Multilevel Picard approximations overcome the curse of dimensionality when approximating semilinear heat equations with gradient-dependent nonlinearities in Lp-sense
Abstract
We prove that multilevel Picard approximations are capable of approximating solutions of semilinear heat equations in Lp-sense, p∈ [2,∞), in the case of gradient-dependent, Lipschitz-continuous nonlinearities, in the sense that the computational effort of the multilevel Picard approximations grow at most polynomially in both the dimension d and the reciprocal 1/ε of the prescribed accuracy ε.
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