Pages that link to "Item:Q2096824"
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The following pages link to An approximate \(C^1\) multi-patch space for isogeometric analysis with a comparison to Nitsche's method (Q2096824):
Displaying 21 items.
- Analysis-suitable \(G^1\) multi-patch parametrizations for \(C^1\) isogeometric spaces (Q1634814) (← links)
- Isogeometric analysis with strong multipatch \(C^{1}\)-coupling (Q1644403) (← links)
- Isogeometric collocation on planar multi-patch domains (Q2175246) (← links)
- Strong multipatch \(C^1\)-coupling for isogeometric analysis on 2D and 3D domains (Q2179215) (← links)
- Isogeometric analysis with \(C^1\) hierarchical functions on planar two-patch geometries (Q2214433) (← links)
- Smooth multi-patch discretizations in isogeometric analysis (Q2235785) (← links)
- Construction of approximate \(C^1\) bases for isogeometric analysis on two-patch domains (Q2237742) (← links)
- A \(C^0 / G^1\) multiple patches connection method in isogeometric analysis (Q2282907) (← links)
- Multi-patch nonsingular isogeometric boundary element analysis in 3D (Q2632946) (← links)
- Almost-\(C^1\) splines: biquadratic splines on unstructured quadrilateral meshes and their application to fourth order problems (Q2679426) (← links)
- The weak substitution method - an application of the mortar method for patch coupling in NURBS-based isogeometric analysis (Q2952766) (← links)
- Isogeometric analysis for multi-patch structured Kirchhoff-Love shells (Q6097608) (← links)
- Extraction and application of super-smooth cubic B-splines over triangulations (Q6156161) (← links)
- Multigrid solvers for isogeometric discretizations of the second biharmonic problem (Q6166570) (← links)
- Adaptive isogeometric methods with C1 (truncated) hierarchical splines on planar multi-patch domains (Q6166571) (← links)
- Rational reparameterization of unstructured quadrilateral meshes for isogeometric analysis with optimal convergence (Q6184119) (← links)
- A comparison of smooth basis constructions for isogeometric analysis (Q6185213) (← links)
- An approximate $C^1$ multi-patch space for isogeometric analysis with a comparison to Nitsche's method (Q6390612) (← links)
- Adaptive methods with \(C^1\) splines for multi-patch surfaces and shells (Q6609802) (← links)
- Design through analysis (Q6610455) (← links)
- The immersed boundary conformal method for Kirchhoff-Love and Reissner-Mindlin shells (Q6641942) (← links)
