Pages that link to "Item:Q639987"
From MaRDI portal
The following pages link to A cascadic multigrid method for a kind of semilinear elliptic problem (Q639987):
Displaying 17 items.
- A multigrid method for weakly nonlinear elliptic equations of the second order (Q647838) (← links)
- On the convergence of a cascadic multigrid method for semilinear elliptic problem (Q702657) (← links)
- The cascadic multigrid method for elliptic problems (Q1358121) (← links)
- A cascadic multigrid algorithm for semilinear indefinite elliptic problems (Q1581114) (← links)
- A cascadic multigrid algorithm for semilinear elliptic problems (Q1590741) (← links)
- A new extrapolation cascadic multigrid method for three dimensional elliptic boundary value problems (Q1693921) (← links)
- On the convergence of an extrapolation cascadic multigrid method for elliptic problems (Q1705011) (← links)
- A modulus-based cascadic multigrid method for elliptic variational inequality problems (Q2159435) (← links)
- An accurate a posteriori error estimator for semilinear Neumann problem and its applications (Q2286056) (← links)
- A type of cascadic multigrid method for coupled semilinear elliptic equations (Q2290914) (← links)
- An economical cascadic multigrid method for the weak Galerkin finite element approximation of second order elliptic problems (Q2315889) (← links)
- An extrapolation cascadic multigrid method combined with a fourth-order compact scheme for 3D Poisson equation (Q2356609) (← links)
- On the convergence of a cascadic multigrid method for a kind of semilinear elliptic problem (Q2916625) (← links)
- An efficient extrapolation full multigrid method for elliptic problems in two and three dimensions (Q5031319) (← links)
- An Extrapolation Cascadic Multigrid Method for Elliptic Problems on Reentrant Domains (Q5155292) (← links)
- A Cascadic Multigrid Method for Semilinear Elliptic Equations (Q5194100) (← links)
- An Efficient EXCMG-Newton Method Combined with Fourth-Order Compact Schemes for Semilinear Poisson Equations (Q6165529) (← links)