Pages that link to "Item:Q1625751"

The following pages link to Coiflets solutions for Föppl-von Kármán equations governing large deflection of a thin flat plate by a novel wavelet-homotopy approach (Q1625751):

Displaying 15 items.

• Wavelet solution for large deflection bending problems of thin rectangular plates (Q321193) (← links)
• Coiflet wavelet-homotopy solution of channel flow due to orthogonally moving porous walls governed by the Navier-Stokes equations (Q780494) (← links)
• The static WKB solution to catenary problems with large sag and bending stiffness (Q1717900) (← links)
• A biparametric perturbation method for the Föppl-von Kármán equations of bimodular thin plates (Q2014123) (← links)
• A homotopy-based wavelet approach for large deflection of a circular plate on nonlinear foundations with parameterized boundaries (Q2019603) (← links)
• Highly accurate wavelet-homotopy solutions for mixed convection hybrid nanofluid flow in an inclined square lid-driven cavity (Q2074106) (← links)
• A hierarchical wavelet method for nonlinear bending of materially and geometrically anisotropic thin plate (Q2212001) (← links)
• Nonlinear analysis for extreme large bending deflection of a rectangular plate on non-uniform elastic foundations (Q2308212) (← links)
• Novel wavelet-homotopy Galerkin technique for analysis of lid-driven cavity flow and heat transfer with non-uniform boundary conditions (Q2313444) (← links)
• Homotopy coiflets wavelet solution of electrohydrodynamic flows in a circular cylindrical conduit (Q2659542) (← links)
• Nonlinear vibration analysis of functionally graded flow pipelines under generalized boundary conditions based on homotopy analysis (Q2683345) (← links)
• A homotopy-based wavelet method for extreme large bending analysis of heterogeneous anisotropic plate with variable thickness on orthotropic foundation (Q6041518) (← links)
• Analytical solution for arbitrary large deflection of geometrically exact beams using the homotopy analysis method (Q6135600) (← links)
• Accurate coiflet wavelet solution of extended \((2+1)\)-dimensional Kadomtsev-Petviashvili equation using the novel wavelet-homotopy analysis approach (Q6177820) (← links)
• Application of wavelet methods in computational physics (Q6563167) (← links)