The Aubin--Nitsche Trick for Semilinear Problems
classification
🧮 math.NA
cs.NA
keywords
aubin--nitscheequationsproblemstrickdifferentiallinearpartialapplicable
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The Aubin--Nitsche trick is a common tool to show $L^2$-error estimates for discretizations of $H^1$-elliptic linear partial differential equations arising for example as Euler--Lagrange equations of a quadratic energy functional. The technique itself is linear: for quasilinear problems it is not applicable. We generalize the Aubin--Nitsche trick to a class of minimization problems closely related to semi-linear partial differential equations.
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