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The following pages link to Numerical approximation of the one-dimensional inverse Cauchy–Stefan problem using a method of fundamental solutions (Q3111151):

Displaying 21 items.

Application of meshfree methods for solving the inverse one-dimensional Stefan problem (Q463606) (← links)
A comparative study on applying the method of fundamental solutions to the backward heat conduction problem (Q646103) (← links)
A method of fundamental solutions for the one-dimensional inverse Stefan problem (Q646199) (← links)
Boundary determination of the inverse heat conduction problem in one and two dimensions via the collocation method based on the satisfier functions (Q1787765) (← links)
Numerical approximation of the one-dimensional inverse Cauchy-Stefan problem using heat polynomials methods (Q2158529) (← links)
An adaptive boundary algorithm for the reconstruction of boundary and initial data using the method of fundamental solutions for the inverse Cauchy-Stefan problem (Q2244001) (← links)
Solution of the one-phase inverse Stefan problem by using the homotopy analysis method (Q2285801) (← links)
Estimation of the time-dependent body force needed to exert on a membrane to reach a desired state at the final time (Q2324361) (← links)
Ritz–Galerkin method for solving an inverse heat conduction problem with a nonlinear source term via Bernstein multi-scaling functions and cubic B-spline functions (Q2872698) (← links)
Determination of space–time-dependent heat source in a parabolic inverse problem via the Ritz–Galerkin technique (Q2948540) (← links)
Efficient numerical methods for boundary data and right‐hand side reconstructions in elliptic partial differential equations (Q3459249) (← links)
A method of fundamental solutions for radially symmetric and axisymmetric backward heat conduction problems (Q4903508) (← links)
Application of the method of fundamental solutions for designing the optimal shape in heat transfer (Q4993688) (← links)
Solution of Cauchy Problems by the Multiple Scale Method of Particular Solutions Using Polynomial Basis Functions (Q5160520) (← links)
A meshless method for an inverse two-phase one-dimensional linear Stefan problem (Q5300375) (← links)
The method of fundamental solutions for the two-dimensional inverse Stefan problem (Q5496490) (← links)
Solutions of boundary detection problem for modified Helmholtz equation by Trefftz method (Q5496501) (← links)
A homogenization method to solve inverse Cauchy–Stefan problems for recovering non-smooth moving boundary, heat flux and initial value (Q5861306) (← links)
A heat polynomial method for inverse cylindrical one-phase Stefan problems (Q5861352) (← links)
(Q6098191) (← links)
Analytical solution of Stefan-type problems (Q6583080) (← links)