Label 'Point Partition': [0]: 0 (0) [0]: 8 (0) [0]: 9 (0) [0]: 11 (0) [0]: 17 (0) [0]: 18 (0) [0]: 19 (0) [0]: 1 (1) [0]: 11 (1) [0]: 12 (1) [0]: 14 (1) [0]: 20 (1) [0]: 21 (1) [0]: 22 (1) [0]: 2 (2) [0]: 9 (2) [0]: 11 (2) [0]: 12 (2) [0]: 18 (2) [0]: 22 (2) [0]: 23 (2) [0]: 3 (3) [0]: 10 (3) [0]: 12 (3) [0]: 13 (3) [0]: 24 (3) [0]: 25 (3) [0]: 26 (3) [0]: 4 (4) [0]: 9 (4) [0]: 10 (4) [0]: 12 (4) [0]: 23 (4) [0]: 24 (4) [0]: 27 (4) [0]: 5 (5) [0]: 13 (5) [0]: 15 (5) [0]: 16 (5) [0]: 28 (5) [0]: 29 (5) [0]: 30 (5) [0]: 6 (6) [0]: 12 (6) [0]: 13 (6) [0]: 15 (6) [0]: 26 (6) [0]: 28 (6) [0]: 31 (6) [0]: 7 (7) [0]: 12 (7) [0]: 14 (7) [0]: 15 (7) [0]: 20 (7) [0]: 31 (7) [0]: 32 (7) PetscSF Object: Migration SF 8 MPI processes type: basic [0] Number of roots=33, leaves=7, remote ranks=1 [0] 0 <- (0,0) [0] 1 <- (0,8) [0] 2 <- (0,9) [0] 3 <- (0,11) [0] 4 <- (0,17) [0] 5 <- (0,18) [0] 6 <- (0,19) [1] Number of roots=0, leaves=7, remote ranks=1 [1] 0 <- (0,1) [1] 1 <- (0,11) [1] 2 <- (0,12) [1] 3 <- (0,14) [1] 4 <- (0,20) [1] 5 <- (0,21) [1] 6 <- (0,22) [2] Number of roots=0, leaves=7, remote ranks=1 [2] 0 <- (0,2) [2] 1 <- (0,9) [2] 2 <- (0,11) [2] 3 <- (0,12) [2] 4 <- (0,18) [2] 5 <- (0,22) [2] 6 <- (0,23) [3] Number of roots=0, leaves=7, remote ranks=1 [3] 0 <- (0,3) [3] 1 <- (0,10) [3] 2 <- (0,12) [3] 3 <- (0,13) [3] 4 <- (0,24) [3] 5 <- (0,25) [3] 6 <- (0,26) [4] Number of roots=0, leaves=7, remote ranks=1 [4] 0 <- (0,4) [4] 1 <- (0,9) [4] 2 <- (0,10) [4] 3 <- (0,12) [4] 4 <- (0,23) [4] 5 <- (0,24) [4] 6 <- (0,27) [5] Number of roots=0, leaves=7, remote ranks=1 [5] 0 <- (0,5) [5] 1 <- (0,13) [5] 2 <- (0,15) [5] 3 <- (0,16) [5] 4 <- (0,28) [5] 5 <- (0,29) [5] 6 <- (0,30) [6] Number of roots=0, leaves=7, remote ranks=1 [6] 0 <- (0,6) [6] 1 <- (0,12) [6] 2 <- (0,13) [6] 3 <- (0,15) [6] 4 <- (0,26) [6] 5 <- (0,28) [6] 6 <- (0,31) [7] Number of roots=0, leaves=7, remote ranks=1 [7] 0 <- (0,7) [7] 1 <- (0,12) [7] 2 <- (0,14) [7] 3 <- (0,15) [7] 4 <- (0,20) [7] 5 <- (0,31) [7] 6 <- (0,32) MultiSF sort=rank-order ISLocalToGlobalMapping Object: Point renumbering for DM migration 8 MPI processes type not yet set [0] 0 0 [0] 1 8 [0] 2 9 [0] 