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7 results on '"Cho, Seonho"'

1. Shape Design Sensitivity Analysis of Dynamic Crack Propagation Problems using Peridynamics and Parallel Computation

Author

Kim Jae-Hyun and Cho Seonho

Subjects
Nonlinear system, Discretization, Peridynamics, Response analysis, Mathematical analysis, Finite difference method, Finite difference, Sensitivity (control systems), Parallel computing, Variable (mathematics), Mathematics
Abstract

Using the bond-based peridynamics and the parallel computation with binary decomposition, an adjoint shape design sensitivity analysis(DSA) method is developed for the dynamic crack propagation problems. The peridynamics includes the successive branching of cracks and employs the explicit scheme of time integration. The adjoint variable method is generally not suitable for path-dependent problems but employed since the path of response analysis is readily available. The accuracy of analytical design sensitivity is verified by comparing it with the finite difference one. The finite difference method is susceptible to the amount of design perturbations and could result in inaccurate design sensitivity for highly nonlinear peridynamics problems with respect to the design. It turns out that -continuous volume fraction is necessary for the accurate evaluation of shape design sensitivity in peridynamic discretization.

Published
2014

3. Isogeometric Shape Design Optimization of Power Flow Problems at High Frequencies

Author

Yoon Minho, Ha Seung-Hyun, and Cho Seonho

Subjects
Mathematical optimization, Finite difference, Applied mathematics, Basis function, Shape optimization, Sensitivity (control systems), Geometric modeling, Curvature, Normal, Finite element method, ComputingMethodologies_COMPUTERGRAPHICS, Mathematics
Abstract

Using an isogeometric approach, a continuum-based shape design optimization method is developed for steady state power flow problems at high frequencies. In case the isogeometric method is employed to the shape design optimization, the NURBS basis functions used in CAD geometric modeling are directly utilized to embed the exact geometry into the computational framework so that the design parameterization for shape optimization is much easier than that in the finite element method and consequently provides the enhanced smoothness of design perturbations. Thus, exact geometric models can be used in both the response and the shape sensitivity analyses, where normal vector and curvature are continuous over the whole design space so that enhanced shape sensitivity can be expected. Through numerical examples, the developed isogeometric sensitivity is compared with finite difference one to provide excellent agreement. Also, it turns out that the proposed method works very well in the shape optimization problems.

Published
2014

5. Density-based Topology Design Optimization ofPiezoelectric Crystal Resonators

Author

Ha YounDoh, Byun Taeuk, and Cho Seonho

Subjects
Materials science, business.industry, Acoustics, Finite difference method, Topology (electrical circuits), Structural engineering, Piezoelectricity, Physics::Fluid Dynamics, Vibration, Resonator, Normal mode, Plate theory, Sensitivity (control systems), business
Abstract

Design sensitivity analysis and topology design optimization for a piezoelectric crystal resonator are developed. The piezoelectric crystal resonator is deformed mechanically when subjected to electric charge on the electrodes, or vice versa. The Mindlin plate theory with higher-order interpolations along thickness direction is employed for analyzing the thickness-shear vibrations of the crystal resonator. Thin electrode plates are masked on the top and bottom layers of the crystal plate in order to enforce to vibrate it or detect electric signals. Although the electrode is very thin, its weight and shape could change the performance of the resonators. Thus, the design variables are the bulk material densities corresponding to the mass of masking electrode plates. An optimization problem is formulated to find the optimal topology of electrodes, maximizing the thickness-shear contribution of strain energy at the desired motion and restricting the allowable volume and area of masking plates. The necessary design gradients for the thickness- shear frequency(eigenvalue) and the corresponding mode shape(eigenvector) are computed very efficiently and accurately using the analytical design sensitivity analysis method using the eigenvector expansion concept. Through some demonstrative numerical examples, the design sensitivity analysis method is verified to be very efficient and accurate by comparing with the finite difference method. It is also observed that the optimal electrode design yields an improved mode shape and thickness-shear energy.

Published
2014

7. Level Set Based Shape Optimization of Linear Structures using Topological Derivatives

Author

Yoon Minho, Ha Seung-Hyun, Kim Min-Geun, and Cho Seonho

Subjects
Level set method, Level set, Topology optimization, Boundary (topology), Shape optimization, Topological derivative, Limit (mathematics), Descent direction, Topology, Mathematics
Abstract

Using a level set method and topological derivatives, a topological shape optimization method that is independent of an initial design is developed for linearly elastic structures. In the level set method, the initial domain is kept fixed and its boundary is represented by an implicit moving boundary embedded in the level set function, which facilitates to handle complicated topological shape changes. The “Hamilton-Jacobi(H-J)” equation and computationally robust numerical technique of “up-wind scheme” lead the initial implicit boundary to an optimal one according to the normal velocity field while minimizing the objective function of compliance and satisfying the constraint of allowable volume. Based on the asymptotic regularization concept, the topological derivative is considered as the limit of shape derivative as the radius of hole approaches to zero. The required velocity field to update the H-J equation is determined from the descent direction of Lagrangian derived from optimality conditions. It turns out that the initial holes are not required to get the optimal result since the developed method can create holes whenever and wherever necessary using indicators obtained from the topological derivatives. It is demonstrated that the proper choice of control parameters for nucleation is crucial for efficient optimization process.

Published
2014

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