh, C. Neofytidis

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TL;DR

This paper demonstrates that non-domination properties of targets not dominated by products remain stable when considering Cartesian products, providing insights into the structure of such mathematical objects.

Contribution

It establishes the stability of non-domination results under Cartesian products for certain targets, extending previous understanding in the field.

Findings

01

Non-domination results are stable under Cartesian products.

02

Targets not dominated by products retain their non-domination properties after taking products.

03

Provides a theoretical foundation for analyzing product stability in non-domination scenarios.

Abstract

We show that non-domination results for targets that are not dominated by products are stable under Cartesian products.

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