Surfaces carrying sufficiently many Dirichlet finite harmonic functions that are automatically bounded
スポンサーリンク
概要
- 論文の詳細を見る
It is shown that there exists a Riemann surface on which every Dirichlet finite harmonic function is automatically bounded and yet the linear dimension of the linear space of Dirichlet finite harmonic functions on it is infinite.
- The Mathematical Society of Japanの論文
- 2012-01-01
著者
-
Nakai Mitsuru
Department Of Chemistry Faculty Of Science Kyushu University
-
NAKAI Mitsuru
Department of Mathematics, Nagoya Institute of Technology
関連論文
- Extremal functions for capacities
- Siliceous deposits formed from geothermal water in Kyushu, Japan : II. Distribution and state of aluminum along the growth direction of the deposits
- Note on Hp on Riemann surfaces
- Evans potentials and the Riesz decomposition
- Existence of Dirichlet infinite harmonic measures on the unit disc
- Surfaces carrying sufficiently many Dirichlet finite harmonic functions that are automatically bounded