The application of mortar methods in the framework of isogeometric analysis is investigated theoretically as well as numerically. For the Lagrange multiplier two choices of uniformly stable spaces are presented, both of them are spline spaces but of a different degree. In one case, we consider an equal order pairing for which a cross point modification based on a local degree reduction is required. In the other case, the degree of the dual space is reduced by two compared to the primal. This pairing is proven to be inf-sup stable without any necessary cross point modification. Several numerical examples confirm the theoretical results and illustrate additional aspects. © 2014 Elsevier B.V
The mortar finite element method allows the coupling of different discretizations across subregion b...
Higher Order Mortar Finite Elements with Dual Lagrange Multipliers presents the theories and applica...
This paper is concerned with the mortar finite element method for three spatial variables. The two m...
This paper discusses and analyzes two domain decomposition approaches for electromagnetic problems t...
The use of a common set of basis functions for design and analysis is the main paradigm of isogeomet...
International audienceThis paper introduces, analyzes and validates isogeometric mortar methods for ...
Isogeometric Analysis (IgA) is a technique for the discretization of Partial Differential Equations ...
International audienceIn recent years, isogeometric analysis (IGA) has received great attention in m...
Domain decomposition techniques provide a powerful tool for the numerical approximation of partial ...
Abstract. Domain decomposition techniques provide a flexible tool for the numerical approximation of...
In this work, existing finite element contact methods in the context of isogeometric analysis (IGA) ...
Within the general framework of isogeometric methods, collocation schemes have been recently propose...
In this contribution a mortar-type method for the coupling of non-conforming NURBS surface patches i...
We introduce isogeometric collocation methods based on generalized B-splines and we analyze their pe...
When applying isogeometric analysis to engineering problems, one often deals with multi-patch spline...
The mortar finite element method allows the coupling of different discretizations across subregion b...
Higher Order Mortar Finite Elements with Dual Lagrange Multipliers presents the theories and applica...
This paper is concerned with the mortar finite element method for three spatial variables. The two m...
This paper discusses and analyzes two domain decomposition approaches for electromagnetic problems t...
The use of a common set of basis functions for design and analysis is the main paradigm of isogeomet...
International audienceThis paper introduces, analyzes and validates isogeometric mortar methods for ...
Isogeometric Analysis (IgA) is a technique for the discretization of Partial Differential Equations ...
International audienceIn recent years, isogeometric analysis (IGA) has received great attention in m...
Domain decomposition techniques provide a powerful tool for the numerical approximation of partial ...
Abstract. Domain decomposition techniques provide a flexible tool for the numerical approximation of...
In this work, existing finite element contact methods in the context of isogeometric analysis (IGA) ...
Within the general framework of isogeometric methods, collocation schemes have been recently propose...
In this contribution a mortar-type method for the coupling of non-conforming NURBS surface patches i...
We introduce isogeometric collocation methods based on generalized B-splines and we analyze their pe...
When applying isogeometric analysis to engineering problems, one often deals with multi-patch spline...
The mortar finite element method allows the coupling of different discretizations across subregion b...
Higher Order Mortar Finite Elements with Dual Lagrange Multipliers presents the theories and applica...
This paper is concerned with the mortar finite element method for three spatial variables. The two m...