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Counting equilibria of large complex systems by instability index

Gérard Ben Arous, Yan V. Fyodorov, Boris A. Khoruzhenko

2021PubMed Central42 citationsDOIOpen Access PDF

Abstract

We consider a nonlinear autonomous system of [Formula: see text] degrees of freedom randomly coupled by both relaxational (“gradient”) and nonrelaxational (“solenoidal”) random interactions. We show that with increased interaction strength, such systems generically undergo an abrupt transition from a trivial phase portrait with a single stable equilibrium into a topologically nontrivial regime of “absolute instability” where equilibria are on average exponentially abundant, but typically, all of them are unstable, unless the dynamics is purely gradient. When interactions increase even further, the stable equilibria eventually become on average exponentially abundant unless the interaction is purely solenoidal. We further calculate the mean proportion of equilibria that have a fixed fraction of unstable directions.

Topics & Concepts

Solenoidal vector fieldPhase portraitInstabilityStatistical physicsDegrees of freedom (physics and chemistry)MathematicsExponential growthNonlinear systemPhysicsMathematical analysisBifurcationThermodynamicsMechanicsGeometryQuantum mechanicsVector fieldTheoretical and Computational PhysicsAdvanced Thermodynamics and Statistical MechanicsStochastic processes and statistical mechanics
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