Entry Martin:1989:GAM from tcs1985.bib
Last update: Thu Sep 27 02:46:57 MDT 2018
Top |
Symbols |
Numbers |
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{Martin:1989:GAM,
author = "Ursula Martin",
title = "A geometrical approach to multiset orderings",
journal = j-THEOR-COMP-SCI,
volume = "67",
number = "1",
pages = "37--54",
day = "5",
month = sep,
year = "1989",
CODEN = "TCSCDI",
ISSN = "0304-3975 (print), 1879-2294 (electronic)",
ISSN-L = "0304-3975",
bibdate = "Sat Nov 22 13:29:49 MST 1997",
bibsource = "Compendex database;
http://www.math.utah.edu/pub/tex/bib/tcs1985.bib",
acknowledgement = ack-nhfb,
affiliation = "Univ of London",
affiliationaddress = "London, Engl",
classification = "921; C4290 (Other computer theory)",
corpsource = "Dept. of Comput. Sci., R. Holloway and Bedford New
Coll., London Univ., Egham, UK",
fjournal = "Theoretical Computer Science",
journal-URL = "http://www.sciencedirect.com/science/journal/03043975/",
journalabr = "Theor Comput Sci",
keywords = "computational geometry; Dominance Ordering; dominance
ordering; geometrical approach; Mathematical
Techniques; multiset ordering; Multiset Orderings;
multiset orderings; multisets; set theory; Set Theory;
Tame Orderings",
pubcountry = "Netherlands",
treatment = "T Theoretical or Mathematical",
}
Related entries
- approach,
36(1)1,
38(2)249,
39(2)155,
40(1)57,
45(3)293,
46(1)13,
54(1)65,
55(1)87,
56(1)17,
57(1)97,
58(1)3,
66(1)27,
66(2)205,
68(3)277,
69(1)55
- C4290,
38(1)123,
39(1)47,
44(2)209,
48(2)283,
54(1)87,
58(1)183,
68(3)239
- dominance,
53(2)345
- geometrical,
51(1)27
- geometry,
53(2)345,
54(1)87,
65(2)213,
65(2)z,
68(1)71,
68(3)239
- mathematical,
36(2)145,
45(1)1,
57(0)3,
57(1)131,
57(1)147,
57(1)153,
58(0)3,
58(1)17,
58(1)103,
58(1)143,
58(1)183,
58(1)201,
58(1)209,
58(1)263,
58(1)325,
58(1)361,
58(1)379,
59(3)277,
59(3)297,
60(1)1,
60(3)297,
61(2)121,
61(2)175,
61(2)225,
61(2)289,
61(2)299,
61(2)307,
62(1)221,
62(3)235,
62(3)251,
63(1)43,
63(1)63,
63(2)223,
63(3)239,
63(3)253,
63(3)275,
63(3)295,
64(1)1,
64(1)15,
64(1)83,
64(1)107,
64(1)125,
64(2)135,
64(2)159,
65(0)123,
65(2)123,
65(2)131,
65(2)143,
65(2)149,
65(2)153,
65(2)189,
65(2)197,
65(2)213,
65(2)221,
65(2)243,
65(2)249,
65(2)265,
66(0)117,
66(2)137,
66(2)157,
66(2)181,
66(2)205,
67(1)5,
67(1)55,
67(1)111,
67(1)115
- ordering,
37(1)77,
40(2)323,
45(1)1,
45(3)293,
49(2)185,
58(1)3,
59(3)211,
60(3)255,
63(1)43,
67(2)283
- other,
38(1)123,
39(1)47,
39(2)337,
41(2)325,
44(2)209,
48(2)283,
49(2)171,
53(2)345,
54(1)87,
54(2)181,
56(1)3,
56(1)17,
56(1)59,
58(1)183,
63(3)253,
65(2)213,
67(1)55,
68(3)239,
69(1)1
- technique,
39(2)319,
40(1)67,
40(2)101,
45(1)87,
46(2)261,
48(1)75,
49(1)81,
49(2)171,
50(2)137,
50(3)323,
51(1)53,
52(3)193,
53(2)169,
53(2)281,
54(1)53,
54(1)87,
54(1)129,
54(2)315,
57(0)3,
57(1)97,
57(1)131,
57(1)147,
57(1)153,
58(1)103,
58(1)209,
59(1)157,
59(3)297,
61(2)299,
63(3)275,
63(3)295,
64(1)107,
64(2)135,
64(2)175,
65(1)1,
65(2)123,
65(2)131,
65(2)149,
65(2)153,
65(2)189,
65(2)197,
65(2)213,
65(2)243,
65(2)249,
66(0)117,
66(1)45,
66(2)137,
67(1)5,
67(1)87,
68(3)267,
69(1)1