Rate-induced tipping and saddle-node bifurcation for a class of quadratic differential equations with nonautonomous asymptotic dynamics

Abstract

An in-depth analysis of nonautonomous bifurcations of saddle-node type for scalar differential equations x'=-x2+q(t)\,x+p(t), where q and p are bounded and uniformly continuous, is fundamental to explain the absence or occurrence of rate-induced tipping for the differential equation y' =(y-(2/π)(ct))2+p(t) as the rate c varies on [0,∞). A classical attractor-repeller pair, whose existence for c=0 is assumed, may persist for any c>0, or disappear for a certain critical rate c=c0, giving rise to rate-induced tipping. A suitable example demonstrates that one can have more than one critical rate, and the existence of the classical attractor-repeller pair may return when c increases.

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