1c4762a1bSJed BrownLabel 'subpoint_map': 2c4762a1bSJed Brown[0]: 40 (2) 3c4762a1bSJed Brown[0]: 49 (2) 4c4762a1bSJed Brown[0]: 73 (1) 5c4762a1bSJed Brown[0]: 78 (1) 6c4762a1bSJed Brown[0]: 82 (1) 7c4762a1bSJed Brown[0]: 83 (1) 8c4762a1bSJed Brown[0]: 95 (1) 9c4762a1bSJed Brown[0]: 96 (1) 10c4762a1bSJed Brown[0]: 97 (1) 11c4762a1bSJed Brown[0]: 20 (0) 12c4762a1bSJed Brown[0]: 21 (0) 13c4762a1bSJed Brown[0]: 22 (0) 14c4762a1bSJed Brown[0]: 23 (0) 15c4762a1bSJed Brown[0]: 24 (0) 16c4762a1bSJed Brown[0]: 25 (0) 17c4762a1bSJed Brown[0]: 0 (103) 18c4762a1bSJed Brown[0]: 1 (103) 19c4762a1bSJed Brown[0]: 2 (103) 20c4762a1bSJed Brown[0]: 6 (103) 21c4762a1bSJed Brown[0]: 37 (102) 22c4762a1bSJed Brown[0]: 38 (102) 23c4762a1bSJed Brown[0]: 41 (102) 24c4762a1bSJed Brown[0]: 42 (102) 25c4762a1bSJed Brown[0]: 45 (102) 26c4762a1bSJed Brown[0]: 46 (102) 27c4762a1bSJed Brown[0]: 47 (102) 28c4762a1bSJed Brown[0]: 50 (102) 29c4762a1bSJed Brown[0]: 51 (102) 30c4762a1bSJed Brown[0]: 52 (102) 31c4762a1bSJed Brown[0]: 69 (102) 32c4762a1bSJed Brown[0]: 71 (102) 33c4762a1bSJed Brown[0]: 3 (-103) 34c4762a1bSJed Brown[0]: 4 (-103) 35c4762a1bSJed Brown[0]: 5 (-103) 36c4762a1bSJed Brown[0]: 53 (-102) 37c4762a1bSJed Brown[0]: 54 (-102) 38c4762a1bSJed Brown[0]: 55 (-102) 39c4762a1bSJed Brown[0]: 57 (-102) 40c4762a1bSJed Brown[0]: 59 (-102) 41c4762a1bSJed Brown[0]: 60 (-102) 42c4762a1bSJed Brown[0]: 61 (-102) 43c4762a1bSJed Brown[0]: 63 (-102) 44c4762a1bSJed Brown[0]: 64 (-102) 45c4762a1bSJed Brown[0]: 66 (-102) 46c4762a1bSJed Brown[0]: 72 (101) 47c4762a1bSJed Brown[0]: 74 (101) 48c4762a1bSJed Brown[0]: 77 (101) 49c4762a1bSJed Brown[0]: 79 (101) 50c4762a1bSJed Brown[0]: 90 (101) 51c4762a1bSJed Brown[0]: 91 (101) 52c4762a1bSJed Brown[0]: 98 (101) 53c4762a1bSJed Brown[0]: 99 (101) 54c4762a1bSJed Brown[0]: 127 (101) 55c4762a1bSJed Brown[0]: 102 (-101) 56c4762a1bSJed Brown[0]: 103 (-101) 57c4762a1bSJed Brown[0]: 104 (-101) 58c4762a1bSJed Brown[0]: 105 (-101) 59c4762a1bSJed Brown[0]: 111 (-101) 60c4762a1bSJed Brown[0]: 113 (-101) 61c4762a1bSJed Brown[0]: 116 (-101) 62c4762a1bSJed Brown[0]: 119 (-101) 63b253942bSMatthew G. KnepleyLabel 'subpoint_map split': 64b253942bSMatthew G. Knepley[0]: 22 (100) 65b253942bSMatthew G. Knepley[0]: 23 (100) 66b253942bSMatthew G. Knepley[0]: 24 (100) 67b253942bSMatthew G. Knepley[0]: 25 (100) 68b253942bSMatthew G. Knepley[0]: 26 (100) 69b253942bSMatthew G. Knepley[0]: 27 (100) 70b253942bSMatthew G. Knepley[0]: 39 (-100) 71b253942bSMatthew G. Knepley[0]: 40 (-100) 72b253942bSMatthew G. Knepley[0]: 41 (-100) 73b253942bSMatthew G. Knepley[0]: 42 (-100) 74b253942bSMatthew G. Knepley[0]: 43 (-100) 75b253942bSMatthew G. Knepley[0]: 44 (-100) 76b253942bSMatthew G. Knepley[0]: 