Pages that link to "Item:Q2267845"
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The following pages link to An efficient direct differentiation approach for sensitivity analysis of flexible multibody systems (Q2267845):
Displaying 25 items.
- A divide-and-conquer direct differentiation approach for multibody system sensitivity analysis (Q373945) (← links)
- Sensitivity analysis for multibody systems formulated on a Lie group (Q399918) (← links)
- Canonical ensemble simulation of biopolymers using a coarse-grained articulated generalized divide-and-conquer scheme (Q483854) (← links)
- First order sensitivity analysis of flexible multibody systems using absolute nodal coordinate formulation (Q666585) (← links)
- The sensitivity of multibody systems with respect to a design variable matrix (Q1338046) (← links)
- Modeling and sensitivity analysis of multibody systems using new solid, shell and beam elements (Q1365604) (← links)
- Sensitivity analysis of rigid-flexible multibody systems (Q1371393) (← links)
- Analytical fully-recursive sensitivity analysis for multibody dynamic chain systems (Q1610824) (← links)
- Optimization problem and efficient partitioning algorithm for transitions to finer-scale models in adaptive resolution simulation of articulated biopolymers (Q1698679) (← links)
- Extension of the divide-and-conquer algorithm for the efficient inverse dynamics analysis of multibody systems (Q1703041) (← links)
- Structural sensitivity analysis of flexible multibody systems modeled with the floating frame of reference approach using the adjoint variable method (Q2014687) (← links)
- Shape optimization directly from CAD: an isogeometric boundary element approach using T-splines (Q2309012) (← links)
- Geometrically exact beam equations in the adaptive DCA framework. I: Static example (Q2325833) (← links)
- A simplified force-based method for the linearization and sensitivity analysis of complex manipulation systems (Q2385804) (← links)
- Model transitions and optimization problem in multi-flexible-body systems: application to modeling molecular systems (Q2446013) (← links)
- Joint-coordinate adjoint method for optimal control of multibody systems (Q2683355) (← links)
- Symbolic Sensitivity Analysis of Multibody Systems (Q2856513) (← links)
- Efficient Coarse-Grained Molecular Simulations in the Multibody Dynamics Scheme (Q2856514) (← links)
- A hybrid direct-automatic differentiation method for the computation of independent sensitivities in multibody systems (Q2952614) (← links)
- Second-order sensitivity analysis of multibody systems described by differentialz/algebraic equations: adjoint variable approach (Q3518539) (← links)
- Sensitivity analysis for dynamic mechanical systems with finite rotations (Q3590350) (← links)
- Sensitivity analysis of flexible multibody systems using composite materials components (Q3614730) (← links)
- A semi-analytical approach to sensitivity analysis with flexible multibody dynamics of a morphing forward wing section (Q6097909) (← links)
- Hamiltonian direct differentiation and adjoint approaches for multibody system sensitivity analysis (Q6554336) (← links)
- Direct differentiation method for sensitivity analysis based on transfer matrix method for multibody systems (Q6555290) (← links)
