APA 6th Edition Velichová, D. (1997). Geometric Modelling of Hyperpatches. KoG, 2 (2), 9-13. Preuzeto s https://hrcak.srce.hr/166341
MLA 8th Edition Velichová, Daniela. "Geometric Modelling of Hyperpatches." KoG, vol. 2, br. 2, 1997, str. 9-13. https://hrcak.srce.hr/166341. Citirano 21.01.2020.
Chicago 17th Edition Velichová, Daniela. "Geometric Modelling of Hyperpatches." KoG 2, br. 2 (1997): 9-13. https://hrcak.srce.hr/166341
Harvard Velichová, D. (1997). 'Geometric Modelling of Hyperpatches', KoG, 2(2), str. 9-13. Preuzeto s: https://hrcak.srce.hr/166341 (Datum pristupa: 21.01.2020.)
Vancouver Velichová D. Geometric Modelling of Hyperpatches. KoG [Internet]. 1997 [pristupljeno 21.01.2020.];2(2):9-13. Dostupno na: https://hrcak.srce.hr/166341
IEEE D. Velichová, "Geometric Modelling of Hyperpatches", KoG, vol.2, br. 2, str. 9-13, 1997. [Online]. Dostupno na: https://hrcak.srce.hr/166341. [Citirano: 21.01.2020.]
Sažetak The paper deals with the modelling of solids (hyperpatches) on the basis of their creative laws. Creative representation of a solid enables to modell also solids with "curve-like" edges, not only solids with the polyhedral boundary as in the boundary representation method. There is provided also the possibility to control a non-homogeneous distribution of the interior points of a solid created as an interpolated figure. Basic notions such as a solid cell, an isoparametric curve segment and an isoparametric surface patch, or tangent space and density vector in a solid point are described and their relevance to the intrinsic geometric properties of the solid is discussed. Composite solid modelling problems on adjoining of the elementar solid cells are mentioned.