Entry Mamontov:1998:AES from lncs1998b.bib
Last update: Mon Mar 13 02:22:45 MDT 2017
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{Mamontov:1998:AES,
author = "Y. V. Mamontov and M. Willander",
title = "An Algorithm to Evaluate Spectral Densities of
High-Dimensional Stationary Diffusion Stochastic
Processes with Non-linear Coefficients: The General
Scheme and Issues on Implementation with {PVM}",
journal = j-LECT-NOTES-COMP-SCI,
volume = "1541",
pages = "315--321",
year = "1998",
CODEN = "LNCSD9",
ISSN = "0302-9743 (print), 1611-3349 (electronic)",
ISSN-L = "0302-9743",
bibdate = "Wed Sep 15 10:01:31 MDT 1999",
bibsource = "http://www.math.utah.edu/pub/tex/bib/lncs1998b.bib",
acknowledgement = ack-nhfb,
keywords = "applied parallel computing; computing science; PARA;
parallel computing",
}
Related entries
- applied,
1451(0)997,
1456(0)98,
1464(0)224,
1484(0)337,
1497(0)331,
1516(0)143,
1518(0)260,
1518(0)357,
1531(0)494,
1541(0)1,
1541(0)7,
1541(0)12,
1541(0)20,
1541(0)28,
1541(0)43,
1541(0)48,
1541(0)56,
1541(0)63,
1541(0)71,
1541(0)76,
1541(0)82,
1541(0)88,
1541(0)95,
1541(0)104,
1541(0)112,
1541(0)120,
1541(0)134,
1541(0)142,
1541(0)149,
1541(0)161,
1541(0)167,
1541(0)172,
1541(0)182,
1541(0)195,
1541(0)207,
1541(0)216,
1541(0)224,
1541(0)230,
1541(0)239,
1541(0)248,
1541(0)255,
1541(0)263,
1541(0)275,
1541(0)281,
1541(0)286,
1541(0)296,
1541(0)304,
1541(0)309,
1541(0)322,
1541(0)332,
1541(0)337,
1541(0)345,
1541(0)357,
1541(0)366,
1541(0)377,
1541(0)379,
1541(0)385,
1541(0)390,
1541(0)400,
1541(0)418,
1541(0)433,
1541(0)438,
1541(0)447,
1541(0)452,
1541(0)460,
1541(0)468,
1541(0)476,
1541(0)483,
1541(0)491,
1541(0)503,
1541(0)510,
1541(0)515,
1541(0)521,
1541(0)527,
1541(0)537,
1541(0)543,
1541(0)551,
1541(0)557,
1541(0)565,
1541(0)574,
1541(0)579
- Density,
1451(0)952,
1498(0)998,
1529(0)318
- Diffusion,
1451(0)540,
1469(0)344,
1496(0)489,
1497(0)403,
1498(0)560
- Evaluate,
1456(0)72
- General,
1451(0)697,
1452(0)610-1,
1466(0)405,
1469(0)255,
1470(0)373,
1486(0)27,
1490(0)266,
1495(0)203,
1499(0)134,
1504(0)69,
1520(0)432,
1533(0)377,
1541(0)510,
1547(0)413
- implementation,
1451(0)397,
1452(0)620,
1455(0)354,
1457(0)366,
1460(0)1,
1462(0)327,
1470(0)798,
1470(0)846,
1474(0)98,
1482(0)179,
1482(0)426,
1482(0)441,
1482(0)500,
1483(0)237,
1490(0)284,
1490(0)318,
1496(0)167,
1497(0)172,
1497(0)346,
1499(0)216,
1505(0)199,
1507(0)334,
1512(0)9,
1512(0)46,
1514(0)66,
1514(0)80,
1516(0)128,
1537(0)187,
1541(0)82,
1541(0)309,
1541(0)527,
1543(0)315,
1544(0)152,
1547(0)436
- issue,
1458(0)1,
1460(0)113,
