static char help[] ="Solves a time-dependent nonlinear PDE.\n";

/* ------------------------------------------------------------------------

   This program solves the two-dimensional time-dependent Bratu problem
       u_t = u_xx +  u_yy + \lambda*exp(u),
   on the domain 0 <= x,y <= 1,
   with the boundary conditions
       u(t,0,y) = 0, u_x(t,1,y) = 0,
       u(t,x,0) = 0, u_x(t,x,1) = 0,
   and the initial condition
       u(0,x,y) = 0.
   We discretize the right-hand side using finite differences with
   uniform grid spacings hx,hy:
       u_xx = (u_{i+1} - 2u_{i} + u_{i-1})/(hx^2)
       u_yy = (u_{j+1} - 2u_{j} + u_{j-1})/(hy^2)

  ------------------------------------------------------------------------- */

#include <petscdmda.h>
#include <petscts.h>

/*
   User-defined application context - contains data needed by the
   application-provided call-back routines.
*/
typedef struct {
  PetscReal lambda;
} AppCtx;

/*
   FormIFunctionLocal - Evaluates nonlinear implicit function on local process patch
 */
static PetscErrorCode FormIFunctionLocal(DMDALocalInfo *info,PetscReal t,PetscScalar **x,PetscScalar **xdot,PetscScalar **f,AppCtx *app)
{
  PetscInt       i,j;
  PetscReal      lambda,hx,hy;
  PetscScalar    ut,u,ue,uw,un,us,uxx,uyy;

  PetscFunctionBeginUser;
  lambda = app->lambda;
  hx     = 1.0/(PetscReal)(info->mx-1);
  hy     = 1.0/(PetscReal)(info->my-1);

  /*
     Compute RHS function over the locally owned part of the grid
  */
  for (j=info->ys; j<info->ys+info->ym; j++) {
    for (i=info->xs; i<info->xs+info->xm; i++) {
      if (i == 0 || j == 0 || i == info->mx-1 || j == info->my-1) {
        /* boundary points */
        f[j][i] = x[j][i] - (PetscReal)0;
      } else {
        /* interior points */
        ut = xdot[j][i];
        u  = x[j][i];
        uw = x[j][i-1];
        ue = x[j][i+1];
        un = x[j+1][i];
        us = x[j-1][i];

        uxx = (uw - 2.0*u + ue)/(hx*hx);
        uyy = (un - 2.0*u + us)/(hy*hy);
        f[j][i] = ut - uxx - uyy - lambda*PetscExpScalar(u);
      }
    }
  }
  PetscFunctionReturn(0);
}

/*
   FormIJacobianLocal - Evaluates implicit Jacobian matrix on local process patch
*/
static PetscErrorCode FormIJacobianLocal(DMDALocalInfo *info,PetscReal t,PetscScalar **x,PetscScalar **xdot,PetscScalar shift,Mat jac,Mat jacpre,AppCtx *app)
{
  PetscInt       i,j,k;
  MatStencil     col[5],row;
  PetscScalar    v[5],lambda,hx,hy;

  PetscFunctionBeginUser;
  lambda = app->lambda;
  hx     = 1.0/(PetscReal)(info->mx-1);
  hy     = 1.0/(PetscReal)(info->my-1);

  /*
     Compute Jacobian entries for the locally owned part of the grid
  */
  for (j=info->ys; j<info->ys+info->ym; j++) {
    for (i=info->xs; i<info->xs+info->xm; i++) {
      row.j = j; row.i = i; k = 0;
      if (i == 0 || j == 0 || i == info->mx-1 || j == info->my-1) {
        /* boundary points */
        v[0] = 1.0;
        PetscCall(MatSetValuesStencil(jacpre,1,&row,1,&row,v,INSERT_VALUES));
      } else {
        /* interior points */
        v[k] = -1.0/(hy*hy); col[k].j = j-1; col[k].i = i;   k++;
        v[k] = -1.0/(hx*hx); col[k].j = j;   col[k].i = i-1; k++;

        v[k] = shift + 2.0/(hx*hx) + 2.0/(hy*hy) - lambda*PetscExpScalar(x[j][i]);
        col[k].j = j; col[k].i = i; k++;

        v[k] = -1.0/(hx*hx); col[k].j = j;   col[k].i = i+1; k++;
        v[k] = -1.0/(hy*hy); col[k].j = j+1; col[k].i = i;   k++;

        PetscCall(MatSetValuesStencil(jacpre,1,&row,k,col,v,INSERT_VALUES));
      }
    }
  }

