AbstractIn this paper we construct C1 continuous piecewise quadratic hierarchical bases on Powell–Sabin triangulations of arbitrary polygonal domains in R2. Our bases are of Lagrange type instead of the usual Hermite type and under some weak regularity assumptions on the underlying triangulations we prove that they form strongly stable Riesz bases for the Sobolev spaces Hs(Ω) with s∈(1,5/2). Especially the case s=2 is of interest, because we can use the corresponding hierarchical basis for preconditioning fourth-order elliptic equations leading to uniformly well-conditioned stiffness matrices. Compared to the hierarchical Riesz bases by Davydov and Stevenson (Hierarchical Riesz bases for Hs(Ω), 1<s<5/2. Constructive Approximation, to appear...
For the space of \(C^3\) quintics on the Powell–Sabin 12-split of a triangle, we determine explicitl...
AbstractSeveral approaches to solving elliptic problems numerically are based on hierarchical Riesz ...
peer reviewedIn this paper, we present a particular family of spline wavelets constructed from the ...
In this paper we construct C¹ continuous piecewise quadratic hierarchical bases on Powell-Sabin tria...
AbstractIn this paper we construct C1 continuous piecewise quadratic hierarchical bases on Powell–Sa...
On arbitrary polygonal domains $Omega subset RR^2$, we construct $C^1$ hierarchical Riesz bases for ...
In this thesis, we investigate the hierarchical bases of C¹ quadratic spline functions on Powell-Sab...
Hierarchical Powell-Sabin splines are C1-continuous piecewise quadratic polynomials defined on a hie...
AbstractIn this note we derive estimates for the condition numbers of stiffness matrices relative to...
Recently we developped multiscale spaces of C^1 piecewise quadratic polynomials relative to arbitrar...
In this paper we propose a natural way to extend a bivariate Powell–Sabin (PS) B-spline basis on a p...
Abstract. Recently we developed multiscale spaces of C1 piecewise quadratic polynomials on the Powel...
Abstract. Recently we developed multiscale spaces of piecewise quadratic polynomials on the Powell...
We show how to construct a stable hierarchical basis for piecewise quadratic C^1 continuous splines ...
We investigate Riesz bases of wavelets in Sobolev spaces and their applications to numerical solutio...
For the space of \(C^3\) quintics on the Powell–Sabin 12-split of a triangle, we determine explicitl...
AbstractSeveral approaches to solving elliptic problems numerically are based on hierarchical Riesz ...
peer reviewedIn this paper, we present a particular family of spline wavelets constructed from the ...
In this paper we construct C¹ continuous piecewise quadratic hierarchical bases on Powell-Sabin tria...
AbstractIn this paper we construct C1 continuous piecewise quadratic hierarchical bases on Powell–Sa...
On arbitrary polygonal domains $Omega subset RR^2$, we construct $C^1$ hierarchical Riesz bases for ...
In this thesis, we investigate the hierarchical bases of C¹ quadratic spline functions on Powell-Sab...
Hierarchical Powell-Sabin splines are C1-continuous piecewise quadratic polynomials defined on a hie...
AbstractIn this note we derive estimates for the condition numbers of stiffness matrices relative to...
Recently we developped multiscale spaces of C^1 piecewise quadratic polynomials relative to arbitrar...
In this paper we propose a natural way to extend a bivariate Powell–Sabin (PS) B-spline basis on a p...
Abstract. Recently we developed multiscale spaces of C1 piecewise quadratic polynomials on the Powel...
Abstract. Recently we developed multiscale spaces of piecewise quadratic polynomials on the Powell...
We show how to construct a stable hierarchical basis for piecewise quadratic C^1 continuous splines ...
We investigate Riesz bases of wavelets in Sobolev spaces and their applications to numerical solutio...
For the space of \(C^3\) quintics on the Powell–Sabin 12-split of a triangle, we determine explicitl...
AbstractSeveral approaches to solving elliptic problems numerically are based on hierarchical Riesz ...
peer reviewedIn this paper, we present a particular family of spline wavelets constructed from the ...