Chaos-Order Transition in Matrix Theory
I. Ya. Aref'eva, A.S. Koshelev, P. B. Medvedev
TL;DR
This paper investigates classical dynamics in SU(2) Matrix theory, revealing a transition from chaotic to regular behavior as angular momentum increases, even at small coupling constants.
Contribution
It demonstrates a chaos-order transition in SU(2) Matrix theory's classical dynamics, highlighting the role of angular momentum.
Findings
Chaos at low angular momentum
Regular behavior at high angular momentum
Transition occurs regardless of small coupling constant
Abstract
Classical dynamics in SU(2) Matrix theory is investigated. A classical chaos-order transition is found. For the angular momentum small enough (even for small coupling constant) the system exhibits a chaotic behavior, for angular momentum large enough the system is regular.
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