Entry Megson:1988:SNI from compj1980.bib
Last update: Sat Jan 6 02:03:49 MST 2018
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{Megson:1988:SNI,
author = "G. M. Megson and D. J. Evans",
title = "Short notes: Improved Matrix Product Computation using
Double-Pipeline Systolic Arrays",
journal = j-COMP-J,
volume = "31",
number = "6",
pages = "567--569",
month = dec,
year = "1988",
CODEN = "CMPJA6",
DOI = "https://doi.org/10.1093/comjnl/31.6.567",
ISSN = "0010-4620 (print), 1460-2067 (electronic)",
ISSN-L = "0010-4620",
MRclass = "68Q35",
MRnumber = "89j:68077",
bibdate = "Tue Dec 4 14:48:25 MST 2012",
bibsource = "Compendex database;
http://comjnl.oxfordjournals.org/content/31/6.toc;
http://www.math.utah.edu/pub/tex/bib/compj1980.bib;
http://www3.oup.co.uk/computer_journal/hdb/Volume_31/Issue_06/",
URL = "http://comjnl.oxfordjournals.org/content/31/6/567.full.pdf+html;
http://www3.oup.co.uk/computer_journal/hdb/Volume_31/Issue_06/tiff/567.tif;
http://www3.oup.co.uk/computer_journal/hdb/Volume_31/Issue_06/tiff/568.tif;
http://www3.oup.co.uk/computer_journal/hdb/Volume_31/Issue_06/tiff/569.tif",
acknowledgement = ack-nhfb,
affiliation = "Loughborough Univ of Technology",
affiliationaddress = "Loughborough, Engl",
classcodes = "C4240 (Programming and algorithm theory); C4140
(Linear algebra); C5440 (Multiprocessor systems and
techniques)",
classification = "722; 723; 921; C4140 (Linear algebra); C4240
(Programming and algorithm theory); C5440
(Multiprocessor systems and techniques)",
fjournal = "The Computer Journal",
journal-URL = "http://comjnl.oxfordjournals.org/",
keywords = "algebra; array; Computational complexity;
computational complexity; double-; Double-pipeline
systolic arrays; Double-Pipeline Systolic Arrays; hex;
Hex array; input-output connections; Input-output
connections, Computer Systems, Digital; Mathematical
Techniques--Matrix Algebra; mathematics computing;
matrix; Matrix Multiplication; Matrix product
computation; matrix product computation; Matrix
Products; Parallel Processing; pipeline processing;
pipeline systolic arrays; Planar layers; planar layers;
Retimed hexagonal array; retimed hexagonal array",
thesaurus = "Computational complexity; Mathematics computing;
Matrix algebra; Pipeline processing",
treatment = "T Theoretical or Mathematical",
}
Related entries
- algebra,
23(1)73,
25(1)56,
25(2)231,
25(3)397,
25(4)493,
26(1)6,
26(2)184,
27(2)159,
28(2)142,
28(3)340,
29(3)261,
29(5)416,
30(3)268,
30(6)498,
31(1)34,
31(3)229,
31(4)313,
31(6)564,
32(2)122
- array,
