Convergence of Fully Discrete Implicit and Semi-implicit Approximations of Singular Parabolic Equations

The article addresses the convergence of implicit and semi-implicit, fully discrete approximations of a class of nonlinear parabolic evolution problems. Such schemes are popular in the numerical solution of evolutions defined with the $p$-Laplace operator since the latter lead to linear systems of equations in the time steps. The semi-implicit treatment of the operator requires introducing a regularization parameter that has to be suitably related to other discretization parameters. To avoid restrictive, unpractical conditions, a careful convergence analysis has to be carried out. The arguments presented in this article show that convergence holds under a moderate condition that relates the step size to the regularization parameter but which is independent of the spatial resolution.

[1]  L. R. Scott,et al.  The Mathematical Theory of Finite Element Methods , 1994 .

[2]  Bernd Eggers,et al.  Nonlinear Functional Analysis And Its Applications , 2016 .

[3]  Andreas Prohl,et al.  Rate of convergence of regularization procedures and finite element approximations for the total variation flow , 2005, Numerische Mathematik.

[4]  CARSTEN EBMEYER,et al.  Optimal Convergence for the Implicit Space-Time Discretization of Parabolic Systems with p-Structure , 2007, SIAM J. Numer. Anal..

[5]  R. Showalter Monotone operators in Banach space and nonlinear partial differential equations , 1996 .

[6]  M. Ruzicka,et al.  Non-Newtonian fluids and function spaces , 2007 .

[7]  T. Roubíček Nonlinear partial differential equations with applications , 2005 .

[8]  Giuseppe Savare',et al.  A posteriori error estimates for variable time-step discretizations of nonlinear evolution equations † , 2000 .

[9]  M. Růžička,et al.  Note on the existence theory for evolution equations with pseudo-monotone operators , 2015, 1510.00151.

[10]  Ricardo H. Nochetto,et al.  Unconditional Stability of Semi-Implicit Discretizations of Singular Flows , 2017, SIAM J. Numer. Anal..

[11]  A remark on the existence proof of Hopf's solution of the Navier-Stokes Equation , 1986 .

[12]  V. Mustonen,et al.  A strongly nonlinear parabolic initial boundary value problem , 1987 .

[13]  Christian Kreuzer,et al.  Linear Convergence of an Adaptive Finite Element Method for the p-Laplacian Equation , 2008, SIAM J. Numer. Anal..

[14]  Giuseppe Savare',et al.  A posteriori error estimates for variable time-step discretizations of nonlinear evolution equations † , 2000 .

[15]  H. Gajewski,et al.  Nichtlineare Operatorgleichungen und Operatordifferentialgleichungen , 1974 .

[16]  J. Rulla,et al.  Error analysis for implicit approximations to solutions to Cauchy problems , 1996 .

[17]  Lars Diening,et al.  Fractional estimates for non-differentiable elliptic systems with general growth , 2008 .