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Smooth commuting projections in rough settings: Weakly Lipschitz domains and
mixed boundary conditions
Martin Licht
SEW Postdoctoral Fellow, UCSD Department of Mathematics
Abstract:
The numerical analysis of finite element methods in computational electromagnetism can be developed elegantly and comprehensively if commuting projection operators between de Rham complexes are available. Hence the construction of such commuting projection operators is central but has been elusive in several practical relevant settings of low regularity. In this talk we describe how to close this gap: we construct smoothed projections over weakly Lipschitz domains and extend the theory to mixed boundary conditions.
Tuesday, October 24, 2017
11:00AM AP&M 2402
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Randolph E. Bank
Philip E. Gill
Michael Holst
Administrative Contact:
[ Click to Send Email ]
Martin Licht
SEW Postdoctoral Fellow, UCSD Department of Mathematics
Abstract:
The numerical analysis of finite element methods in computational electromagnetism can be developed elegantly and comprehensively if commuting projection operators between de Rham complexes are available. Hence the construction of such commuting projection operators is central but has been elusive in several practical relevant settings of low regularity. In this talk we describe how to close this gap: we construct smoothed projections over weakly Lipschitz domains and extend the theory to mixed boundary conditions.
Tuesday, October 24, 2017
11:00AM AP&M 2402