Lipschitz flow-box theorem

Craig Calcaterra, Axel Boldt · 2006 · arXiv math/0305207

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A Theory of Saddle Escape in Deep Nonlinear Networks

cs.LG · 2026-05-02 · conditional · novelty 7.0 · 2 refs

An exact norm-imbalance identity classifies activations into four classes and reduces deep nonlinear training flow to a scalar ODE that predicts saddle escape time scaling as ε to the power of minus (r-2) for r bottleneck layers.

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A Theory of Saddle Escape in Deep Nonlinear Networks cs.LG · 2026-05-02 · conditional · none · ref 13 · 2 links
An exact norm-imbalance identity classifies activations into four classes and reduces deep nonlinear training flow to a scalar ODE that predicts saddle escape time scaling as ε to the power of minus (r-2) for r bottleneck layers.

Lipschitz flow-box theorem

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