Last update: Sat May 21 02:03:19 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{Peyton:1993:PCG,
author = "Barry W. Peyton and Alex Pothen and Xiaoqing Yuan",
title = "Partitioning a Chordal Graph Into Transitive Subgraphs
for Parallel Sparse Triangular Solution",
journal = j-LINEAR-ALGEBRA-APPL,
volume = "192",
pages = "329--353",
month = oct,
year = "1993",
CODEN = "LAAPAW",
ISSN = "0024-3795",
MRclass = "05C85 (05C50 65F50)",
MRnumber = "94i:05096",
bibdate = "Wed Jan 22 17:57:24 MST 1997",
note = "Computational linear algebra in algebraic and related
problems (Essen, 1992).",
acknowledgement = ack-nhfb,
}
Related entries
- 05C50,
128(0)139,
131(0)39,
133(0)77,
133(0)121,
139(0)1,
140(0)45,
141(0)123,
142(0)113,
144(0)101,
144(0)135,
145(0)21,
148(0)125,
148(0)265,
149(0)19,
149(0)125,
150(0)61,
150(0)167,
182(0)45,
184(0)55,
187(0)251,
190(0)169,
192(0)3,
192(0)61,
192(0)83,
194(0)183,
197(0)143,
199(0)381,
201(0)57,
208(0)455,
212(0)267,
212(0)289,
212(0)309,
216(1)211,
217(1)179,
218(1)1,
218(1)103,
218(1)213,
220(1)97,
220(1)161,
220(1)229,
221(1)103,
221(1)131,
222(1)261,
223(1)363,
223(1)375,
226(1)105,
226(1)139,
226(1)247,
226(1)267,
226(1)273,
226(1)423,
226(1)577,
226(1)593,
226(1)723,
229(1)15,
230(1)3,
230(1)101,
236(1)181,
236(1)265,
240(1)65,
240(1)238,
244(1)123,
244(1)277,
245(1)27,
248(1)303,
248(1)355,
251(1)97,
253(1)61,
255(1)259,
257(1)311,
258(1)95,
259(1)347,
260(1)43,
260(1)95,
261(1)195,
262(1)209,
263(1)275,
263(1)333,
265(1)55,
265(1)93,
268(1)345,
270(1)1,
275(1)495,
277(1)41
- 05C85,
223(1)553,
226(1)459
- 65F50,
130(0)43,
130(0)193,
130(0)257,
144(0)39,
145(0)187,
152(0)107,
154(0)331,
154(0)377,
154(0)509,
154(0)819,
158(0)61,
194(0)183,
225(1)57,
240(1)9,
262(1)83
- algebraic,
127(0)157,
135(0)1,
137(0)39,
139(0)181,
141(0)53,
144(0)71,
145(0)1,
147(0)411,
153(0)1,
153(0)99,
157(0)49,
157(0)217,
169(0)179,
177(0)49,
178(0)217,
185(0)61,
187(0)105,
187(0)259,
188(0)437,
188(0)465,
192(0)3,
192(0)33,
192(0)61,
192(0)83,
192(0)101,
192(0)109,
192(0)115,
192(0)137,
192(0)165,
192(0)187,
192(0)205,
192(0)235,
192(0)249,
192(0)301,
192(0)355,
203(0)429,
205(0)831,
205(0)1045,
205(0)1253,
208(0)229,
212(0)249,
212(0)289,
219(1)1,
221(1)117,
222(1)127,
225(1)13,
230(1)89,
239(1)109,
240(1)153,
240(1)183,
247(1)133,
259(1)183,
260(1)223,
261(1)317,
262(1)283,
267(1)281,
270(1)287,
271(1)169,
274(1)161,
274(1)317,
275(1)595,
279(1)75,
279(1)255,
284(1)3,
285(1)7,
296(1)1,
298(1)115,
299(1)191
- chordal,
148(0)125,
183(0)23,
223(1)553
- Computational,
152(0)191,
192(0)3,
192(0)33,
192(0)61,
192(0)83,
192(0)101,
192(0)109,
192(0)115,
192(0)137,
192(0)165,
192(0)187,
192(0)205,
192(0)235,
192(0)249,
192(0)301,
192(0)355
