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BibTeX entry
@Article{Eggermont:1984:APQ,
author = "P. P. B. Eggermont",
title = "Approximation properties of quadrature methods for
{Volterra} integral equations of the first kind",
journal = j-MATH-COMPUT,
volume = "43",
number = "168",
pages = "455--471",
month = oct,
year = "1984",
CODEN = "MCMPAF",
ISSN = "0025-5718",
MRclass = "65R20 (45L05)",
MRnumber = "86c:65152",
MRreviewer = "Sean McKee",
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); B0290R
(Integral equations); C4110 (Error analysis in
numerical methods); C4130 (Interpolation and function
approximation); C4180 (Integral equations)",
corpsource = "Dept. of Math. Sci., Delaware Univ., Newark, DE, USA",
keywords = "approximation properties; approximation theory;
asymptotic repetition factor; asymptotically optimal;
collocation-projection; convergence of numerical
methods; cyclic; error analysis; error estimates;
function approximation; integral equations; iterative
methods; linear multistep; methods; minimal smoothness
conditions; quadrature methods; reducible quadrature
methods; stable; Volterra integral equations; zero-",
treatment = "T Theoretical or Mathematical",
}
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36(153)255,
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35(151)733,
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36(153)93,
38(158)415,
40(162)499,
41(163)1,
41(164)309,
41(164)425,
42(165)25,
43(168)369,
44(169)1,
44(169)31,
45(171)91,
45(172)301,
45(172)537,
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46(174)425,
46(174)567,
47(175)37,
47(175)103,
47(175)219,
47(176)399,
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47(176)537,
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48(178)449,
49(179)1,
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51(184)631,
51(184)757,
53(187)1,
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34(149)175,
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42(166)549,
45(171)199,
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45(172)585,
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48(177)371,
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51(184)769,
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- Eggermont, P. P. B.,
53(187)157
- factor,
35(151)975,
35(151)1027,
35(152)1299,
35(152)1379,
35(152)1387,
35(152)1419,
36(153)297,
36(154)587,
37(156)403,
38(157)253,
38(157)261,
38(158)645,
39(160)481,
40(161)399,
41(164)661,
42(165)231,
44(169)167,
44(169)261,
45(171)251,
45(172)471,
46(173)321,
48(177)179,
50(181)251,
53(187)407
- iterative,
34(149)115,
34(149)185,
34(150)425,
35(151)655,
35(151)773,
35(151)817,
35(152)1221,
35(152)1269,
36(153)35,
36(153)215,
37(155)101,
37(155)105,
37(155)127,
38(157)87,
38(157)171,
39(160)453,
39(160)519,
40(162)419,
41(163)165,
42(165)165,
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43(168)415,
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45(171)173,
45(171)181,
45(172)377,
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46(173)151,
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47(175)77,
47(175)103,
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47(175)219,
48(178)471,
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49(180)507,
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50(181)1,
50(181)139,
50(181)283,
50(182)361,
50(182)399,
51(183)181,
51(184)415,
51(184)451,
51(184)477,
52(186)299,
52(186)339,
52(186)561,
53(187)203,
53(187)311,
53(188)455,
53(188)619
- kind,
36(153)215,
36(154)511,
39(159)147,
39(160)511,
39(160)519,
41(163)87,
44(170)391,
45(172)463,
46(173)93,
46(174)531,
48(178)625,
49(179)259,
49(179)275,
49(180)499,
49(180)595,
49(180)z,
51(183)267,
51(183)z,
52(185)49,
53(187)157,
53(187)327
- McKee, Sean,
35(151)783,
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- minimal,
36(154)547,
38(157)257,
44(169)241,
46(174)517,
49(180)553,
53(188)471
- multistep,
35(152)1181,
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47(176)503,
47(176)769,
47(176)z-1,
47(176)z-3,
48(178)633,
52(185)65,
52(186)339
- optimal,
34(149)115,
35(152)1221,
36(153)35,
36(154)525,
37(155)31,
37(155)159,
37(156)435,
38(157)23,
38(158)401,
38(158)437,
39(160)309,
39(160)511,
40(161)273,
40(162)419,
41(163)13,
41(163)219,
42(165)9,
42(165)25,
42(165)69,
42(165)95,
42(166)345,
42(166)417,
43(167)21,
43(167)69,
43(167)135,
44(170)303,
44(170)321,
44(170)345,
45(172)329,
45(172)405,
45(172)505,
46(174)371,
47(175)55,
47(175)151,
47(175)169,
47(175)219,
47(175)225,
48(178)625,
49(179)17,
49(180)479,
49(180)507,
49(180)z-1,
50(181)125,
50(182)361,
50(182)531,
51(183)107,
51(183)203,
52(185)31,
52(185)103,
53(188)527
- property,
35(151)803,
37(156)273,
38(157)67,
38(157)335-1,
38(158)401,
40(161)207,
40(161)253,
40(162)561,
41(163)87,
42(166)493,
43(168)433,
43(168)447,
44(170)435,
45(172)497,
46(174)537,
47(175)253,
47(176)669,
49(179)187,
50(181)189,
51(183)15,
51(183)231,
51(183)249,
51(183)281,
51(184)491,
51(184)837,
52(185)135,
53(188)627
- quadrature,
34(149)213,
35(151)851,
35(152)1299,
36(153)171,
36(154)511,
36(154)525,
36(154)547,
38(157)127,
38(157)143,
38(158)539,
40(161)273,
41(163)103,
41(164)537,
42(165)95,
42(165)173,
43(167)219,
43(168)535,
43(168)543,
44(169)177,
44(169)191,
44(169)199,
44(169)z,
45(172)417,
45(172)439,
45(172)463,
45(172)513,
46(173)229,
46(174)591,
46(174)z-2,
47(175)159,
47(175)301,
47(175)385,
47(176)639,
47(176)z,
48(178)617,
49(179)251,
49(179)259,
51(183)133,
51(183)231,
51(184)741,
51(184)749,
52(185)81,
53(187)297,
53(188)619,
53(188)627,
53(188)639
- smoothness,
35(152)1131,
37(155)141,
41(163)87,
49(179)25,
49(179)187
- 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,
45(171)15,
45(172)365,
45(172)471,
47(176)537,
49(179)91,
49(180)553,
49(180)561,
50(181)197,
53(188)455
- Volterra,
35(151)783,
37(155)95,
39(159)147,
39(160)511,
40(161)301,
41(163)87,
42(165)95,
44(170)391,
45(172)417,
45(172)439,
45(172)z,
48(178)625,
52(185)49,
53(187)157,
53(188)571
- zero,
35(151)747,
35(152)1379,
36(153)241,
36(153)247,
36(154)631,
38(158)589,
39(159)207,
39(160)639,
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46(174)771-2,
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47(175)225,
47(175)253,
47(175)301,
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