Stanislaw Lewanowicz

Orcid: 0000-0002-6342-2257

Affiliations:
  • University of Wroclaw, Poland


According to our database1, Stanislaw Lewanowicz authored at least 16 papers between 2000 and 2017.

Collaborative distances:
  • Dijkstra number2 of five.
  • Erdős number3 of five.

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Bibliography

2017
Constrained approximation of rational triangular Bézier surfaces by polynomial triangular Bézier surfaces.
Numer. Algorithms, 2017

Degree reduction of composite Bézier curves.
Appl. Math. Comput., 2017

Bézier form of dual bivariate Bernstein polynomials.
Adv. Comput. Math., 2017

2016
G k, l -constrained multi-degree reduction of Bézier curves.
Numer. Algorithms, 2016

2015
Efficient merging of multiple segments of Bézier curves.
Appl. Math. Comput., 2015

2013
Structure relations for the bivariate big q-Jacobi polynomials.
Appl. Math. Comput., 2013

2012
Polynomial approximation of rational Bézier curves with constraints.
Numer. Algorithms, 2012

2011
Bézier representation of the constrained dual Bernstein polynomials.
Appl. Math. Comput., 2011

Multi-degree reduction of tensor product Bézier surfaces with general boundary constraints.
Appl. Math. Comput., 2011

2010
Constrained multi-degree reduction of triangular Bézier surfaces using dual Bernstein polynomials.
J. Comput. Appl. Math., 2010

Two-variable orthogonal polynomials of big q-Jacobi type.
J. Comput. Appl. Math., 2010

2009
Multi-degree reduction of Bézier curves with constraints, using dual Bernstein basis polynomials.
Comput. Aided Geom. Des., 2009

2008
Multivariate generalized Bernstein polynomials: identities for orthogonal polynomials of two variables.
Numer. Algorithms, 2008

2006
Dual generalized Bernstein basis.
J. Approx. Theory, 2006

2004
Recurrence Relations for the Coefficients in Series Expansions with Respect to Semi-Classical Orthogonal Polynomials.
Numer. Algorithms, 2004

2000
Recurrence relations for the coefficients of the Fourier series expansions with respect to q-classical orthogonal polynomials.
Numer. Algorithms, 2000


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