Entry Barrett:1994:RTD from lncs1994.bib
Last update: Mon Mar 13 02:21:52 MDT 2017
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{Barrett:1994:RTD,
author = "E. Barrett and G. Gheen and P. Payton",
title = "Representation of Three-Dimensional Object Structure
as Cross-Ratios of Determinants of Stereo Image
Points",
journal = j-LECT-NOTES-COMP-SCI,
volume = "825",
pages = "47--??",
year = "1994",
CODEN = "LNCSD9",
ISSN = "0302-9743 (print), 1611-3349 (electronic)",
ISSN-L = "0302-9743",
bibdate = "Mon May 13 11:52:14 MDT 1996",
bibsource = "http://www.math.utah.edu/pub/tex/bib/lncs1994.bib",
acknowledgement = ack-nhfb,
}
Related entries
- determinant,
834(0)65
- Dimensional, Three-,
796(0)99,
796(0)171,
853(0)101
- image,
776(0)1,
796(0)31,
800(0)83,
800(0)111,
800(0)131,
800(0)132,
800(0)152,
800(0)179,
800(0)201,
800(0)211,
800(0)213,
800(0)217,
800(0)225,
800(0)231,
800(0)235,
800(0)299,
800(0)305,
800(0)309,
800(0)319,
800(0)377,
800(0)403,
800(0)417,
800(0)449,
800(0)459,
800(0)485,
819(0)95,
825(0)89,
825(0)107,
825(0)297,
849(0)129,
849(0)156,
849(0)332,
855(0)215,
868(0)363,
871(0)160
- object,
772(0)2,
772(0)177,
775(0)251,
777(0)64,
777(0)157,
779(0)1,
779(0)273,
779(0)337,
779(0)351,
779(0)365,
782(0)191,
785(0)1,
785(0)158,
785(0)337,
788(0)1,
788(0)501,
789(0)296,
789(0)321,
791(0)33,
791(0)47,
791(0)122,
791(0)139,
791(0)152,
800(0)3,
800(0)15,
800(0)24,
800(0)143,
800(0)239,
800(0)262,
800(0)316,
800(0)407,
800(0)411,
800(0)471,
806(0)62,
811(0)119,
816(0)56,
817(0)539,
819(0)415,
821(0)1,
821(0)100,
821(0)118,
821(0)183,
821(0)213,
821(0)260,
821(0)299,
821(0)320,
821(0)365,
821(0)450,
821(0)513,
823(0)1,
823(0)13,
823(0)34,
823(0)110,
823(0)297,
824(0)183,
825(0)317,
825(0)341,
825(0)381,
825(0)397,
825(0)493,
826(0)55,
826(0)153,
826(0)170,
827(0)48,
834(0)181,
838(0)347,
844(0)215,
847(0)77,
854(0)438,
854(0)449,
855(0)240,
855(0)278,
856(0)2,
856(0)37,
856(0)125,
856(0)290,
856(0)390,
858(0)171,
858(0)248,
858(0)313,
868(0)34,
869(0)154,
874(0)218,
875(0)375,
876(0)121
- point,
788(0)43,
800(0)73,
800(0)143,
800(0)459,
813(0)114,
832(0)318,
834(0)38,
834(0)405,
834(0)532,
841(0)52,
852(0)327,
855(0)240,
864(0)395,
877(0)59,
877(0)60,
877(0)122
- representation,
763(0)21,
763(0)96,
763(0)314,
764(0)1,
766(0)1,
774(0)87,
776(0)104,
784(0)20,
798(0)322,
800(0)441,
800(0)589,
805(0)251,
808(0)131,
810(0)145,
810(0)229,
811(0)200,
812(0)44,
812(0)131,
815(0)239,
818(0)41,
825(0)341,
825(0)473,
827(0)67,
827(0)265,
831(0)143,
831(0)162,
831(0)186,
833(0)69,
833(0)123,
835(0)1,
837(0)106,
837(0)338,
844(0)73,
847(0)97,
858(0)266,
860(0)38,
862(0)66,
862(0)189,
864(0)266,
866(0)292,
866(0)397,
868(0)67,
869(0)39,
869(0)295,
877(0)143
- stereo,
796(0)408,
800(0)179,
800(0)247,
800(0)377,
800(0)455,
800(0)463,
800(0)567
- structure,
766(0)1,
767(0)1,
768(0)37,
768(0)57,
774(0)398,
775(0)509,
775(0)633,
775(0)735,
776(0)218,
776(0)234,
776(0)326,
776(0)341,
777(0)1,
779(0)59,
780(0)73,
780(0)99,
784(0)379,
786(0)98,
796(0)183,
797(0)484,
800(0)35,
800(0)83,
800(0)85,
800(0)217,
800(0)389,
808(0)197,
813(0)23,
815(0)396,
819(0)299,
819(0)336,
820(0)364,
820(0)556,
825(0)89,
825(0)127,
825(0)165,
833(0)15,
834(0)10,
835(0)45,
835(0)144,
835(0)230,
835(0)275,
836(0)129,
837(0)392,
849(0)99,
849(0)120,
849(0)240,
849(0)303,
851(0)433,
852(0)97,
854(0)53,
855(0)343,
855(0)495,
856(0)163,
856(0)246,
860(0)198,
866(0)492,
869(0)416,
871(0)94
- Three-Dimensional,
796(0)99,
796(0)171,
853(0)101