Entry Aiken:1990:TCB from tcs1990.bib
Last update: Wed Sep 26 02:11:46 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{Aiken:1990:TCB,
author = "A. Aiken",
title = "A theory of compaction-based parallelization",
journal = j-THEOR-COMP-SCI,
volume = "73",
number = "2",
pages = "121--154",
day = "22",
month = jun,
year = "1990",
CODEN = "TCSCDI",
ISSN = "0304-3975 (print), 1879-2294 (electronic)",
ISSN-L = "0304-3975",
bibdate = "Sat Nov 22 13:24:22 MST 1997",
bibsource = "http://www.math.utah.edu/pub/tex/bib/tcs1990.bib",
acknowledgement = ack-nhfb,
classification = "C4240 (Programming and algorithm theory); C6110
(Systems analysis and programming)",
corpsource = "IBM Almaden Res. Center, San Jose, CA, USA",
fjournal = "Theoretical Computer Science",
journal-URL = "http://www.sciencedirect.com/science/journal/03043975/",
keywords = "compaction-based parallelization; doacross; formal
system; infinite sequences; limits; measure;
multiprocessor machines; parallel algorithms; parallel
programming; program improvement; software pipelining;
transformational system; transformations; vector
machines; vectorization; VLIW machines",
pubcountry = "Netherlands",
treatment = "T Theoretical or Mathematical",
}
Related entries
- analysis,
71(1)155,
71(2)193,
71(3)381,
72(2)147,
74(3)273,
76(1)143,
77(3)321,
79(1)37,
83(2)219,
85(1)75,
85(2)213,
85(2)231,
85(2)333,
86(1)35,
86(2)343,
88(1)171,
90(1)17,
90(1)37,
90(1)95,
92(1)107,
93(2)201,
94(2)261,
98(2)163,
98(2)263,
99(2)213,
102(1)135,
106(2)243,
112(1)53,
113(1)3,
115(1)63,
117(1)99,
117(1)187,
118(2)231,
119(1)23,
120(1)157,
121(1)59,
121(1)113,
121(1)145,
122(1)201,
123(1)89,
124(1)127,
125(1)61,
125(1)131,
128(1)211,
130(1)175,
133(1)65,
133(2)307
- C6110,
71(1)155,
71(2)193,
76(1)143,
85(2)213,
85(2)231,
90(1)17,
90(1)37,
102(1)135,
122(1)201,
124(1)127,
125(1)131
- improvement,
99(1)157
- infinite,
74(1)71,
74(2)121,
74(2)227,
75(1)157,
76(2)309,
82(2)177,
83(2)301,
84(2)165,
86(1)3,
86(2)277,
88(1)83,
88(2)365,
93(2)227,
93(2)327,
94(2)161,
96(1)157,
96(1)z,
99(1)121,
100(1)105,
103(1)143,
103(2)165,
103(2)191,
104(1)3,
107(2)305,
108(1)45,
112(1)145,
112(2)277,
112(2)413,
113(1)35,
115(1)63,
116(1)3,
123(1)3,
123(1)55,
125(2)167,
126(1)77,
126(2)183,
129(1)1,
129(2)385,
132(1)37,
132(1)337,
134(1)131,
134(2)329
- limit,
87(1)1,
94(2)261,
100(2)325,
110(1)53,
111(1)211,
127(2)229
- measure,
73(3)265,
79(2)323,
81(1)127,
82(1)157,
85(2)305,
112(2)277,
122(1)97,
125(1)17,
125(1)61,
125(1)111,
127(1)123,
128(1)179
- multiprocessor,
73(1)61,
81(2)237,
96(1)217,
102(2)329,
102(2)355,
104(2)285,
120(2)261,
125(1)61,
125(1)91,
128(1)3,
128(1)31,
128(1)75,
128(1)179,
128(1)211,
128(1)241,
130(1)17,
130(1)49,
130(1)175
- parallelization,
76(1)93,
76(2)331
- sequence,
71(3)381,
71(3)419,
73(1)91,
74(1)71,
74(3)341,
75(3)223,
76(1)115,
76(2)309,
79(2)275,
80(2)263,
83(1)131,
83(2)205,
83(2)219,
87(2)251,
90(2)391,
92(1)3,
93(2)279,
94(2)161,
94(2)215,
94(2)373,
95(2)231,
98(2)163,
100(1)105,
102(2)253,
103(1)137,
103(2)191,
107(1)31,
108(2)385,
113(2)349,
114(1)63,
115(1)63,
117(1)289,
119(2)345,
119(2)363,
122(1)137,
123(1)3,
123(1)55,
123(1)61,
123(2)239,
123(2)351,
126(2)183,
127(2)351,
129(2)263,
129(2)369,
129(2)385,
132(1)1,
132(1)37,
132(1)337
- software,
70(1)159,
73(2)213,
77(1)27,
77(1)97,
77(1)z,
79(2)323,
80(1)1,
83(1)131,
88(1)15,
89(1)179,
90(1)1,
90(1)209,
91(2)239,
94(1)1,
94(2)237,
94(2)311,
96(1)249,
96(2)285,
97(1)1,
100(2)365,
102(1)165,
103(2)191,
104(1)53,
104(1)89,
104(1)129,
106(1)3,
113(1)93,
113(2)259,
113(2)293,
114(1)3,
118(2)263,
119(1)173,
119(1)215,
122(1)137,
124(1)149,
125(1)131,
128(1)99,
128(1)127,
128(1)159,
128(1)179,
131(1)219,
133(2)307,
133(2)341
- transformation,
70(1)35,
71(1)47,
73(2)155,
73(2)231,
75(1)85,
75(1)139,
75(1)z,
76(1)115,
76(2)331,
77(1)97,
81(1)1,
81(2)295,
86(1)107,
86(1)z,
89(1)179,
90(1)37,
93(1)43,
94(1)141,
104(1)109,
105(1)57,
106(1)135,
108(1)151,
108(1)z,
109(1)3,
109(1)145,
109(1)181,
109(1)257,
109(1)z,
110(2)377,
115(1)107,
115(2)291,
116(2)373,
120(2)169,
122(1)119,
123(1)139,
124(1)180,
124(2)221,
127(2)199,
128(1)99,
129(1)123,
136(1)57
- transformational,
71(3)413,
90(1)37,
93(1)43
- vector,
74(1)3,
78(2)357,
80(1)105,
88(1)127,
95(1)159,
98(2)199,
123(1)95,
125(2)229,
127(1)187,
134(1)131