3 11 [0] 4 17 [0] 5 18 [0] 6 19 [1] 0 1 [1] 1 11 [1] 2 12 [1] 3 14 [1] 4 20 [1] 5 21 [1] 6 22 [2] 0 2 [2] 1 9 [2] 2 11 [2] 3 12 [2] 4 18 [2] 5 22 [2] 6 23 [3] 0 3 [3] 1 10 [3] 2 12 [3] 3 13 [3] 4 24 [3] 5 25 [3] 6 26 [4] 0 4 [4] 1 9 [4] 2 10 [4] 3 12 [4] 4 23 [4] 5 24 [4] 6 27 [5] 0 5 [5] 1 13 [5] 2 15 [5] 3 16 [5] 4 28 [5] 5 29 [5] 6 30 [6] 0 6 [6] 1 12 [6] 2 13 [6] 3 15 [6] 4 26 [6] 5 28 [6] 6 31 [7] 0 7 [7] 1 12 [7] 2 14 [7] 3 15 [7] 4 20 [7] 5 31 [7] 6 32 PetscSF Object: 8 MPI processes type: basic [0] Number of roots=7, leaves=3, remote ranks=2 [0] 2 <- (4,1) [0] 3 <- (2,2) [0] 5 <- (2,4) [1] Number of roots=7, leaves=5, remote ranks=2 [1] 1 <- (2,2) [1] 2 <- (7,1) [1] 3 <- (7,2) [1] 4 <- (7,4) [1] 6 <- (2,5) [2] Number of roots=7, leaves=3, remote ranks=2 [2] 1 <- (4,1) [2] 3 <- (7,1) [2] 6 <- (4,4) [3] Number of roots=7, leaves=5, remote ranks=3 [3] 1 <- (4,2) [3] 2 <- (7,1) [3] 3 <- (6,2) [3] 4 <- (4,5) [3] 6 <- (6,4) [4] Number of roots=7, leaves=1, remote ranks=1 [4] 3 <- (7,1) [5] Number of roots=7, leaves=3, remote ranks=2 [5] 1 <- (6,2) [5] 2 <- (7,3) [5] 4 <- (6,5) [6] Number of roots=7, leaves=3, remote ranks=1 [6] 1 <- (7,1) [6] 3 <- (7,3) [6] 6 <- (7,5) [7] Number of roots=7, leaves=0, remote ranks=0 MultiSF sort=rank-order DM Object: Generated Mesh 8 MPI processes type: plex Generated Mesh in 2 dimensions: Supports: [0] Max support size: 4 [0]: 4 ----> 13 [0]: 4 ----> 18 [0]: 5 ----> 14 [0]: 5 ----> 15 [0]: 6 ----> 16 [0]: 6 ----> 17 [0]: 7 ----> 10 [0]: 7 ----> 12 [0]: 7 ----> 13 [0]: 7 ----> 14 [0]: 8 ----> 10 [0]: 8 ----> 11 [0]: 8 ----> 15 [0]: 8 ----> 16 [0]: 9 ----> 11 [0]: 9 ----> 12 [0]: 9 ----> 17 [0]: 9 ----> 18 [0]: 10 ----> 1 [0]: 10 ----> 3 [0]: 11 ----> 2 [0]: 11 ----> 3 [0]: 12 ----> 0 [0]: 12 ----> 3 [0]: 13 ----> 0 [0]: 14 ----> 1 [0]: 15 ----> 1 [0]: 16 ----> 2 [0]: 17 ----> 2 [0]: 18 ----> 0 [1] Max support size: 4 [1]: 4 ----> 16 [1]: 4 ----> 17 [1]: 5 ----> 13 [1]: 5 ----> 18 [1]: 6 ----> 14 [1]: 6 ----> 15 [1]: 7 ----> 10 [1]: 7 ----> 12 [1]: 7 ----> 13 [1]: 7 ----> 14 [1]: 8 ----> 10 [1]: 8 ----> 11 [1]: 8 ----> 15 [1]: 8 ----> 16 [1]: 9 ----> 11 [1]: 9 ----> 12 [1]: 9 ----> 17 [1]: 