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Costabel, M · 2010 · DOI 10.1007/s00209-009-0517-8

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Gradient estimates for $p\left(\cdot\right)$-harmonic differential forms

math.AP · 2026-05-21 · unverdicted · novelty 7.0

Gradient estimates and Hölder continuity are proved for p(·)-harmonic differential forms with variable exponents satisfying log-Hölder or Hölder continuity assumptions.

A Penalty-Free Asymmetric Nitsche's Method for Edge Elements

math.NA · 2026-05-19 · unverdicted · novelty 6.0

Proves an inf-sup stability estimate for a penalty-free asymmetric Nitsche method with Nédélec edge elements under an isolated patch condition on tetrahedral meshes.

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Gradient estimates for $p\left(\cdot\right)$-harmonic differential forms math.AP · 2026-05-21 · unverdicted · none · ref 44
Gradient estimates and Hölder continuity are proved for p(·)-harmonic differential forms with variable exponents satisfying log-Hölder or Hölder continuity assumptions.
A Penalty-Free Asymmetric Nitsche's Method for Edge Elements math.NA · 2026-05-19 · unverdicted · none · ref 258
Proves an inf-sup stability estimate for a penalty-free asymmetric Nitsche method with Nédélec edge elements under an isolated patch condition on tetrahedral meshes.

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