Pages that link to "Item:Q5745522"

The following pages link to Satisfier function in Ritz–Galerkin method for the identification of a time-dependent diffusivity (Q5745522):

Displaying 18 items.

• Ritz-least squares method for finding a control parameter in a one-dimensional parabolic inverse problem (Q350344) (← links)
• Identification of the time-dependent conductivity of an inhomogeneous diffusive material (Q668639) (← links)
• Multiple time-dependent coefficient identification thermal problems with a free boundary (Q891687) (← links)
• Numerical approach of Fokker-Planck equation with Caputo-Fabrizio fractional derivative using Ritz approximation (Q1748189) (← links)
• Two-dimensional Bernoulli wavelets with satisfier function in the Ritz-Galerkin method for the time fractional diffusion-wave equation with damping (Q1992042) (← links)
• Determination of a time-dependent diffusivity from nonlocal conditions (Q2511149) (← links)
• Application of the Ritz-Galerkin method for recovering the spacewise-coefficients in the wave equation (Q2629449) (← links)
• Numerical solution of variable-order differential equations via the Ritz-approximation method by shifted Legendre polynomials (Q2669826) (← links)
• An inverse problem of finding the time-dependent diffusion coefficient from an integral condition (Q2800508) (← links)
• Determination of space–time-dependent heat source in a parabolic inverse problem via the Ritz–Galerkin technique (Q2948540) (← links)
• A numerical method for solving a nonlinear 2-D optimal control problem with the classical diffusion equation (Q2978046) (← links)
• Numerical solution of a class of two-dimensional quadratic optimal control problems by using Ritz method (Q3187835) (← links)
• The time-dependent diffusion equation: An inverse diffusivity problem (Q3390739) (← links)
• (Q5094417) (← links)
• The Use of the Ritz Method and Laplace Transform for Solving 2D Fractional‐Order Optimal Control Problems Described by the Roesser Model (Q5215165) (← links)
• A homogenization method to solve inverse Cauchy–Stefan problems for recovering non-smooth moving boundary, heat flux and initial value (Q5861306) (← links)
• Inverse heat conduction problem with a nonlinear source term by a local strong form of meshless technique based on radial point interpolation method (Q6080393) (← links)
• (Q6098191) (← links)