90 (101) 77b253942bSMatthew G. Knepley[0]: 95 (101) 78b253942bSMatthew G. Knepley[0]: 99 (101) 79b253942bSMatthew G. Knepley[0]: 100 (101) 80b253942bSMatthew G. Knepley[0]: 112 (101) 81b253942bSMatthew G. Knepley[0]: 113 (101) 82b253942bSMatthew G. Knepley[0]: 114 (101) 83b253942bSMatthew G. Knepley[0]: 146 (-101) 84b253942bSMatthew G. Knepley[0]: 147 (-101) 85b253942bSMatthew G. Knepley[0]: 148 (-101) 86b253942bSMatthew G. Knepley[0]: 149 (-101) 87b253942bSMatthew G. Knepley[0]: 150 (-101) 88b253942bSMatthew G. Knepley[0]: 151 (-101) 89b253942bSMatthew G. Knepley[0]: 152 (-101) 90b253942bSMatthew G. Knepley[0]: 48 (102) 91b253942bSMatthew G. Knepley[0]: 57 (102) 92b253942bSMatthew G. Knepley[0]: 80 (-102) 93b253942bSMatthew G. Knepley[0]: 81 (-102) 94b253942bSMatthew G. KnepleyLabel 'cohesive': 95b253942bSMatthew G. Knepley[0]: 7 (1) 96b253942bSMatthew G. Knepley[0]: 8 (1) 97b253942bSMatthew G. Knepley[0]: 82 (1) 98b253942bSMatthew G. Knepley[0]: 83 (1) 99b253942bSMatthew G. Knepley[0]: 84 (1) 100b253942bSMatthew G. Knepley[0]: 85 (1) 101b253942bSMatthew G. Knepley[0]: 86 (1) 102b253942bSMatthew G. Knepley[0]: 87 (1) 103b253942bSMatthew G. Knepley[0]: 88 (1) 104b253942bSMatthew G. Knepley[0]: 153 (1) 105b253942bSMatthew G. Knepley[0]: 154 (1) 106b253942bSMatthew G. Knepley[0]: 155 (1) 107b253942bSMatthew G. Knepley[0]: 156 (1) 108b253942bSMatthew G. Knepley[0]: 157 (1) 109b253942bSMatthew G. Knepley[0]: 158 (1) 110ecfb78b5SMatthew G. KnepleyDiscrete System with 2 fields 111ecfb78b5SMatthew G. Knepley cell total dim 36 total comp 6 112b7519becSMatthew G. Knepley cohesive cell 113f9244615SMatthew G. Knepley Field displacement FEM 3 components (implicit) (Nq 4 Nqc 1) 1-jet 1148cc725e6SPierre Jolivet PetscFE Object: displacement 1 MPI process 115ecfb78b5SMatthew G. Knepley type: basic 116ecfb78b5SMatthew G. Knepley Basic Finite Element in 2 dimensions with 3 components 1178cc725e6SPierre Jolivet PetscSpace Object: displacement 1 MPI process 118b4f26c06SToby Isaac type: sum 119ecfb78b5SMatthew G. Knepley Space in 2 variables with 3 components, size 12 120b4f26c06SToby Isaac Sum space of 3 concatenated subspaces (all identical) 121*2dce792eSToby Isaac PetscSpace Object: Q1 1 MPI process 122b4f26c06SToby Isaac type: tensor 123b4f26c06SToby Isaac Space in 2 variables with 1 components, size 4 124b4f26c06SToby Isaac Tensor space of 2 subspaces (all identical) 1258cc725e6SPierre Jolivet PetscSpace Object: sum component tensor component (displacement_sumcomp_tensorcomp_) 1 MPI process 126b4f26c06SToby Isaac type: poly 127b4f26c06SToby Isaac Space in 1 variables with 1 components, size 2 128b4f26c06SToby Isaac Polynomial space of degree 1 1298cc725e6SPierre Jolivet