About: Burman Erik

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Attributs	Valeurs
type	Person
sameAs	Burman Erik
name	Burman Erik Burman E. Burman, Erik
personal mailbox	E.N.Burman@sussex.ac.uk e.n.burman@sussex.ac.uk erik.burman@epfl.ch e.burman@ucl.ac.uk
familyName	Burman
Given name	E. Erik
is relates of	http://hub.abes.fr/oup/periodical/imanum/2007/volume_27/issue_1/101093imanumdrl011/authorship/3 http://hub.abes.fr/edp/periodical/m2an/2014/volume_48/issue_3/m2an130123/authorship/1 http://hub.abes.fr/edp/periodical/m2an/2007/volume_41/issue_1/m2an0587/authorship/1 http://hub.abes.fr/edp/periodical/m2an/2012/volume_46/issue_4/m2an110047/authorship/1 http://hub.abes.fr/oup/periodical/imanum/2010/volume_30/issue_3/101093imanumdrn081/authorship/1 http://hub.abes.fr/oup/periodical/imanum/2009/volume_29/issue_2/101093imanumdrn001/authorship/1 http://hub.abes.fr/edp/periodical/m2an/2018/volume_52/issue_5/m2an170149/authorship/1 http://hub.abes.fr/edp/periodical/m2an/2019/volume_53/issue_1/m2an170134/authorship/1
is Author of	A continuous finite element method with face penalty to approximate Friedrichs' systems Weighted error estimates of the continuous interior penalty method for singularly perturbed problems A priori and a posteriori analysis of non-conforming finite elements with face penalty for advection-diffusion equations Implicit-explicit Runge-Kutta schemes and finite elements with symmetric stabilization for advection-diffusion equations Fictitious domain methods using cut elements: III. A stabilized Nitsche method for Stokes’ problem Interior-penalty-stabilized Lagrange multiplier methods for the finite-element solution of elliptic interface problems Fully discrete finite element data assimilation method for the heat equation Augmented Lagrangian finite element methods for contact problems

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