Entry Lev:1983:SBS from tcs1980.bib
Last update: Thu Sep 27 02:46:46 MDT 2018
Top |
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{Lev:1983:SBS,
author = "G. Lev and L. G. Valiant",
title = "Size bounds for superconcentrators",
journal = j-THEOR-COMP-SCI,
volume = "22",
number = "3",
pages = "233--251",
month = feb,
year = "1983",
CODEN = "TCSCDI",
ISSN = "0304-3975 (print), 1879-2294 (electronic)",
ISSN-L = "0304-3975",
bibdate = "Sat Nov 22 13:36:07 MST 1997",
bibsource = "http://www.math.utah.edu/pub/tex/bib/tcs1980.bib",
acknowledgement = ack-nhfb,
classification = "B0230 (Integral transforms); B0250 (Combinatorial
mathematics); C1130 (Integral transforms); C1160
(Combinatorial mathematics)",
corpsource = "Dept. of Computer Sci., Edinburgh Univ., Edinburgh,
UK",
fjournal = "Theoretical Computer Science",
journal-URL = "http://www.sciencedirect.com/science/journal/03043975/",
keywords = "algorithms; cyclic convolution; directed acyclic
graph; directed graphs; discrete Fourier transform;
Fourier transforms; lower bound; N-superconcentrator;
prime order; recursive construction; size bounds",
pubcountry = "Netherlands",
treatment = "T Theoretical or Mathematical",
}
Related entries
- acyclic,
10(2)111,
13(3)315,
18(1)89,
19(1)69,
32(1)185
- B0250,
11(1)93,
11(2)117,
13(2)137,
16(1)5,
17(1)29,
17(1)75,
17(1)91,
17(1)103,
17(2)151,
18(1)89,
19(1)1,
21(1)91,
21(1)99,
23(3)273,
24(2)161,
28(1)171,
29(1)49,
29(1)75,
29(3)251,
30(3)241,
31(1)31,
31(1)61,
31(1)73,
31(3)307,
34(1)3
- bound,
10(1)1,
10(1)53,
10(1)83,
11(3)321,
12(3)339,
14(1)19,
14(1)103,
14(3)337,
15(3)311,
16(3)307,
19(1)39,
22(3)285,
23(1)95,
23(2)171,
23(2)211,
24(3)239,
25(1)1,
26(1)25,
27(1)3,
27(3)241,
28(3)263,
28(3)337,
29(1)75,
29(1)123,
30(3)319,
32(1)173
- C1160,
11(1)39,
11(1)93,
11(2)117,
11(2)123,
11(3)247,
12(1)83,
13(2)137,
13(3)315,
14(1)103,
15(1)1,
15(2)159,
15(3)321,
16(1)5,
17(1)29,
17(1)75,
17(1)91,
17(1)103,
17(2)151,
17(2)217,
18(1)89,
18(2)115,
18(3)259,
19(1)1,
19(1)17,
19(1)29,
19(1)69,
19(2)189,
21(1)55,
21(1)91,
21(1)99,
22(3)253,
22(3)331,
23(1)37,
23(1)83,
23(2)129,
23(2)211,
23(3)231,
23(3)243,
23(3)273,
24(2)143,
24(2)161,
25(2)95,
25(3)311,
28(1)171,
29(1)49,
29(1)75,
29(3)251,
30(3)241,
31(1)31,
31(1)61,
31(1)73,
31(3)307,
32(1)1,
32(1)87,
32(1)121,
32(1)173,
32(1)185,
32(1)215,
32(3)227,
32(3)309,
33(2)239,
34(1)3,
34(1)17,
34(1)33,
34(1)83,
34(1)169,
34(3)275,
34(3)337,
34(3)343
- construction,
21(1)91,
24(1)73,
32(1)215,
34(1)33,
34(1)227
- cyclic,
14(3)247,
29(3)251
- directed,
10(2)111,
13(3)315,
18(1)89,
19(1)39,
19(1)69,
30(3)241,
32(1)215,
32(3)309
- discrete,
10(2)187,
21(3)315,
23(2)107
- integral,
34(1)207
- lower,
10(1)1,
10(1)83,
11(3)321,
19(1)39,
22(3)285,
27(1)3,
29(1)75,
29(1)123,
30(3)319,
34(3)275
- N-superconcentrator,
32(1)215
- order,
12(1)19,
13(2)225,
17(3)259,
18(1)105,
18(3)301,
23(1)11,
23(3)333,
26(1)131,
26(1)149,
27(3)311,
29(1)75,
31(1)73,
34(1)33
- prime,
23(2)211,
31(1)125
- recursive,
11(2)181,
12(2)175,
13(2)193,
13(3)239,
15(2)159,
17(2)163,
17(3)235,
20(2)95,
20(3)323,
21(1)1,
22(1)135,
23(3)305,
23(3)333,
25(1)1,
25(2)193,
26(1)105,
26(1)131,
27(1)225,
28(1)111,
29(1)49,
29(1)185,
30(2)139,
31(1)41,
31(1)101,
32(1)173,
33(2)261
- size,
15(3)291,
21(2)213,
24(3)221,
28(3)337,
33(1)85
- superconcentrator,
32(1)215
- superconcentrator, N-,
32(1)215
- Valiant, L. G.,
12(3)303