AbstractLet Δ be an arbitrary regular triangulation of a simply connected compact polygonal domain Ω⊂R2 and let Sq1(Δ) denote the space of bivariate polynomial splines of degree q and smoothness 1 with respect to Δ. We develop an algorithm for constructing point sets admissible for Lagrange interpolation by Sq1(Δ) if q⩾4. In the case q=4 it may be necessary to slightly modify Δ, but only if exceptional constellations of triangles occur. Hermite interpolation schemes are obtained as limits of the Lagrange interpolation sets
AbstractWe describe a local Lagrange interpolation method using cubic (i.e. non-tensor product) C1 s...
We review recently developed methods of constructing Lagrange and Hermite interpolation sets for biv...
AbstractGiven a triangulation Δ of a polygonal domain, we find a refinemet of Δ of Δ by choosing μt ...
Let Δ be an arbitrary regular triangulation of a simply connected compact polygonal domain ]...
AbstractLet Δ be an arbitrary regular triangulation of a simply connected compact polygonal domain Ω...
AbstractWe describe a general method for constructing triangulations Δ which are suitable for interp...
We describe a general method for constructing triangulations Δ which are suitable for interpola...
AbstractIn [G. Nürnberger and Th. Riessinger,Numer. Math.71(1995), 91–119], we developed an algorith...
We construct Hermite interpolation sets for bivariate spline spaces of arbitrary degree and smoothne...
Let be a triangulation of some polygonal domain f c R2 and let S9 (A) denote the space of all bivari...
We give a survey of recent methods to construct Lagrange interpolation points for splines of arbitra...
AbstractWe develop a local Lagrange interpolation scheme for quartic C1 splines on triangulations. G...
Let Δ be a triangulation of some polygonal domain Δ ⊂ R² and let Srq(Δ) denote ...
AbstractWe describe an algorithm for constructing a Lagrange interpolation pair based on C1 cubic sp...
AbstractLet S31() be the bivariate C1-cubic spline space over a triangulated quadrangulation . In th...
AbstractWe describe a local Lagrange interpolation method using cubic (i.e. non-tensor product) C1 s...
We review recently developed methods of constructing Lagrange and Hermite interpolation sets for biv...
AbstractGiven a triangulation Δ of a polygonal domain, we find a refinemet of Δ of Δ by choosing μt ...
Let Δ be an arbitrary regular triangulation of a simply connected compact polygonal domain ]...
AbstractLet Δ be an arbitrary regular triangulation of a simply connected compact polygonal domain Ω...
AbstractWe describe a general method for constructing triangulations Δ which are suitable for interp...
We describe a general method for constructing triangulations Δ which are suitable for interpola...
AbstractIn [G. Nürnberger and Th. Riessinger,Numer. Math.71(1995), 91–119], we developed an algorith...
We construct Hermite interpolation sets for bivariate spline spaces of arbitrary degree and smoothne...
Let be a triangulation of some polygonal domain f c R2 and let S9 (A) denote the space of all bivari...
We give a survey of recent methods to construct Lagrange interpolation points for splines of arbitra...
AbstractWe develop a local Lagrange interpolation scheme for quartic C1 splines on triangulations. G...
Let Δ be a triangulation of some polygonal domain Δ ⊂ R² and let Srq(Δ) denote ...
AbstractWe describe an algorithm for constructing a Lagrange interpolation pair based on C1 cubic sp...
AbstractLet S31() be the bivariate C1-cubic spline space over a triangulated quadrangulation . In th...
AbstractWe describe a local Lagrange interpolation method using cubic (i.e. non-tensor product) C1 s...
We review recently developed methods of constructing Lagrange and Hermite interpolation sets for biv...
AbstractGiven a triangulation Δ of a polygonal domain, we find a refinemet of Δ of Δ by choosing μt ...