Backward shifts on function algebras
スポンサーリンク
概要
- 論文の詳細を見る
J.R. Holub (1988) 1101 introduced the concept of backward shift on Banach spaces. We show that an infinite-dimensional function algebra does not admit a backward shift. Moreover, we define a backward quasi-shift as a weak type of a backward shift, and show that a function algebra A does not admit it, under the assumption that the Choquet boundary of A has at most finitely many isolated points.
- ACADEMIC PRESS INC ELSEVIER SCIENCEの論文
ACADEMIC PRESS INC ELSEVIER SCIENCE | 論文
- Anti-ice nucleation activity in xylem extracts from trees that contain deep supercooling xylem parenchyma cells
- Glucose-sulfate conjugates as a new phase II metabolite formed by aquatic crustaceans
- Changes in S1P(1) and SIP(2) expression during embryonal development and primitive endoderm differentiation of F9 cells
- Peroxisome proliferator-activated receptor α-independent peroxisome proliferation
- Molecular characteristics of IgA and IgM Fc binding to the Fc alpha/mu R