9 ----> 18 [1]: 10 ----> 1 [1]: 10 ----> 3 [1]: 11 ----> 2 [1]: 11 ----> 3 [1]: 12 ----> 0 [1]: 12 ----> 3 [1]: 13 ----> 0 [1]: 14 ----> 1 [1]: 15 ----> 1 [1]: 16 ----> 2 [1]: 17 ----> 2 [1]: 18 ----> 0 [2] Max support size: 4 [2]: 4 ----> 13 [2]: 4 ----> 17 [2]: 5 ----> 14 [2]: 5 ----> 15 [2]: 6 ----> 16 [2]: 6 ----> 18 [2]: 7 ----> 10 [2]: 7 ----> 12 [2]: 7 ----> 13 [2]: 7 ----> 14 [2]: 8 ----> 11 [2]: 8 ----> 12 [2]: 8 ----> 15 [2]: 8 ----> 16 [2]: 9 ----> 10 [2]: 9 ----> 11 [2]: 9 ----> 17 [2]: 9 ----> 18 [2]: 10 ----> 1 [2]: 10 ----> 3 [2]: 11 ----> 2 [2]: 11 ----> 3 [2]: 12 ----> 0 [2]: 12 ----> 3 [2]: 13 ----> 1 [2]: 14 ----> 0 [2]: 15 ----> 0 [2]: 16 ----> 2 [2]: 17 ----> 1 [2]: 18 ----> 2 [3] Max support size: 4 [3]: 4 ----> 14 [3]: 4 ----> 15 [3]: 5 ----> 13 [3]: 5 ----> 18 [3]: 6 ----> 16 [3]: 6 ----> 17 [3]: 7 ----> 10 [3]: 7 ----> 12 [3]: 7 ----> 13 [3]: 7 ----> 14 [3]: 8 ----> 10 [3]: 8 ----> 11 [3]: 8 ----> 15 [3]: 8 ----> 16 [3]: 9 ----> 11 [3]: 9 ----> 12 [3]: 9 ----> 17 [3]: 9 ----> 18 [3]: 10 ----> 1 [3]: 10 ----> 3 [3]: 11 ----> 2 [3]: 11 ----> 3 [3]: 12 ----> 0 [3]: 12 ----> 3 [3]: 13 ----> 0 [3]: 14 ----> 1 [3]: 15 ----> 1 [3]: 16 ----> 2 [3]: 17 ----> 2 [3]: 18 ----> 0 [4] Max support size: 4 [4]: 4 ----> 13 [4]: 4 ----> 17 [4]: 5 ----> 16 [4]: 5 ----> 18 [4]: 6 ----> 14 [4]: 6 ----> 15 [4]: 7 ----> 10 [4]: 7 ----> 11 [4]: 7 ----> 13 [4]: 7 ----> 14 [4]: 8 ----> 10 [4]: 8 ----> 12 [4]: 8 ----> 15 [4]: 8 ----> 16 [4]: 9 ----> 11 [4]: 9 ----> 12 [4]: 9 ----> 17 [4]: 9 ----> 18 [4]: 10 ----> 1 [4]: 10 ----> 3 [4]: 11 ----> 2 [4]: 11 ----> 3 [4]: 12 ----> 0 [4]: 12 ----> 3 [4]: 13 ----> 2 [4]: 14 ----> 1 [4]: 15 ----> 1 [4]: 16 ----> 0 [4]: 17 ----> 2 [4]: 18 ----> 0 [5] Max support size: 4 [5]: 4 ----> 14 [5]: 4 ----> 15 [5]: 5 ----> 13 [5]: 5 ----> 18 [5]: 6 ----> 16 [5]: 6 ----> 17 [5]: 7 ----> 10 [5]: 7 ----> 12 [5]: 7 ----> 13 [5]: 7 ----> 14 [5]: 8 ----> 10 [5]: 8 ----> 11 [5]: 8 ----> 15 [5]: 8 ----> 16 [5]: 9 ----> 11 [5]: 9 ----> 12 [5]: 9 ----> 17 [5]: 9 ----> 18 [5]: 10 ----> 1 [5]: 10 ----> 3 [5]: 11 ----> 2 [5]: 11 ----> 3 [5]: 12 ----> 0 [5]: 12 ----> 3 [5]: 13 ----> 0 [5]: 14 ----> 1 [5]: 