In this study involving advanced fluid flow codes, an incremental iterative formulation (also known as the delta or correction form) together with the well-known spatially-split approximate factorization algorithm, is presented for solving the very large sparse systems of linear equations which are associated with aerodynamic sensitivity analysis. For smaller 2D problems, a direct method can be applied to solve these linear equations in either the standard or the incremental form, in which case the two are equivalent. Iterative methods are needed for larger 2D and future 3D applications, however, because direct methods require much more computer memory than is currently available. Iterative methods for solving these equations in the standar...
A continuous adjoint approach for obtaining sensitivity derivatives on unstructured grids is develop...
This paper presents a brief overview of some of the more recent advances in steady aerodynamic shape...
Automatic differentiation (AD) is a powerful computational method that provides for computing exact ...
An incremental iterative formulation together with the well-known spatially split approximate-factor...
In this preliminary study involving advanced computational fluid dynamic (CFD) codes, an incremental...
In this study which involves advanced fluid-flow codes, an incremental iterative formulation (also k...
The straightforward automatic-differentiation and the hand-differentiated incremental iterative meth...
This paper solves an 'incremental' form of the sensitivity equations derived by differentiating the ...
A new and efficient procedure for aerodynamic shape optimization is presented. The salient lineament...
Sensitivity analysis is a key element in a design optimization procedure. Although the related theor...
A hybrid automatic differentiation/incremental iterative method was implemented in the general purpo...
Aerodynamic sensitivity analysis codes are developed via the hand-differentiation using a direct dif...
No specific solutions are offered, nor verified by applications, for its subject problem which is se...
A multiblock, discrete sensitivity analysis method is used to couple a direct optimization method an...
AbstractA discrete semianalytical sensitivity analysis procedure has been developed for calculating ...
A continuous adjoint approach for obtaining sensitivity derivatives on unstructured grids is develop...
This paper presents a brief overview of some of the more recent advances in steady aerodynamic shape...
Automatic differentiation (AD) is a powerful computational method that provides for computing exact ...
An incremental iterative formulation together with the well-known spatially split approximate-factor...
In this preliminary study involving advanced computational fluid dynamic (CFD) codes, an incremental...
In this study which involves advanced fluid-flow codes, an incremental iterative formulation (also k...
The straightforward automatic-differentiation and the hand-differentiated incremental iterative meth...
This paper solves an 'incremental' form of the sensitivity equations derived by differentiating the ...
A new and efficient procedure for aerodynamic shape optimization is presented. The salient lineament...
Sensitivity analysis is a key element in a design optimization procedure. Although the related theor...
A hybrid automatic differentiation/incremental iterative method was implemented in the general purpo...
Aerodynamic sensitivity analysis codes are developed via the hand-differentiation using a direct dif...
No specific solutions are offered, nor verified by applications, for its subject problem which is se...
A multiblock, discrete sensitivity analysis method is used to couple a direct optimization method an...
AbstractA discrete semianalytical sensitivity analysis procedure has been developed for calculating ...
A continuous adjoint approach for obtaining sensitivity derivatives on unstructured grids is develop...
This paper presents a brief overview of some of the more recent advances in steady aerodynamic shape...
Automatic differentiation (AD) is a powerful computational method that provides for computing exact ...