AbstractSpaces of rational splines of maximal smoothness are considered which are constructed from certain rational functions with prescribed poles. For them a basis of splines having minimal compact supports was constructed in the literature. These functions which are called rational B-splines are obtained by solving certain linear equations with a block matrix depending on a parameter ε>0. It is shown that in the limit ε→0 they tend to certain polynomial B-splines
We consider a cubic spline space defined over a triangulation with Powell-Sabin refinement. The spac...
Abstract. It is proved that, among all nonnegative bases of its space, the B-spline basis is optimal...
A spline is a smooth piecewise polynomial function defined on a subdivision of R^n. In this project,...
Bakalaura darbā tiek apskatīti kubiskā Ermita splaina, divu veidu kubisko C2 klases splainu, racionā...
AbstractA function s ϵ Cn[α,β] is called a rational spline, if s(n) is positive, and if there exist ...
none3siA construction of spline spaces suitable for representing smooth parametric surfaces of arbit...
B-splines of polynomial order d are the unique functions that are globally in C^(d-2) and piecewise ...
AbstractCertain spaces of generalized splines are considered which are constructed by pasting togeth...
We construct a suitable B-spline representation for a family of bivariate spline functions with smoo...
In this paper we prove that there exists a unique positive symmetrical univariate B-spline with mini...
Tchebycheffian splines are smooth piecewise functions where the different pieces are drawn from exte...
International audienceBy piecewise Chebyshevian splines we mean splines with pieces taken from diff...
The space of C1 cubic Clough-Tocher splines is a classical finite element approximation space over t...
This chapter presents an overview of polynomial spline theory, with special emphasis on the B-spline...
AbstractFor given monotone data we propose the construction of a histopolating linear/linear rationa...
We consider a cubic spline space defined over a triangulation with Powell-Sabin refinement. The spac...
Abstract. It is proved that, among all nonnegative bases of its space, the B-spline basis is optimal...
A spline is a smooth piecewise polynomial function defined on a subdivision of R^n. In this project,...
Bakalaura darbā tiek apskatīti kubiskā Ermita splaina, divu veidu kubisko C2 klases splainu, racionā...
AbstractA function s ϵ Cn[α,β] is called a rational spline, if s(n) is positive, and if there exist ...
none3siA construction of spline spaces suitable for representing smooth parametric surfaces of arbit...
B-splines of polynomial order d are the unique functions that are globally in C^(d-2) and piecewise ...
AbstractCertain spaces of generalized splines are considered which are constructed by pasting togeth...
We construct a suitable B-spline representation for a family of bivariate spline functions with smoo...
In this paper we prove that there exists a unique positive symmetrical univariate B-spline with mini...
Tchebycheffian splines are smooth piecewise functions where the different pieces are drawn from exte...
International audienceBy piecewise Chebyshevian splines we mean splines with pieces taken from diff...
The space of C1 cubic Clough-Tocher splines is a classical finite element approximation space over t...
This chapter presents an overview of polynomial spline theory, with special emphasis on the B-spline...
AbstractFor given monotone data we propose the construction of a histopolating linear/linear rationa...
We consider a cubic spline space defined over a triangulation with Powell-Sabin refinement. The spac...
Abstract. It is proved that, among all nonnegative bases of its space, the B-spline basis is optimal...
A spline is a smooth piecewise polynomial function defined on a subdivision of R^n. In this project,...
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