PetscDualSpace Object: displacement 1 MPI process 130*2dce792eSToby Isaac type: sum 131ecfb78b5SMatthew G. Knepley Dual space with 3 components, size 12 132*2dce792eSToby Isaac Sum dual space of 3 concatenated subspaces (all identical) 133*2dce792eSToby Isaac PetscDualSpace Object: 1 MPI process 134*2dce792eSToby Isaac type: lagrange 135*2dce792eSToby Isaac Dual space with 1 components, size 4 136ecfb78b5SMatthew G. Knepley Continuous tensor Lagrange dual space 137e5939c1dSMatthew G. Knepley Quadrature on a quadrilateral of order 3 on 4 points (dim 2) 138f9244615SMatthew G. Knepley Field fault traction FEM 3 components (implicit) (Nq 4 Nqc 1) 1-jet 1398cc725e6SPierre Jolivet PetscFE Object: fault traction (faulttraction_) 1 MPI process 140*2dce792eSToby Isaac type: vector 141*2dce792eSToby Isaac Vector Finite Element in 2 dimensions with 3 components 1428cc725e6SPierre Jolivet PetscSpace Object: fault traction (faulttraction_) 1 MPI process 143b4f26c06SToby Isaac type: sum 144ecfb78b5SMatthew G. Knepley Space in 2 variables with 3 components, size 12 145b4f26c06SToby Isaac Sum space of 3 concatenated subspaces (all identical) 146*2dce792eSToby Isaac PetscSpace Object: Q1 (faulttraction_sumcomp_) 1 MPI process 147b4f26c06SToby Isaac type: tensor 148b4f26c06SToby Isaac Space in 2 variables with 1 components, size 4 149b4f26c06SToby Isaac Tensor space of 2 subspaces (all identical) 1508cc725e6SPierre Jolivet PetscSpace Object: sum component tensor component (faulttraction_sumcomp_tensorcomp_) 1 MPI process 151b4f26c06SToby Isaac type: poly 152b4f26c06SToby Isaac Space in 1 variables with 1 components, size 2 153b4f26c06SToby Isaac Polynomial space of degree 1 1548cc725e6SPierre Jolivet PetscDualSpace Object: fault traction (faulttraction_) 1 MPI process 155*2dce792eSToby Isaac type: sum 156ecfb78b5SMatthew G. Knepley Dual space with 3 components, size 12 157*2dce792eSToby Isaac Sum dual space of 3 concatenated subspaces (all identical) 158*2dce792eSToby Isaac PetscDualSpace Object: Q1 1 MPI process 159*2dce792eSToby Isaac type: lagrange 160*2dce792eSToby Isaac Dual space with 1 components, size 4 161ecfb78b5SMatthew G. Knepley Continuous tensor Lagrange dual space 162e5939c1dSMatthew G. Knepley Quadrature on a quadrilateral of order 3 on 4 points (dim 2) 1636528b96dSMatthew G. Knepley Weak Form System with 2 fields 164b7519becSMatthew G. Knepley boundary_residual_f0 1651c6715b8SMatthew G. Knepley(0, 0) 1661c6715b8SMatthew G. Knepley(0, 0) 1671c6715b8SMatthew G. Knepley (cohesive, 1) (0, 1) 168b7519becSMatthew G. Knepley boundary_jacobian_g0 1691c6715b8SMatthew G. Knepley(0, 1) 1701c6715b8SMatthew G. Knepley(0, 1) 1711c6715b8SMatthew G. Knepley (cohesive, 1) (1, 0) 172