Entry Rote:1997:FSV from tcs1995.bib
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BibTeX entry
@Article{Rote:1997:FSV,
author = "G{\"u}nter Rote",
title = "Finding a shortest vector in a two-dimensional lattice
modulo $m$",
journal = j-THEOR-COMP-SCI,
volume = "172",
number = "1--2",
pages = "303--308",
day = "10",
month = feb,
year = "1997",
CODEN = "TCSCDI",
ISSN = "0304-3975 (print), 1879-2294 (electronic)",
ISSN-L = "0304-3975",
bibdate = "Mon Jul 19 22:20:35 MDT 1999",
bibsource = "http://www.elsevier.com/cgi-bin/cas/tree/store/tcs/cas_free/browse/browse.cgi?year=1997&volume=172&issue=1-2;
http://www.math.utah.edu/pub/tex/bib/tcs1995.bib",
URL = "http://www.elsevier.com/cgi-bin/cas/tree/store/tcs/cas_sub/browse/browse.cgi?year=1997&volume=172&issue=1-2&aid=2397",
acknowledgement = ack-nhfb,
classification = "C1110 (Algebra); C4240C (Computational complexity)",
corpsource = "Inst. f{\"u}r Math., Graz Univ., Austria",
fjournal = "Theoretical Computer Science",
journal-URL = "http://www.sciencedirect.com/science/journal/03043975/",
keywords = "2D lattice module; arithmetic steps.; bit complexity;
computational complexity; integer multiples; integer
multiplication; Minkowski-reduced basis; nonzero
vector; planar lattice; shortest vector; vectors",
pubcountry = "Netherlands",
treatment = "T Theoretical or Mathematical",
xxtitle = "Finding a shortest vector in a two-dimensional lattice
module $m$",
}
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- $m$,
147(1)137
- arithmetic,
147(1)55,
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154(2)145,
156(1)159,
159(1)29,
162(1)133,
162(1)151,
171(1)25,
173(1)151,
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174(1)247,
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209(1)389,
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- basis,
157(1)79,
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159(2)355,
161(1)69,
165(1)133,
166(1)203,
187(1)179
- bit,
141(1)175,
141(1)283,
164(1)1,
172(1)293,
177(2)425,
178(1)155
- C1110,
138(1)101,
140(1)5,
154(1)3,
155(1)221,
156(1)301,
162(2)173,
164(1)41,
176(1)347,
178(1)257,
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187(1)3,
187(1)7,
187(1)27,
187(1)49,
187(1)117,
187(1)123,
187(1)167,
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187(1)z,
191(1)219,
194(1)1
- dimensional, two-,
138(1)35,
140(2)231,
143(1)123,
145(1)241,
147(1)1,
147(1)19,
154(2)349,
175(2)293,
201(1)263
- finding,
145(1)317,
145(1)357,
147(1)181,
157(2)273,
172(1)265,
203(1)151
- integer,
127(2)287,
147(1)87,
148(1)33,
154(1)3,
158(1)65,
160(1)305,
167(1)131,
168(2)267,
172(1)255,
173(1)151,
174(1)137,
174(1)193,
174(1)247,
182(1)217,
185(1)63,
193(1)129,
197(1)57,
208(1)149,
209(1)287
- lattice,
143(1)51,
143(2)343,
148(1)67,
159(1)29,
159(2)245,
165(1)57,
165(2)391,
175(2)337,
175(2)373,
178(1)237,
191(1)117,
192(2)167,
207(1)105,
217(1)115,
217(1)157,
217(2)279,
217(2)291,
224(1)157,
226(1)29
- module,
153(1)49,
153(1)245,
155(2)349,
159(2)143,
166(1)101,
172(1)135,
173(2)485,
177(2)407,
187(1)49,
192(1)3,
192(2)201,
194(1)248-1,
194(1)z,
197(1)246-1,
208(1)149
- modulo,
172(1)135,
174(1)137,
174(1)247,
224(1)215
- multiple,
138(1)211,
143(1)137,
154(2)203,
155(1)141,
156(1)177,
173(1)235,
180(1)115,
182(1)233,
183(1)33,
193(1)97,
210(2)341,
224(1)157
- multiplication,
154(1)41,
196(1)71,
196(1)109,
196(1)319,
205(1)307,
226(1)45
- nonzero,
209(1)237
- planar,
140(2)301,
143(2)309,
145(1)27,
147(1)69,
154(1)3,
159(1)137,
175(2)239,
181(1)57,
203(1)123,
215(1)225
- shortest,
140(2)265,
140(2)291,
143(1)113,
143(2)343,
143(2)353,
144(1)161,
145(1)317,
161(1)123,
168(1)121,
182(1)183,
186(1)171,
191(1)205,
203(1)143,
203(2)205,
207(1)105,
209(1)287
- step,
140(1)73,
158(1)177,
163(1)117,
177(2)351,
190(2)115,
191(1)245,
194(1)241-3,
194(1)248-1
- two-dimensional,
138(1)35,
140(2)231,
143(1)123,
145(1)241,
147(1)1,
147(1)19,
154(2)349,
164(1)73,
175(2)293,
201(1)263,
218(2)325
- vector,
138(1)35,
138(1)201,
157(1)115,
157(1)129,
163(1)193,
169(1)39,
179(1)61,
187(1)147,
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197(1)242-1,
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