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Partial differential equations --- 51 <082.1> --- Mathematics--Series --- Wave equation. --- Differential equations, Parabolic. --- Équations d'onde --- Équations différentielles paraboliques --- Differential equations, Parabolic --- Wave equation --- Differential equations, Partial --- Wave-motion, Theory of --- Parabolic differential equations --- Parabolic partial differential equations --- Équations d'onde. --- Équations différentielles paraboliques.
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Topological groups. Lie groups --- Generalized spaces. --- Wave equation. --- Yang-Mills theory. --- Espaces généralisés --- Equation d'onde --- Théorie de Yang-Mills --- 51 <082.1> --- Mathematics--Series --- Espaces généralisés --- Théorie de Yang-Mills --- Generalized spaces --- Wave equation --- Yang-Mills theory --- Mills-Yang theory --- Yang-Mills theories --- Quantum field theory --- Differential equations, Partial --- Wave-motion, Theory of --- Geometry of paths --- Minkowski space --- Spaces, Generalized --- Weyl space --- Calculus of tensors --- Geometry, Differential --- Geometry, Non-Euclidean --- Hyperspace --- Relativity (Physics)
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"We show that the finite time type II blow up solutions for the energy critical nonlinear wave equation on constructed in Krieger, Schlag, and Tartaru ("Slow blow-up solutions for the critical focusing semilinear wave equation", 2009) and Krieger and Schlag ("Full range of blow up exponents for the quintic wave equation in three dimensions", 2014) are stable along a co-dimension one Lipschitz manifold of data perturbations in a suitable topology, provided the scaling parameter is sufficiently close to the self-similar rate, i. e., is sufficiently small. This result is qualitatively optimal in light of the result of Krieger, Nakamishi, and Schlag ("Center-stable manifold of the ground state in the energy space for the critical wave equation", 2015). The paper builds on the analysis of Krieger and Wong ("On type I blow-up formation for the critical NLW", 2014)"--
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