Interior continuity of two-dimensional weakly stationary-harmonic multiple-valued functions

Chun Chi Lin*

*Corresponding author for this work

Research output: Contribution to journalArticlepeer-review

2 Citations (Scopus)


In his big regularity paper, Almgren has proven the regularity theorem for mass-minimizing integral currents. One key step in his paper is to derive the regularity of Dirichlet-minimizing QQ (ℝn)-valued functions in the Sobolev space γ2(Ω, QQ (ℝn)), where the domain Ω is open in ℝm . In this article, we introduce the class of weakly stationary-harmonic Q Q (ℝn)-valued functions. These functions are the critical points of Dirichlet's integral under smooth domain-variations and range-variations. We prove that if Ω is a two-dimensional domain in ℝ2 and f∈γ2 (Ω,QQ(ℝ n)) is weakly stationary-harmonic, then f is continuous in the interior of the domain Ω.

Original languageEnglish
Pages (from-to)1547-1582
Number of pages36
JournalJournal of Geometric Analysis
Issue number3
Publication statusPublished - 2014 Jul


  • Almgren's big regularity paper
  • Interior continuity
  • Multiple-valued functions
  • Weakly stationary-harmonic

ASJC Scopus subject areas

  • Geometry and Topology


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