Trimming consists of cutting away parts of a geometric domain, without reconstructing a global parametrization (meshing). It is a widely used operation in computer-aided design, which generates meshes that are unfitted with the described physical object. This paper develops an adaptive mesh refinement strategy on trimmed geometries in the context of hierarchical B-spline-based isogeometric analysis. A residual a posteriori estimator of the energy norm of the numerical approximation error is derived, in the context of the Poisson equation. The estimator is proven to be reliable, independently of the number of hierarchical levels and of the way the trimmed boundaries cut the underlying mesh. Numerical experiments are performed to validate the...
The construction of suitable mesh configurations for spline models that provide local refinement cap...
We consider an adaptive isogeometric method (AIGM) based on (truncated) hierarchical B-splines and p...
We consider isogeometric discretizations of the Poisson model problem, focusing on high polynomial d...
The focus of this work is on the development of an error-driven isogeometric framework, capable of a...
Highlights • A posteriori error estimation methodology for adaptive isogeometric analysis using LR B...
In this thesis we will explore the possibilities of making a finite element solver for partial diffe...
Removing geometrical details from a complex domain is a classical operation in computer aided design...
In this work, a method of goal-adaptive Isogeometric Analysis is proposed. We combine goal-oriented ...
n this article we propose two simple a posteriori error estimators for solving second order elliptic...
We propose an adaptive mesh refinement strategy for immersed isogeometric analysis, with application...
We present two adaptive refinement techniques, namely adaptive local refinement and adaptive hierarc...
This paper presents an approach to generalize the concept of isogeometric analysis (IGA) by allowing...
Isogeometric analysis based on NURBS (Non-Uniform Rational B-Splines) as basis functions preserves t...
This paper presents an approach to generalize the concept of isogeometric analysis by allowing diffe...
In any method aimed at solving a boundary value problem using isogeometric analysis, it is imperativ...
The construction of suitable mesh configurations for spline models that provide local refinement cap...
We consider an adaptive isogeometric method (AIGM) based on (truncated) hierarchical B-splines and p...
We consider isogeometric discretizations of the Poisson model problem, focusing on high polynomial d...
The focus of this work is on the development of an error-driven isogeometric framework, capable of a...
Highlights • A posteriori error estimation methodology for adaptive isogeometric analysis using LR B...
In this thesis we will explore the possibilities of making a finite element solver for partial diffe...
Removing geometrical details from a complex domain is a classical operation in computer aided design...
In this work, a method of goal-adaptive Isogeometric Analysis is proposed. We combine goal-oriented ...
n this article we propose two simple a posteriori error estimators for solving second order elliptic...
We propose an adaptive mesh refinement strategy for immersed isogeometric analysis, with application...
We present two adaptive refinement techniques, namely adaptive local refinement and adaptive hierarc...
This paper presents an approach to generalize the concept of isogeometric analysis (IGA) by allowing...
Isogeometric analysis based on NURBS (Non-Uniform Rational B-Splines) as basis functions preserves t...
This paper presents an approach to generalize the concept of isogeometric analysis by allowing diffe...
In any method aimed at solving a boundary value problem using isogeometric analysis, it is imperativ...
The construction of suitable mesh configurations for spline models that provide local refinement cap...
We consider an adaptive isogeometric method (AIGM) based on (truncated) hierarchical B-splines and p...
We consider isogeometric discretizations of the Poisson model problem, focusing on high polynomial d...