Continuity of solutions to complex Hessian equations via the Dinew–Kołodziej estimate

Författare

  • Per Åhag Umeå University, Department of Mathematics and Mathematical Statistics
  • Rafał Czyż Jagiellonian University, Faculty of Mathematics and Computer Science

DOI:

https://doi.org/10.54330/afm.160119

Nyckelord:

Complex Hessian equation, Dinew–Kołodziej estimate, m-subharmonic function, regularity

Abstract

This study extends the celebrated volume-capacity estimates of Dinew and Kołodziej, providing a foundation for examining the regularity of solutions to boundary value problems for complex Hessian equations. By integrating the techniques established by Dinew and Kołodziej and incorporating recent advances by Charabati and Zeriahi, we demonstrate the continuity of the solutions.

 

Nedladdningar

Publicerad

2025-03-28

Nummer

Vol 50 Nr 1 (2025)

Sektion

Articles

Licens

Copyright (c) 2025 Annales Fennici Mathematici

Creative Commons-licens

Detta verk är licensierat under en Creative Commons Erkännande-IckeKommersiell 4.0 Internationell-licens.

Referera så här

Åhag, P., & Czyż, R. (2025). Continuity of solutions to complex Hessian equations via the Dinew–Kołodziej estimate. Annales Fennici Mathematici, 50(1), 201–214. https://doi.org/10.54330/afm.160119