On a generalized Collatz-Wielandt formula and finding saddle-node bifurcations

Abstract

We introduce the nonlinear generalized Collatz-Wielandt formula λ*= x∈ Qi:hi(x) ≠ 0 gi(x) hi(x), ~~Q ⊂ Rn, and prove that its solution (x*,λ*) yields the maximal saddle-node bifurcation for systems of equations of the form: g(x)-λ h(x)=0, ~~x ∈ Q. Using this we introduce a simply verifiable criterion for the detection of saddle-node bifurcations of a given system of equations. We apply this criterion to prove the existence of the maximal saddle-node bifurcations for finite-difference approximations of nonlinear partial differential equations and for the system of power flow equations.