Last update: Wed Oct 26 02:10:52 MDT 2005
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{Jeltsch:1985:ABS,
author = "Rolf Jeltsch and Klaus-G{\"u}nther Strack",
title = "Accuracy bounds for semidiscretizations of hyperbolic
problems",
journal = j-MATH-COMPUT,
volume = "45",
number = "172",
pages = "365--376",
month = oct,
year = "1985",
CODEN = "MCMPAF",
ISSN = "0025-5718",
MRclass = "65M20",
MRnumber = "86j:65125",
bibdate = "Tue Oct 13 08:06:19 MDT 1998",
bibsource = "JSTOR database",
acknowledgement = ack-nhfb,
classcodes = "B0290B (Error analysis in numerical methods); B0290F
(Interpolation and function approximation); B0290P
(Differential equations); C4110 (Error analysis in
numerical methods); C4130 (Interpolation and function
approximation); C4170 (Differential equations)",
corpsource = "Inst. fur Geometrie und Praktische Math., Aachen, West
Germany",
keywords = "difference equations; difference methods; error
analysis; error constants; first-order hyperbolic
equations; interpolatory methods; semidiscretizations
of hyperbolic problems; stable finite-",
treatment = "T Theoretical or Mathematical",
}
Related entries
- 65M20,
43(168)383,
43(168)z,
53(187)81
- accuracy,
34(149)237,
38(157)181,
38(157)215,
39(159)29,
41(163)1,
43(168)551,
44(170)321,
45(171)15,
45(171)109,
45(172)329,
45(172)559,
46(173)81,
47(175)225,
47(176)555,
49(179)25,
49(179)91,
49(179)105,
49(180)331,
52(186)675,
53(188)509
- bound,
34(149)155,
34(149)185,
34(150)521,
35(152)1191,
35(152)1195,
35(152)1269,
36(153)1,
36(153)155,
36(153)193,
36(154)583,
37(155)101,
37(155)105,
37(156)435,
37(156)581,
38(157)249,
38(158)589,
39(159)125,
39(160)481,
39(160)693,
39(160)709,
40(162)589,
41(163)115,
41(163)219,
41(164)425,
41(164)683,
42(165)193,
42(166)465,
42(166)521,
44(170)283,
45(171)23,
45(171)35,
45(171)51,
45(172)471,
46(174)457,
46(174)659,
47(175)151,
47(175)159,
47(176)713,
47(176)729,
48(178)651,
49(179)187,
49(179)259,
50(182)399,
50(182)481,
51(183)1,
51(183)15,
51(183)315,
51(184)837,
52(185)135,
53(187)219,
53(187)431,
53(187)z-1,
53(188)589,
53(188)619,
53(188)649,
53(188)665,
53(188)743
- constant,
34(149)305,
34(150)373,
35(152)1191,
37(155)79,
39(159)195,
39(160)415,
44(169)241,
44(169)z-1,
44(170)283,
45(171)1,
45(171)91,
45(172)621,
46(173)59,
48(177)55,
48(178)854,
49(180)479,
49(180)523,
49(180)635,
50(181)275,
51(183)281,
53(187)81,
53(187)103,
53(188)649
- first-order,
35(152)1093,
36(153)65,
43(167)157,
44(170)443,
45(171)15,
46(173)45,
47(176)555,
53(187)103
- hyperbolic,
34(150)401,
35(152)1093,
36(153)65,
36(153)87,
36(153)107,
36(154)321,
36(154)353,
36(154)375,
36(154)603,
38(157)37,
38(158)339,
40(161)1,
40(162)469,
40(162)607,
41(163)1,
41(164)309,
42(166)393,
43(168)383,
43(168)z,
44(169)31,
44(170)361,
44(170)379,
44(170)z,
45(171)65,
45(172)279,
45(172)301,
46(173)1,
46(173)59,
46(174)379,
47(175)37,
47(175)159,
47(176)461,
47(176)713,
48(178)503,
49(179)39,
49(179)91,
49(179)123,
49(179)135,
49(180)427,
49(180)445,
50(181)53,
50(181)89,
51(184)581,
51(184)599,
52(186)299,
52(186)321,
52(186)389,
52(186)509,
52(186)z,
53(188)471,
53(188)527,
53(188)547
- interpolatory,
35(151)851,
38(157)127,
47(176)503,
48(178)725,
52(185)95
- order, first-,
35(152)1093,
36(153)65,
43(167)157,
44(170)443,
45(171)15,
46(173)45,
47(176)555
- stable,
34(149)23,
34(149)45,
34(150)515,
36(153)65,
36(154)499,
38(157)23,
38(158)475,
39(159)1,
39(159)109,
39(160)481,
39(160)491,
41(164)383,
41(164)425,
42(165)143,
43(168)455,
45(171)15,
45(172)471,
47(176)537,
49(179)91,
49(180)553,
49(180)561,
50(181)197,
53(188)455