Název:	Approximate Reconstructions of Perturbed Rational Planar Cubics
Autoři:	Bizzarri, Michal Lávička, Miroslav Vršek, Jan
Citace zdrojového dokumentu:	BIZZARRI, M., LÁVIČKA, M., VRŠEK, J. Approximate Reconstructions of Perturbed Rational Planar Cubics. In: Advanced Methods for Geometric Modeling and Numerical Simulation. Cham: Springer,, 2019. s. 23-41. ISBN 978-3-030-27330-9 , ISSN 2281-518X.
Datum vydání:	2019
Nakladatel:	Springer
Typ dokumentu:	postprint postprint
URI:	2-s2.0-85073156042 http://hdl.handle.net/11025/35970
ISBN:	978-3-030-27330-9
ISSN:	2281-518X
Klíčová slova v dalším jazyce:	Approximate reconstructions;perturbed algebraic curves;algorithm
Abstrakt v dalším jazyce:	This paper is devoted to a problem from geometric modelling and related applications when exact symbolic computations are sometimes used also on objects given inexactly, i.e., when it is not adequately respected that numerical or input errors may significantly influence fundamental properties of considered algebraic varieties, including e.g. their rationality. We formulate a simple algorithm for an approximation of a non-rational planar cubic which is assumed to be a perturbation of some unknown rational planar cubic. The input curve is given by a perturbed polynomial or by perturbed points sampled from the original curve. The algorithm consists of two main parts. First, we suggest geometric methods for the estimation of a singular point of the original curve. Then we select from the six-dimensional subspace of all rational cubics with a given singular point a suitable one that may also satisfy some further criteria. The designed method is presented on several commented examples.
Práva:	Plný text je přístupný v rámci univerzity přihlášeným uživatelům. © Springer
Vyskytuje se v kolekcích:	Postprinty / Postprints (KMA) OBD

Všechny záznamy v DSpace jsou chráněny autorskými právy, všechna práva vyhrazena.