Access the full text.
Sign up today, get DeepDyve free for 14 days.
S. Mardešić (1982)
Shape Theory: The Inverse System Approach
(1966)
Dimension of increments of proximity spaces and of topological spaces
(1980)
Baladze, On some combinatorial properties of remainders of extensions of topological spaces and on factorization of uniform mappings. (Russian) Soobshch
K. Hart (2003)
Uniform Spaces, I
(2000)
A characterization of precompact shape and (co)homology group of remainder
J. Keesling (1978)
Decompositions of the Stone-Čech compactification which are shape equivalencesPacific Journal of Mathematics, 75
A. Kandil (1978)
ON THE DIMENSION OF θ-PROXIMITY SPACESRussian Mathematical Surveys, 33
A. Calder (1972)
The cohomotopy groups of stone-čech increments, 75
H. Freudenthal (1942)
Neuaufbau Der EndentheorieAnnals of Mathematics, 43
J. Aarts (1968)
Completeness degree (A generalization of dimension)Fundamenta Mathematicae, 63
(1966)
On the dimension of remainders in bicompact extensions of proximity and topological spaces. (Russian) Mat
A. Chigogidze (1981)
On the dimension of increments of Tychonoff spacesFundamenta Mathematicae, 111
S. Salbany (1974)
On compact* spaces and compactifications, 45
J. Keesling, R. Sher (1978)
Shape properties of the Stone-Čech compactificationGeneral Topology and Its Applications, 9
S. Nowak (1981)
Algebraic theory of fundamental dimension
M. Charalambous (1976)
Spaces with increment of dimension nFundamenta Mathematicae, 93
(1956)
Bokshtein, Homology invariants of topological spaces
Kiiti Morita (1952)
On bicompactifications of semibicompact spaces, 4
(1962)
Skljarenko, Some questions in the theory of bicompactifications
(2002)
On the homology and cohomology groups of increments
B. Ball (1976)
Geometric topology and shape theory: A survey of problems and resultsBulletin of the American Mathematical Society, 82
H. Freudenthal (1951)
Kompaktisierungen Und Bikompaktisierungen, 54
(1977)
Inductive dimensions for completely regular spaces
V. Baladze (2004)
Characterization of precompact shape and homology properties of remaindersTopology and its Applications, 142
Yu. Smirnov (1967)
PROXIMITY AND CONSTRUCTION OF COMPACTIFICATIONS WITH GIVEN PROPERTIES
(1966)
Dimension and deficiency in general topology
J. Knowles (1977)
THE STONE—CECH COMPACTIFICATIONBulletin of The London Mathematical Society, 9
(1966)
Dimension of increments of proximity spaces and of topological spaces . ( Russian ) Dokl
P. Alexandroff (1947)
On the dimension of normal spacesProceedings of the Royal Society of London. Series A. Mathematical and Physical Sciences, 189
Border homology and cohomology groups of pairs of uniform spaces are defined and studied. These groups give an intrinsic characterization of Čech type homology and cohomology groups of the remainder of a uniform space.
Georgian Mathematical Journal – de Gruyter
Published: Dec 1, 2004
Keywords: Čech homology; Čech cohomology; uniform space; compactification; completion; remainder
Read and print from thousands of top scholarly journals.
Already have an account? Log in
Bookmark this article. You can see your Bookmarks on your DeepDyve Library.
To save an article, log in first, or sign up for a DeepDyve account if you don’t already have one.
Copy and paste the desired citation format or use the link below to download a file formatted for EndNote
Access the full text.
Sign up today, get DeepDyve free for 14 days.
All DeepDyve websites use cookies to improve your online experience. They were placed on your computer when you launched this website. You can change your cookie settings through your browser.