Mitrea, Marius.
Overview
Works: | 1 works in 3 publications in 1 languages |
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Titles
Geometric Harmonic Analysis I = A Sharp Divergence Theorem with Nontangential Pointwise Traces /
by:
Mitrea, Irina.; SpringerLink (Online service); Mitrea, Dorina.; Mitrea, Marius.
(Language materials, printed)
, [http://id.loc.gov/vocabulary/relators/aut]
Hardy Spaces on Ahlfors-Regular Quasi Metric Spaces = A Sharp Theory /
by:
SpringerLink (Online service); Mitrea, Marius.; Alvarado, Ryan.
(Language materials, printed)
, [http://id.loc.gov/vocabulary/relators/aut]
Geometric harmonic analysis.. II,. Function spaces measuring size and smoothness on rough sets
by:
Mitrea, Marius.; Mitrea, Dorina.; Mitrea, Irina.; SpringerLink (Online service)
(Language materials, printed)
Singular Integral Operators, Quantitative Flatness, and Boundary Problems
by:
Martell, José María.; SpringerLink (Online service); Mitrea, Irina.; Marín, Juan José.; Mitrea, Marius.; Mitrea, Dorina.
(Language materials, printed)
, [http://id.loc.gov/vocabulary/relators/aut]
Multi-layer potentials and boundary problems = for higher-order elliptic systems in Lipschitz domains /
by:
Mitrea, Marius.; SpringerLink (Online service); Mitrea, Irina.
(Language materials, printed)
Geometric harmonic analysis V = Fredholm theory and finer estimates for integral operators, with applications to boundary problems /
by:
Mitrea, Dorina.; Mitrea, Marius.; SpringerLink (Online service); Mitrea, Irina.
(Language materials, printed)
Subjects
Differential Equations.
Fourier Analysis.
Measure theory.
Geometric measure theory.
Lipschitz spaces.
Harmonic analysis.
Measure and Integration.
Abstract Harmonic Analysis.
Differential equations, Elliptic.
Integral equations.
Partial Differential Equations.
Functional Analysis.
Boundary layer.
Integral Equations.
Partial differential equations.
Potential Theory.
Differential equations.
Divergence theorem.
Mathematics.
Boundary value problems.
Potential theory (Mathematics).
Fourier analysis.
Functional analysis.
Functions of real variables.
Real Functions.
Integral Transforms and Operational Calculus.