Softbox
Partial Differential Equation Toolbox
Solve partial differential equations using finite element methods
Producator: MathWorks | Platforma: Windows | Finante & Contabilitate
The Partial Differential Equation Toolbox product contains tools for the study and solution of partial differential equations (PDEs) in two-space dimensions (2-D) and time. A set of command-line functions and a graphical user interface let you preprocess, solve, and postprocess generic 2-D PDEs for a broad range of engineering and science applications.
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Link producator: MathWorks
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| Part number | Denumire licenta | Platforma | Licenta | RON cu TVA | Cantitate | Cos |
|---|---|---|---|---|---|---|
| New - Partial Differential Equation Toolbox | ||||||
| MAT-DIFFEQ | Partial Differential Equation Toolbox |
|
1 User | 1.666,56 RON | ||
| MAT-DIFFEQ-C | Partial Differential Equation Toolbox |
|
1 User | 5.713,92 RON | ||
| Part number | Denumire licenta | Platforma | Licenta | RON cu TVA | Cantitate | Cos |
|---|---|---|---|---|---|---|
| New - Partial Differential Equation Toolbox | ||||||
| MAT-DIFFEQ-ACD | Partial Differential Equation Toolbox |
|
1 User | 476,16 RON | ||
| MAT-DIFFEQ-C-ACD | Partial Differential Equation Toolbox |
|
1 User | 714,24 RON | ||
Prezentare Partial Differential Equation Toolbox
The Partial Differential Equation (PDE) Toolbox contains tools for the study and solution of PDEs in two space dimensions (2-D) and time, using the finite element method (FEM). Its command line functions and graphical user interface can be used for mathematical modeling of PDEs in a broad range of engineering and science applications, including structural mechanics, electromagnetics, heat transfer, and diffusion.
Key Features
• Complete GUI for pre- and post-processing 2-D PDEs
• Automatic and adaptive meshing
• Geometry creation using constructive solid geometry (CSG) paradigm
• Boundary condition specification: Dirichlet, generalized Neumann, and mixed
• Flexible coefficient and PDE problem specification using MATLAB syntax
• Fully automated mesh generation and refinement
• Nonlinear and adaptive solvers handle systems with multiple dependent variables
• Simultaneous visualization of multiple solution properties, FEM-mesh overlays, and animation