We establish dynamical Borel-Cantelli lemmas for nested balls and rectangles centered at generic points in the setting of geometric Lorenz maps. We also establish extreme value statistics for observations maximized at generic points for geometric Lorenz maps and the associated flow.
Extreme Value Theory for Piecewise Contracting Maps with Randomly Applied Stochastic Perturbations
Extreme Value Theory with Spectral Techniques: application to a simple attractor
Perturbation formulae for quenched random dynamics with applications to open systems and extreme value theory
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