Maximal subextension and stability in m-capacity of maximal subextension of m-subharmonic functions with given boundary values
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Nguyen Van phu
Abstract
In this paper, we study maximal subextension of m-subharmonic functions with given boundary values. We also prove stability in m-capacity of maximal subextension of m-subharmonic functions with given boundary values.
(Communicated by Tomasz Natkaniec)
Acknowledgement
I wish to express my gratitude to anonymous referees for their careful reading and constructive comments that help to improve significantly my exposition.
The article was completed during the time the authors worked and conducted research at Vietnam Institute for Advance Study in Mathematics (VIASM). The author would like to thank VIASM for the hospitality and support.
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Articles in the same Issue
- Weak differences, weak BCK-algebras and applications to some partial orders on rings
- Weakly κ-compact topological spaces
- On sharp radius estimates for S*(β) and a product function
- Maximal subextension and stability in m-capacity of maximal subextension of m-subharmonic functions with given boundary values
- Asymptotic behavior of fractional super-linear differential equations
- New and improved oscillation criteria of third-order half-linear delay differential equations via canonical transform
- Global dynamics of the system of difference equations
- Results on oscillatory properties of third-order functional difference equations with semi-canonical operators
- A new approach to metrical fixed point theorems
- Generalized Baker’s result and stability of functional equations using fixed point results
- Characterizations of ℕ-compactness and realcompactness via ultrafilters in the absence of the axiom of choice
- K-theory of oriented flag manifolds
- On certain observations on split continuity and cauchy split continuity
- On the generalized eta- and theta-transformation formulas as the Hecke modular relation
- On some selective star Lindelöf-type properties
