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Sur les diagrammes de Delaunay et de Voronoï d'ordre k dans le plan et dans l'espace = On planar and spatial order-k Delaunay and Voronoi diagramsSchmitt, Dominique; Spehner, J.-C.1995, 278 p.Thesis

Percolating clusters on Voronoi lattices and the relationship to particle fouling on filtersBELL, D. J; DECKMYN, P; DAVIES, G. A et al.Zeitschrift für angewandte Mathematik und Mechanik. 1996, Vol 76, pp 331-334, issn 0044-2267, SUP3Conference Paper

Improved k-Nearest Neighbor Classifier for Biomedical Data Based on Convex Hull of Inversed Set of PointsSZYMANSKI, Zbigniew; DWULIT, Marek.Proceedings of SPIE, the International Society for Optical Engineering. 2010, Vol 7745, issn 0277-786X, isbn 9780819472358, 774510.1-774510.8Conference Paper

The only correct method to evaluate roundnessKEWEI LAI.Computers & industrial engineering. 1995, Vol 28, Num 1, pp 203-204, issn 0360-8352Article

The incomplete Voronoi diagram and percolation analysisZANINETTI, L.Physics letters. A. 1994, Vol 189, Num 3, pp 167-170, issn 0375-9601Article

Géométrie algorithmique = Computational geometryBERSTEL, J; POCCHIOLA, M.Le Courrier du C.N.R.S. 1993, Num 80, pp 58-59, issn 0153-985XArticle

The minimum equitable radius location problem with continuous demandSUZUKI, Atsuo; DREZNER, Zvi.European journal of operational research. 2009, Vol 195, Num 1, pp 17-30, issn 0377-2217, 14 p.Article

Gridding-based direct Fourier inversion of the three-dimensional ray transformPENCZEK, Pawel A; RENKA, Robert; SCHOMBERG, Hermann et al.Journal of the Optical Society of America. A, Optics, image science, and vision (Print). 2004, Vol 21, Num 4, pp 499-509, issn 1084-7529, 11 p.Article

Quick and robust initialization of level set methodsJIA, Diye; HUANG, Fenggang; WEN, Xiaofang et al.International Conference on Signal Processing. 2004, pp 2676-2679, isbn 0-7803-8406-7, 4 p.Conference Paper

Processing nertwork models of energy/environment systemsCHINNECK, J. W.Computers & industrial engineering. 1995, Vol 28, Num 1, pp 179-189, issn 0360-8352Article

Proximity Graphs Inside Large Weighted GraphsABREGO, Bernardo M; FABILA-MONROY, Ruy; FERNANDEZ-MERCHANT, Silvia et al.Networks (New York, NY). 2013, Vol 61, Num 1, pp 29-39, issn 0028-3045, 11 p.Article

Generating fractals from Voronoi diagramsSHIRRIFF, K.Computers & graphics. 1993, Vol 17, Num 2, pp 165-167, issn 0097-8493Article

Wigner surmises and the two-dimensional Poisson-Voronoi tessellationMUCHE, Lutz; NIEMINEN, John M.Journal of mathematical physics. 2012, Vol 53, Num 10, issn 0022-2488, 103507.1-103507.7Article

A counterexample to a Voronoi constellation conjectureHEADLEY, P.IEEE transactions on information theory. 1991, Vol 37, Num 6, pp 1665-1666, issn 0018-9448Article

Multiresolution Remeshing Using Weighted Centroidal Voronoi DiagramLIN, Chao-Hung; YAN, Chung-Ren; HSU, Ji-Hsen et al.Lecture notes in computer science. 2006, pp 295-301, issn 0302-9743, isbn 3-540-34379-2, 7 p.Conference Paper

Java applets for the dynamic visualization of Voronoi diagramsICKING, Christian; KLEIN, Rolf; KÖLLNER, Peter et al.Computer science in perspective (essays dedicated to Thomas Ottmann). Lecture notes in computer science. 2003, pp 191-205, issn 0302-9743, isbn 3-540-00579-X, 15 p.Book Chapter

Structural texture segmentation using irregular pyramidLAM, S. W. C; IP, H. H. S.Pattern recognition letters. 1994, Vol 15, Num 7, pp 691-698, issn 0167-8655Article

Voronoi diagrams for polygon-offset distance functionsBAREQUET, G; DICKERSON, M. T; GOODRICH, M. T et al.Lecture notes in computer science. 1997, pp 200-209, issn 0302-9743, isbn 3-540-63307-3Conference Paper

A 15-colouring of 3-space omitting distance oneCOULSON, D.Discrete mathematics. 2002, Vol 256, Num 1-2, pp 83-90, issn 0012-365XArticle

A new algorithm for three-dimensional Voronoi tessellationTANEMURA, M; OGAWA, T; OGITA, N et al.Journal of computational physics (Print). 1983, Vol 51, Num 2, pp 191-207, issn 0021-9991Article

Approximations of set skeletonsPOPOV, A. T.SPIE proceedings series. 1998, pp 184-191, isbn 0-8194-2909-0Conference Paper

Théorie de Voronoï géométrique. Propriétés de finitude pour les familles de réseaux et analogues = Abstract (voronoï's geometric theory. finiteness properties for families of lattices and similar objects)BAVARD, Christophe.Bulletin de la Société Mathématique de France. 2005, Vol 133, Num 2, pp 205-257, issn 0037-9484, 53 p.Article

Statistics of pencil beams in Voronoi foamsSUBBARAO, M. U; SZALAY, A. S.The Astrophysical journal. 1992, Vol 391, Num 2, pp 483-493, issn 0004-637X, p.1Article

The structure of random foamKRAYNIK, Andrew M.Advanced engineering materials (Print). 2006, Vol 8, Num 9, issn 1438-1656, 771, 900-906 [8 p.]Conference Paper

Maximizing a Voronoi region: The convex caseDEHNE, Frank; KLEIN, Rolf; SEIDEL, Raimund et al.Lecture notes in computer science. 2002, pp 624-634, issn 0302-9743, isbn 3-540-00142-5, 11 p.Conference Paper

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