- Essen,
192(0)3,
192(0)33,
192(0)61,
192(0)83,
192(0)101,
192(0)109,
192(0)115,
192(0)137,
192(0)165,
192(0)187,
192(0)205,
192(0)235,
192(0)249,
192(0)301,
192(0)355
- parallel,
131(0)139,
136(0)189,
145(0)71,
146(0)49,
154(0)311,
154(0)473,
154(0)723,
172(0)197,
172(0)347,
188(0)3,
188(0)437,
188(0)489,
188(0)549,
220(1)63,
241(1)85,
241(1)733,
247(1)237,
250(1)317,
251(1)249,
259(1)77,
267(1)281,
269(1)1,
275(1)451,
282(1)1,
284(1)95,
302(1)265
- Partitioning,
223(1)553
- Peyton, Barry W.,
223(1)553,
262(1)83
- Pothen, Alex,
194(0)183,
223(1)553,
254(1)1
- related,
139(0)31,
151(0)199,
165(0)153,
186(0)165,
192(0)3,
192(0)33,
192(0)61,
192(0)83,
192(0)101,
192(0)109,
192(0)115,
192(0)137,
192(0)165,
192(0)187,
192(0)205,
192(0)235,
192(0)249,
192(0)301,
192(0)355,
199(0)253,
217(1)179,
218(1)185,
235(1)153,
236(1)113,
247(1)31,
247(1)317,
252(1)1,
261(1)49,
264(1)55,
266(1)81,
269(1)183,
271(1)235,
282(1)83,
283(1)99,
289(1)121,
291(1)167
- solution,
130(0)133,
130(0)257,
131(0)1,
137(0)39,
137(0)511,
137(0)699,
139(0)165,
144(0)85,
152(0)69,
152(0)233,
153(0)99,
154(0)415,
154(0)741,
165(0)229,
167(0)171,
169(0)61,
170(0)1,
173(0)1,
174(0)145,
177(0)49,
177(0)145,
178(0)201,
179(0)19,
179(0)85,
179(0)171,
182(0)109,
185(0)41,
186(0)255,
187(0)15,
188(0)437,
188(0)465,
193(0)211,
194(0)91,
199(0)305,
202(0)143,
202(0)221,
205(0)1253,
212(0)487,
216(1)25,
218(1)59,
218(1)89,
222(1)9,
222(1)127,
223(1)415,
223(1)589,
223(1)597,
225(1)57,
225(1)195,
229(1)1,
231(1)15,
233(1)51,
235(1)247,
236(1)95,
236(1)137,
236(1)205,
239(1)29,
240(1)153,
240(1)231,
241(1)85,
244(1)69,
244(1)365,
245(1)171,
245(1)259,
246(1)1,
246(1)113,
247(1)359,
249(1)1,
251(1)249,
251(1)321,
254(1)467,
258(1)53,
259(1)271,
261(1)317,
262(1)55,
266(1)291,
267(1)247,
272(1)33,
274(1)301,
275(1)49,
279(1)93,
279(1)181,
279(1)303,
281(1)247,
282(1)97,
285(1)7,
285(1)229,
288(1)175,
288(1)293,
289(1)127,
289(1)131,
290(1)23,
296(1)213,
298(1)99,
292(1)187
- sparse,
130(0)257,
145(0)187,
152(0)107,
152(0)291,
154(0)245,
154(0)289,
154(0)331,
154(0)509,
194(0)183,
199(0)339,
207(0)1,
225(1)57,
240(1)9,
262(1)83,
277(1)33,
282(1)1,
284(1)53,
289(1)41,
289(1)203
- Subgraphs,
223(1)553
- transitive,
172(0)151,
220(1)97,
223(1)553,
226(1)237,
233(1)149,
302(1)423
- triangular,
143(0)145,
147(0)17,
150(0)119,
150(0)297,
150(0)443,
167(0)3,
168(0)221,
170(0)117,
172(0)1,
172(0)135,
182(0)27,
187(0)263,
191(0)77,
216(1)97,
220(1)215,
221(1)205,
231(1)105,
233(1)175,
237(1)97,
239(1)175,
245(1)295,
247(1)347,
252(1)367,
254(1)241,
260(1)119,
260(1)319,
269(1)241,
278(1)85,
281(1)105,
282(1)25,
282(1)249,
288(1)89,
291(1)125,
292(1)61,
293(1)199,
302(1)245
- Yuan, Xiaoqing,
223(1)553