23(1)73,
24(3)263,
25(1)140,
25(2)231,
25(3)327,
28(2)148,
30(4)343,
30(5)393,
30(5)404,
30(5)413,
30(5)420,
30(6)565,
31(1)83,
31(3)279,
32(6)571
- C4240,
31(6)517,
31(6)545,
31(6)553,
31(6)557,
31(6)561,
32(2)187,
32(5)437,
32(5)470,
32(5)474,
32(6)567,
32(6)571
- C5440,
32(3)267,
32(4)362
- complexity,
25(1)63,
25(3)379,
26(3)224,
26(4)293,
26(4)354,
27(1)72,
27(2)135,
27(4)315,
27(4)340,
28(1)5,
28(1)78,
28(5)487,
28(5)496,
29(2)103,
29(2)161,
29(2)176,
29(2)182,
29(4)300,
29(4)322,
29(4)330,
29(5)451,
30(1)43,
30(2)176,
30(3)201,
30(3)223,
30(3)233,
30(3)258,
30(3)282,
30(4)308,
30(4)376,
30(5)433,
31(1)56,
31(1)71,
31(1)83,
31(3)283,
31(4)289,
31(6)490,
31(6)545,
31(6)553,
31(6)561,
32(4)362,
32(5)474
- computation,
23(1)34,
25(4)471,
26(4)293,
27(3)201,
28(1)9,
28(4)375,
29(2)103,
29(6)553,
30(1)87,
30(5)433,
32(2)122,
32(4)297
- computational,
23(2)123,
23(2)187,
26(2)164,
26(3)224,
26(4)293,
26(4)354,
27(1)72,
27(2)135,
27(4)315,
27(4)375,
28(3)335,
28(4)433,
28(5)496,
29(1)76,
29(2)103,
29(2)176,
29(4)322,
29(4)330,
29(4)373,
29(5)467,
30(1)43,
30(1)87,
30(2)176,
30(3)201,
30(3)223,
30(3)233,
30(3)282,
30(4)376,
30(5)433,
31(1)56,
31(1)71,
31(1)83,
31(3)283,
31(4)289,
31(6)490,
31(6)545,
31(6)553,
31(6)561,
32(1)93,
32(4)377,
32(5)453,
32(5)474
- computing,
23(1)85,
23(4)324,
23(4)347,
23(4)353,
24(1)52,
24(1)96,
24(2)162,
24(2)167,
25(1)22,
25(2)188,
25(2)207,
25(2)287,
25(3)338,
25(3)397,
26(2)187,
26(2)187,
26(3)224,
26(4)296,
27(1)8,
27(2)97,
27(3)193,
28(2)117,
28(3)243,
28(5)498,
29(2)161,
29(3)229,
29(4)348,
29(4)373,
30(1)20,
30(2)110,
30(3)193,
30(3)258,
30(3)268,
30(3)277,
30(3)282,
30(4)298,
30(5)413,
30(5)420,
30(5)437,
31(1)12,
31(2)175,
31(2)182,
31(3)201,
31(4)364,
32(3)281,
32(4)362,
32(4)370,
32(5)385,
32(5)437,
32(5)453
- connection,
30(3)258,
31(2)141
- Evans, D. J.,
23(1)66,
25(1)56,
25(4)493,
26(1)6,
26(3)193,
31(1)83
- improved,
25(2)199,
27(2)121,
28(4)417,
31(6)490,
32(2)142
- input-output,
23(1)34
- linear,
23(1)78,
24(2)156,
25(1)56,
25(3)347,
27(4)373,
28(1)73,
28(1)78,
28(2)142,
28(3)319,
28(4)412,
30(2)176,
30(4)372,
31(3)279,
32(3)228,
32(4)362,
32(6)571
- mathematical,
24(2)177,
24(2)180,
24(2)184,
25(1)7,
25(1)56,
25(4)478,
26(1)6,
26(2)97,
26(2)106,
26(3)193,
27(2)165,
27(4)368-1,
28(1)5,
28(1)78,
28(1)89,
28(2)142,
28(2)179,
28(4)414,
28(4)417,
28(4)426,
28(5)498,
28(5)524,
28(5)530,
28(5)538,
29(1)36,
29(1)52,
29(2)171,
29(2)176,
29(2)182,
29(4)378,
29(5)416,
29(6)553,
30(1)16,
30(1)20,
30(1)70,
30(2)128,
30(2)189,
30(3)258,
30(3)268,
30(3)282,