1487(0)137,
1487(0)143,
1501(0)11,
1526(0)155,
1531(0)448,
1541(0)438,
1553(0)98
- linear, Non-,
1451(0)823,
1462(0)212,
1496(0)974,
1531(0)611,
1541(0)142
- Non-linear,
1451(0)823,
1462(0)212,
1496(0)974,
1531(0)611,
1541(0)142
- PARA,
1541(0)1,
1541(0)7,
1541(0)12,
1541(0)20,
1541(0)28,
1541(0)43,
1541(0)48,
1541(0)56,
1541(0)63,
1541(0)71,
1541(0)76,
1541(0)82,
1541(0)88,
1541(0)95,
1541(0)104,
1541(0)112,
1541(0)120,
1541(0)134,
1541(0)142,
1541(0)149,
1541(0)161,
1541(0)167,
1541(0)172,
1541(0)182,
1541(0)195,
1541(0)207,
1541(0)216,
1541(0)224,
1541(0)230,
1541(0)239,
1541(0)248,
1541(0)255,
1541(0)263,
1541(0)275,
1541(0)281,
1541(0)286,
1541(0)296,
1541(0)304,
1541(0)309,
1541(0)322,
1541(0)332,
1541(0)337,
1541(0)345,
1541(0)357,
1541(0)366,
1541(0)377,
1541(0)379,
1541(0)385,
1541(0)390,
1541(0)400,
1541(0)418,
1541(0)433,
1541(0)438,
1541(0)447,
1541(0)452,
1541(0)460,
1541(0)468,
1541(0)476,
1541(0)483,
1541(0)491,
1541(0)503,
1541(0)510,
1541(0)515,
1541(0)521,
1541(0)527,
1541(0)537,
1541(0)543,
1541(0)551,
1541(0)557,
1541(0)565,
1541(0)574,
1541(0)579
- process,
1453(0)65,
1453(0)401,
1454(0)444,
1460(0)206,
1460(0)394,
1461(0)26,
1461(0)417,
1466(0)131,
1466(0)147,
1466(0)179,
1466(0)366,
1466(0)389,
1466(0)405,
1469(0)15,
1470(0)80,
1470(0)165,
1470(0)288,
1470(0)397,
1470(0)720,
1474(0)98,
1478(0)218,
1484(0)1,
1485(0)1,
1487(0)1,
1487(0)13,
1487(0)28,
1487(0)43,
1487(0)60,
1487(0)92,
1487(0)100,
1487(0)105,
1487(0)111,
1487(0)127,
1487(0)132,
1487(0)137,
1487(0)143,
1487(0)148,
1487(0)151,
1487(0)152,
1487(0)153,
1487(0)154,
1487(0)155,
1488(0)402,
1492(0)1,
1492(0)386,
1493(0)5,
1493(0)192,
1493(0)250,
1497(0)93,
1499(0)201,
1505(0)151,
1506(0)224,
1507(0)168,
1507(0)291,
1507(0)393,
1510(0)28,
1510(0)111,
1510(0)405,
1510(0)432,
1516(0)77,
1516(0)128,
1518(0)331,
1521(0)275,
1522(0)451,
1526(0)235,
1528(0)366,
1529(0)501,
1530(0)78,
1532(0)389,
1532(0)403,
1534(0)226,
1538(0)245,
1543(0)355
- PVM,
1497(0)19,
1497(0)44,
1497(0)74,
1497(0)105,
1497(0)196,
1497(0)215,
1497(0)231,
1497(0)265,
1497(0)273,
1497(0)297,
1497(0)312,
1497(0)323,
1497(0)338
- Scheme,
1451(0)272,
1451(0)1013,
1457(0)298,
1459(0)98,
1462(0)257,
1465(0)103,
1470(0)751,
1476(0)222,
1479(0)207,
1483(0)137,
1485(0)85,
1485(0)241,
1490(0)300,
1498(0)178,
1498(0)795,
1514(0)160
- Spectral,
1457(0)366,
1457(0)376
- Stationary,
1477(0)112,
1477(0)112-1
- Stochastic,
1451(0)630,
1451(0)897,
1461(0)26,
1466(0)366,
1466(0)423,
1469(0)255,
1469(0)369,
1492(0)386,
1502(0)321,
1508(0)69,
1520(0)470,
1531(0)587,
1533(0)337