Abstract:We introduce a Rayleigh-quotient minimax method for locating maximal one-sided saddle-node bifurcations in nonlinear equations, including non-variational ones. The method avoids branch continuation and instead selects the critical point directly through the minimax bifurcation formula \[ \lambda^* := \sup_{u\in\mathcal U^o} \inf_{v\in\mathcal S\setminus\{0\}} \mathcal R(u,v), \] where \(\mathcal R\) is a two-variable extended Rayleigh quotient on fixed cones. A saddle point of this quotient simultaneously determines the critical parameter, the bifurcation solution, and the adjoint singularity relation. This gives a direct characterization of the bifurcation threshold and leads to Galerkin minimax approximations, a posteriori parameter-margin estimates, and perturbation bounds for the critical value. The abstract assumptions are verified for nonlinear elliptic systems, including non-potential systems.
From: Yavdat Il'yasov [view email]
[v1]
Sun, 17 May 2026 08:48:09 UTC (28 KB)
[v2]
Fri, 12 Jun 2026 15:22:49 UTC (30 KB)
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