Interpolation of coefficients and transformation of the dependent variable in finite element methods for the non‐linear heat equation

Abstract: Error estimates are shown for some spatially discrete Galerkin finite element methods for a non-linear heat equation. The approximation schemes studied are based on the introduction of the enthalpy as a new dependent variable, and also on the application of the Kirchhoff transformation and on interpolation of the non-linear coefficients into standard Lagrangian finite element spaces.

“…We assume that the boundary and initial conditions are consistent. If f is constant, the existence and uniqueness of u follows immediately by applying the well-known Kirchhoff transformation (see [6], [8]). For non-constant f we can use the concept of pseudomonotone operators.…”

Fully Discrete Error Estimation by the Method of Lines for a Nonlinear Parabolic Problem

“…We assume that the boundary and initial conditions are consistent. If f is constant, the existence and uniqueness of u follows immediately by applying the well-known Kirchhoff transformation (see [6], [8]). For non-constant f we can use the concept of pseudomonotone operators.…”

Fully Discrete Error Estimation by the Method of Lines for a Nonlinear Parabolic Problem

“…The finite element method with interpolated coefficients was introduced and analyzed for semilinear parabolic problems in Zlamal et al [13]. Later Larsson-Thomee-Zhang studied the semidiscrete linear triangular finite element and obtained an error estimate [5]. Chen-Larsson-Zhang derived almost optimal order convergence on piecewise uniform triangular meshes by use of superconvergence techniques [2].…”

Superconvergence of a discontinuous finite element method for a nonlinear ordinary differential equation

“…In 1980, this method was introduced and analyzed firstly for the semilinear parabolic problems by Zlamal [46]. Later, Larson, Thomee and Zhang [22] studied the semidiscrete linear triangular FEM with interpolated coefficients, and Chen, Larson and Zhang [8] derived almost optimal order convergence on a uniform triangular mesh by using the piecewise linear finite element space and superconvergence techniques. Xiong and Chen [37][38][39] studied the superconvergence of triangular quadratic FEM for the nonlinear ordinary differential equation and the Q 1 -conforming rectangular FEM with interpolated coefficients for the semilinear elliptic problem, respectively.…”

P 1-Nonconforming Quadrilateral Finite Volume Methods for the Semilinear Elliptic Equations