TL;DR
This paper discusses the universality class of the Kardar-Parisi-Zhang (KPZ) equation, highlighting its significance in understanding surface growth phenomena and related stochastic processes.
Contribution
It provides an overview of KPZ universality, emphasizing its broad applicability and recent developments in the field.
Findings
KPZ universality applies to various surface growth models.
Recent mathematical proofs support the universality class.
Connections to other stochastic processes are explored.
Abstract
This is the article by the same name which was published in the March 2016 issue of the AMS Notices. Due to space constraints, some references contained here were not provided in the published version were not provided. The figures in this article were made collaboratively with William Casselman.
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