Pages that link to "Item:Q2426092"

The following pages link to Determination of a control parameter in a one-dimensional parabolic equation using the method of radial basis functions (Q2426092):

Displaying 10 items.

• Legendre multiscaling functions for solving the one-dimensional parabolic inverse problem (Q3644870) (← links)
• Cardinal Hermite interpolant multiscaling functions for solving a parabolic inverse problem (Q4633341) (← links)
• Collocation method based on shifted Chebyshev and radial basis functions with symmetric variable shape parameter for solving the parabolic inverse problem (Q4988531) (← links)
• A class of multistep numerical difference schemes applied in inverse heat conduction problem with a control parameter (Q4990709) (← links)
• A new method based on polynomials equipped with a parameter to solve two parabolic inverse problems with a nonlocal boundary condition (Q4991486) (← links)
• A local meshless procedure to determine the unknown control parameter in the multi-dimensional inverse problems (Q5035862) (← links)
• A Meshless Method for Numerical Solutions of Non-Homogeneous Differential Equation with Variable Delays (Q5077728) (← links)
• Ritz–Galerkin method for solving an inverse problem of parabolic equation with moving boundaries and integral condition (Q5227752) (← links)
• Direct collocation method for identifying the initial conditions in the inverse wave problem using radial basis functions (Q5240409) (← links)
• Numerical solution of homogeneous Smoluchowski's coagulation equation (Q5747744) (← links)