Pseudo-boundaries and pseudo-interiors for topological convexities

M. Van de Vel. Pseudo-boundaries and pseudo-interiors for topological convexities. Warszawa: Instytut Matematyczny Polskiej Akademi Nauk, 1983. <http://eudml.org/doc/268634>.

@book{M1983,
abstract = {CONTENTS0. Introduction......... .............................................................51. Topological convexity structures.......................................62. Half-spaces and related results......................................123. Pseudo-boundaries........................................................254. The Krein-Milman theorem.............................................335. Pseudo-interiority...........................................................406. The existence of pseudo-interior points.........................507. Identification of Z-set and Hilbert cubes.........................62References........................................................................70Subject index.....................................................................72ERRATA Page, line: 33₁₃ For: C Read: O Page, line: 69⁸ For: $H_i(X)$ Read: H₁(X) Page, line: 72₄ For: i(C) Read: ∂(C) Page, line: 72₄ For: $i_X(C)$ Read: $∂_X(C)$ Page, line: 72₄ For: i(X,C) Read: ∂(X,C) Page, line: 72₄ For: 5.1 Read: 3.1},
author = {M. Van de Vel},
keywords = {convexity structure; convex hull operator; Hahn-Banach theorem; Krein- Milman theorem},
language = {eng},
location = {Warszawa},
publisher = {Instytut Matematyczny Polskiej Akademi Nauk},
title = {Pseudo-boundaries and pseudo-interiors for topological convexities},
url = {http://eudml.org/doc/268634},
year = {1983},
}

TY - BOOK
AU - M. Van de Vel
TI - Pseudo-boundaries and pseudo-interiors for topological convexities
PY - 1983
CY - Warszawa
PB - Instytut Matematyczny Polskiej Akademi Nauk
AB - CONTENTS0. Introduction......... .............................................................51. Topological convexity structures.......................................62. Half-spaces and related results......................................123. Pseudo-boundaries........................................................254. The Krein-Milman theorem.............................................335. Pseudo-interiority...........................................................406. The existence of pseudo-interior points.........................507. Identification of Z-set and Hilbert cubes.........................62References........................................................................70Subject index.....................................................................72ERRATA Page, line: 33₁₃ For: C Read: O Page, line: 69⁸ For: $H_i(X)$ Read: H₁(X) Page, line: 72₄ For: i(C) Read: ∂(C) Page, line: 72₄ For: $i_X(C)$ Read: $∂_X(C)$ Page, line: 72₄ For: i(X,C) Read: ∂(X,C) Page, line: 72₄ For: 5.1 Read: 3.1
LA - eng
KW - convexity structure; convex hull operator; Hahn-Banach theorem; Krein- Milman theorem
UR - http://eudml.org/doc/268634
ER -