Entry Andrews:2011:CTR from lnm2010.bib
Last update: Sat Oct 14 02:54:59 MDT 2017
Top |
Symbols |
Math |
A |
B |
C |
D |
E |
F |
G |
H |
I |
J |
K |
L |
M |
N |
O |
P |
Q |
R |
S |
T |
U |
V |
W |
X |
Y |
Z
BibTeX entry
@Article{Andrews:2011:CTR,
author = "Ben Andrews and Christopher Hopper",
title = "The Compactness Theorem for {Riemannian} Manifolds",
journal = j-LECT-NOTES-MATH,
volume = "2011",
pages = "145--159",
year = "2011",
CODEN = "LNMAA2",
DOI = "https://doi.org/10.1007/978-3-642-16286-2_9",
ISBN = "3-642-16285-1 (print), 3-642-16286-X (e-book)",
ISBN-13 = "978-3-642-16285-5 (print), 978-3-642-16286-2
(e-book)",
ISSN = "0075-8434 (print), 1617-9692 (electronic)",
ISSN-L = "0075-8434",
bibdate = "Fri May 9 19:07:00 MDT 2014",
bibsource = "http://www.math.utah.edu/pub/tex/bib/lnm2010.bib",
URL = "http://link.springer.com/chapter/10.1007/978-3-642-16286-2_9/",
acknowledgement = ack-nhfb,
book-DOI = "https://doi.org/10.1007/978-3-642-16286-2",
book-URL = "http://www.springerlink.com/content/978-3-642-16286-2",
fjournal = "Lecture Notes in Mathematics",
journal-URL = "http://link.springer.com/bookseries/304",
}
Related entries
- Andrews, Ben,
2011(0)1,
2011(0)11,
2011(0)49,
2011(0)63,
2011(0)83,
2011(0)97,
2011(0)115,
2011(0)137,
2011(0)161,
2011(0)173,
2011(0)193,
2011(0)223,
2011(0)235,
2011(0)259,
2011(0)287
- Compactness,
2126(0)199
- Hopper, Christopher,
2011(0)1,
2011(0)11,
2011(0)49,
2011(0)63,
2011(0)83,
2011(0)97,
2011(0)115,
2011(0)137,
2011(0)161,
2011(0)173,
2011(0)193,
2011(0)223,
2011(0)235,
2011(0)259,
2011(0)287
- manifold,
2037(0)25,
2038(0)257,
2039(0)259,
2055(0)9,
2086(0)239,
2086(0)299,
2095(0)1,
2095(0)65,
2095(0)151,
2108(0)149,
2110(0)1,
2110(0)45,
2110(0)57,
2114(0)25,
2114(0)81,
2117(0)131
- Riemannian,
2038(0)231,
2110(0)1
- theorem,
849(0)87,
1993(0)71,
1999(0)7,
2005(0)147,
2006(0)309,
2008(0)45,
2018(0)29,
2030(0)131,
2034(0)115,
2034(0)173,
2034(0)371,
2038(0)201,
2050(0)317,
2050(0)335,
2066(0)63,
2067(0)35,
2067(0)45,
2068(0)239,
2068(0)337,
2068(0)385,
2078(0)537,
2079(0)41,
2079(0)53,
2079(0)151,
2092(0)839,
2094(0)159,
2103(0)59,
2106(0)11,
2116(0)147,
2116(0)183,
2116(0)199,
2122(0)61,
2123(0)61,
2123(0)473,
2127(0)63,
2159(0)199,
2162(0)43,
2166(0)1