  /*
     Assemble matrix
  */
  PetscCall(MatAssemblyBegin(jacpre,MAT_FINAL_ASSEMBLY));
  PetscCall(MatAssemblyEnd(jacpre,MAT_FINAL_ASSEMBLY));
  PetscFunctionReturn(0);
}

int main(int argc,char **argv)
{
  TS              ts;            /* ODE integrator */
  DM              da;            /* DM context */
  Vec             U;             /* solution vector */
  DMBoundaryType  bt = DM_BOUNDARY_NONE;
  DMDAStencilType st = DMDA_STENCIL_STAR;
  PetscInt        sw = 1;
  PetscInt        N  = 17;
  PetscInt        n  = PETSC_DECIDE;
  AppCtx          app;

  /* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
     Initialize program
     - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
  PetscFunctionBeginUser;
  PetscCall(PetscInitialize(&argc,&argv,NULL,help));
  PetscOptionsBegin(PETSC_COMM_WORLD,NULL,"ex21 options","");
  {
    app.lambda = 6.8; app.lambda = 6.0;
    PetscCall(PetscOptionsReal("-lambda","","",app.lambda,&app.lambda,NULL));
  }
  PetscOptionsEnd();

  /* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
     Create DM context
     - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
  PetscCall(DMDACreate2d(PETSC_COMM_WORLD,bt,bt,st,N,N,n,n,1,sw,NULL,NULL,&da));
  PetscCall(DMSetFromOptions(da));
  PetscCall(DMSetUp(da));
  PetscCall(DMDASetUniformCoordinates(da,0.0,1.0,0.0,1.0,0,1.0));

  /* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
     Create timestepping solver context
     - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
  PetscCall(TSCreate(PETSC_COMM_WORLD,&ts));
  PetscCall(TSSetProblemType(ts,TS_NONLINEAR));
  PetscCall(TSSetDM(ts,da));
  PetscCall(DMDestroy(&da));

  PetscCall(TSGetDM(ts,&da));
  PetscCall(DMDATSSetIFunctionLocal(da,INSERT_VALUES,(DMDATSIFunctionLocal)FormIFunctionLocal,&app));
  PetscCall(DMDATSSetIJacobianLocal(da,(DMDATSIJacobianLocal)FormIJacobianLocal,&app));

  /* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
     Set solver options
   - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
  PetscCall(TSSetType(ts,TSBDF));
  PetscCall(TSSetTimeStep(ts,1e-4));
  PetscCall(TSSetMaxTime(ts,1.0));
  PetscCall(TSSetExactFinalTime(ts,TS_EXACTFINALTIME_STEPOVER));
  PetscCall(TSSetFromOptions(ts));

  /* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
     Set initial conditions
   - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
  PetscCall(TSGetDM(ts,&da));
  PetscCall(DMCreateGlobalVector(da,&U));
  PetscCall(VecSet(U,0.0));
  PetscCall(TSSetSolution(ts,U));

  /* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
     Run timestepping solver
     - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
  PetscCall(TSSolve(ts,U));

  /* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
      All PETSc objects should be destroyed when they are no longer needed.
   - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
  PetscCall(VecDestroy(&U));
  PetscCall(TSDestroy(&ts));
  PetscCall(PetscFinalize());
  return 0;
}

/*TEST

    testset:
      requires: !single !complex
      args: -da_grid_x 5 -da_grid_y 5 -da_refine 2 -dm_view -ts_type bdf -ts_adapt_type none -ts_dt 1e-3 -ts_monitor -ts_max_steps 5 -ts_view -snes_rtol 1e-6 -snes_type ngmres -npc_snes_type fas
      filter: grep -v "total number of"
      test:
        suffix: 1_bdf_ngmres_fas_ms
        args: -prefix_push npc_fas_levels_ -snes_type ms -snes_max_it 5 -ksp_type preonly -prefix_pop
      test:
        suffix: 2_bdf_ngmres_fas_ms
        args: -prefix_push npc_fas_levels_ -snes_type ms -snes_max_it 5 -ksp_type preonly -prefix_pop
        nsize: 2
      test:
        suffix: 1_bdf_ngmres_fas_ngs
        args: -prefix_push npc_fas_levels_ -snes_type ngs -snes_max_it 5 -prefix_pop
      test:
        suffix: 2_bdf_ngmres_fas_ngs
        args: -prefix_push npc_fas_levels_ -snes_type ngs -snes_max_it 5 -prefix_pop
        nsize: 2

TEST*/