30(4)298,
30(5)458,
30(6)498,
30(6)569,
31(1)61,
31(1)71,
31(1)76,
31(2)155,
31(3)229,
31(3)243,
31(3)283,
31(4)364,
31(6)490,
31(6)545,
31(6)557,
31(6)564,
32(1)45,
32(1)68,
32(1)76,
32(1)86,
32(1)93,
32(2)175,
32(4)351,
32(4)374,
32(4)377
- mathematics,
23(2)161,
23(3)248,
23(3)256,
23(4)332,
25(1)158,
25(2)235,
25(2)239,
25(2)257,
26(2)97,
26(2)106,
26(2)188,
26(3)193,
26(3)205,
26(3)224,
27(2)178,
27(2)184,
27(3)218,
27(3)225,
27(4)368-1,
28(1)73,
28(2)105,
28(3)313,
28(4)417,
28(4)426,
28(4)433,
28(4)439,
28(5)538,
29(1)36,
29(1)52,
29(1)76,
29(2)171,
29(2)176,
29(6)564,
30(3)268,
30(3)277,
30(3)282,
30(4)355,
30(5)433,
30(6)569,
31(1)61,
31(1)65,
31(3)269,
31(4)330,
31(4)353,
31(4)364,
31(6)557,
31(6)564,
32(1)68,
32(1)76,
32(3)281,
32(4)374,
32(5)470,
32(5)474,
32(6)571
- matrix,
24(2)177,
25(1)44,
25(3)397,
25(4)493,
26(1)6,
26(2)184,
28(3)340,
30(1)20,
30(3)268,
31(2)147
- Megson, G. M.,
31(1)83
- multiplication,
25(4)471
- multiprocessor,
24(4)353,
27(3)254,
28(2)142,
29(1)1,
29(5)390,
30(2)119,
30(3)214,
31(3)201,
32(3)267,
32(4)362
- note,
24(3)278,
25(1)158,
25(1)159,
25(3)397,
26(1)93,
26(2)187,
26(2)187,
26(2)188-1,
26(3)205,
26(3)282,
27(1)83,
27(1)84,
27(1)86,
27(1)87,
27(2)179,
27(3)283-1,
27(3)283-3,
27(3)284,
27(3)284-1,
27(4)373,
27(4)375,
27(4)376,
28(2)111,
28(3)343,
29(2)189-1,
29(4)378,
29(4)380-1,
29(5)477,
29(6)572,
29(6)573,
30(2)189,
30(3)276-1,
30(3)276-2,
30(3)282-1,
30(3)283,
30(4)376,
30(4)378,
31(3)285,
31(5)474,
31(6)564,
31(6)565,
31(6)570,
32(1)13,
32(1)16,
32(1)90,
32(1)91,
32(1)93,
32(2)187,
32(3)281,
32(4)377,
32(5)474
- output, input-,
23(1)34
- pipeline,
28(2)138,
31(6)490
- planar,
27(2)165,
28(1)78
- product,
31(5)426,
31(5)431,
31(6)565
- short,
25(1)158,
26(1)93,
26(2)187,
26(2)188-1,
26(3)282,
27(1)83,
27(1)84,
27(1)86,
27(1)87,
27(3)283-1,
27(3)283-3,
27(3)284-1,
27(4)373,
27(4)375,
27(4)376,
28(2)111,
29(2)189-1,
29(4)378,
29(4)380-1,
29(5)477,
29(6)572,
29(6)573,
30(2)189,
30(3)282-1,
30(3)283,
30(4)376,
30(4)378,
31(3)285,
31(5)474,
31(6)564,
31(6)565,
31(6)570,
32(1)90,
32(1)91,
32(1)93,
32(2)152,
32(2)187,
32(3)281,
32(4)377,
32(5)474
- systolic,
27(3)260,
31(1)83
- using,
23(1)41,
23(2)142,
23(4)380,
23(4)381,
24(2)118,
24(3)263,
24(3)271,
24(4)295,
24(4)324,
25(1)63,
25(1)84,
26(2)113,
26(4)344,
28(2)112,
28(4)409,
28(4)414,
29(2)118,
29(2)176,
29(2)182,
29(3)201,
29(5)423,
29(6)564,
30(1)87,
30(2)176,
30(4)298,
30(4)343,
30(5)437,
30(6)541,
31(3)201,
31(3)269,
31(4)289,
31(6)525,
31(6)570,
32(2)142,
32(3)273,
32(4)341,
32(5)470