15 ----> 1 [5]: 16 ----> 2 [5]: 17 ----> 2 [5]: 18 ----> 0 [6] Max support size: 4 [6]: 4 ----> 14 [6]: 4 ----> 18 [6]: 5 ----> 13 [6]: 5 ----> 16 [6]: 6 ----> 15 [6]: 6 ----> 17 [6]: 7 ----> 11 [6]: 7 ----> 12 [6]: 7 ----> 13 [6]: 7 ----> 14 [6]: 8 ----> 10 [6]: 8 ----> 12 [6]: 8 ----> 15 [6]: 8 ----> 16 [6]: 9 ----> 10 [6]: 9 ----> 11 [6]: 9 ----> 17 [6]: 9 ----> 18 [6]: 10 ----> 1 [6]: 10 ----> 3 [6]: 11 ----> 2 [6]: 11 ----> 3 [6]: 12 ----> 0 [6]: 12 ----> 3 [6]: 13 ----> 0 [6]: 14 ----> 2 [6]: 15 ----> 1 [6]: 16 ----> 0 [6]: 17 ----> 1 [6]: 18 ----> 2 [7] Max support size: 4 [7]: 4 ----> 13 [7]: 4 ----> 16 [7]: 5 ----> 14 [7]: 5 ----> 18 [7]: 6 ----> 15 [7]: 6 ----> 17 [7]: 7 ----> 11 [7]: 7 ----> 12 [7]: 7 ----> 13 [7]: 7 ----> 14 [7]: 8 ----> 10 [7]: 8 ----> 12 [7]: 8 ----> 15 [7]: 8 ----> 16 [7]: 9 ----> 10 [7]: 9 ----> 11 [7]: 9 ----> 17 [7]: 9 ----> 18 [7]: 10 ----> 1 [7]: 10 ----> 3 [7]: 11 ----> 2 [7]: 11 ----> 3 [7]: 12 ----> 0 [7]: 12 ----> 3 [7]: 13 ----> 0 [7]: 14 ----> 2 [7]: 15 ----> 1 [7]: 16 ----> 0 [7]: 17 ----> 1 [7]: 18 ----> 2 Cones: [0] Max cone size: 3 [0]: 0 <---- 13 (0) [0]: 0 <---- 12 (-1) [0]: 0 <---- 18 (0) [0]: 1 <---- 14 (0) [0]: 1 <---- 15 (0) [0]: 1 <---- 10 (-1) [0]: 2 <---- 11 (-1) [0]: 2 <---- 16 (0) [0]: 2 <---- 17 (0) [0]: 3 <---- 10 (0) [0]: 3 <---- 11 (0) [0]: 3 <---- 12 (0) [0]: 10 <---- 7 (0) [0]: 10 <---- 8 (0) [0]: 11 <---- 8 (0) [0]: 11 <---- 9 (0) [0]: 12 <---- 9 (0) [0]: 12 <---- 7 (0) [0]: 13 <---- 4 (0) [0]: 13 <---- 7 (0) [0]: 14 <---- 7 (0) [0]: 14 <---- 5 (0) [0]: 15 <---- 5 (0) [0]: 15 <---- 8 (0) [0]: 16 <---- 8 (0) [0]: 16 <---- 6 (0) [0]: 17 <---- 6 (0) [0]: 17 <---- 9 (0) [0]: 18 <---- 9 (0) [0]: 18 <---- 4 (0) [1] Max cone size: 3 [1]: 0 <---- 13 (0) [1]: 0 <---- 12 (-1) [1]: 0 <---- 18 (0) [1]: 1 <---- 14 (0) [1]: 1 <---- 15 (0) [1]: 1 <---- 10 (-1) [1]: 2 <---- 11 (-1) [1]: 2 <---- 16 (0) [1]: 2 <---- 17 (0) [1]: 3 <---- 10 (0) [1]: 3 <---- 11 (0) [1]: 3 <---- 12 (0) [1]: 10 <---- 7 (0) [1]: 10 <---- 8 (0) [1]: 11 <---- 8 (0) [1]: 11 <---- 9 (0) [1]: 12 <---- 9 (0) [1]: 12 <---- 7 (0) [1]: 13 <---- 5 (0) [1]: 13 <---- 7 (0) [1]: 14 <---- 7 (0) [1]: 14 <---- 6 (0) [1]: 15 <---- 6 (0) [1]: 15 <---- 8 (0) [1]: 16 <---- 8 (0) [1]: 16 <---- 4 (0) [1]: 17 <---- 4 (0) [1]: 17 <---- 9 (0) [1]: 18 <---- 9 (0) [1]: 18 <---- 5 (0) [2] Max cone size: 3 [2]: 0 <---- 14 (-1) [2]: 0 <---- 12 (-1) [2]: 0 <---- 15 (-1) [2]: 1 <---- 13 (-1) [2]: 1 <---- 17 (0) [2]: 1 <---- 10 (-1) [2]: 2 <---- 11 (-1) [2]: 2 <---- 18 (0) [2]: 2 <---- 16 (-1) [2]: 3 <---- 10 (0) [2]: 3 <---- 11 (0) [2]: 3 <---- 12 (0) [2]: 10 <---- 7 (0) [2]: 10 <---- 9 (0) [2]: 11 <---- 9 (0) [2]: 11 <---- 8 (0) [2]: 12 <---- 8 (0) [2]: 12 <---- 7 (0) [2]: 13 <---- 4 (0) [2]: 13 <---- 7 (0) [2]: 14 <---- 7 (0) [2]: 14 <---- 5 (0) [2]: 15 <---- 5 (0) [2]: 15 <---- 8 (0) [2]: 16 <---- 8 (0) [2]: 16 <---- 6 (0) [2]: 17 <---- 4 (0) [2]: 17 <---- 9 (0) [2]: 18 <---- 9 (0) [2]: 18 <---- 6 (0) [3] Max cone size: 3 [3]: 0 <---- 13 (0) [3]: 0 <---- 12 (-1) [3]: 0 <---- 18 (0) [3]: 1 <---- 14 (0) [3]: 1 <---- 15 (0) [3]: 1 <---- 10 (-1) [3]: 2 <---- 11 (-1) [3]: 2 <---- 16 (0) [3]: 2 <---- 17 (0) [3]: 3 <---- 10 (0) [3]: 3 <---- 11 (0) [3]: 3 <---- 12 (0) [3]: 10 <---- 7 (0) [3]: 10 <---- 8 (0) [3]: 11 <---- 8 (0) [3]: 11 <---- 9 (0) [3]: 12 <---- 9 (0) [3]: 12 <---- 7 (0) [3]: 13 <---- 5 (0) [3]: 13 <---- 7 (0) [3]: 14 <---- 7 (0) [3]: 14 <---- 4 (0) [3]: 15 <---- 4 (0) [3]: 15 <---- 8 (0) [3]: 16 <---- 8 (0) [3]: 16 <---- 6 (0) [3]: 17 <---- 6 (0) [3]: 17 <---- 9 (0) [3]: 18 <---- 9 (0) [3]: 18 <---- 5 (0) [4] Max cone size: 3 [4]: 0 <---- 16 (-1) [4]: 0 <---- 12 (-1) [4]: 0 <---- 18 (0) [4]: 1 <---- 15 (-1) [4]: 1 <---- 14 (-1) [4]: 1 <---- 10 (-1) [4]: 2 <---- 11 (-1) [4]: 2 <---- 13 (-1) [4]: 2 <---- 17 (0) [4]: 3 <---- 10 (0) [4]: 3 <---- 11 (0) [4]: 3 <---- 12 (0) [4]: 10 <---- 8 (0) [4]: 10 <---- 7 (0) [4]: 11 <---- 7 (0) [4]: 11 <---- 9 (0) [4]: 12 <---- 9 (0) [4]: 12 <---- 8 (0) [4]: 13 <---- 4 (0) [4]: 13 <---- 7 (0) [4]: 14 <---- 7 (0) [4]: 14 <---- 6 (0) [4]: 15 <---- 6 (0) [4]: 15 <---- 8 (0) [4]: 16 <---- 8 (0) [4]: 16 <---- 5 (0) [4]: 17 <---- 4 (0) [4]: 17 <---- 9 (0) [4]: 18 <---- 9 (0) [4]: 18 <---- 5 (0) [5] Max cone size: 3 [5]: 0 <---- 13 (0) [5]: 0 <---- 12 (-1) [5]: 0 <---- 18 (0) [5]: 1 <---- 14 (0) [5]: 1 <---- 15 (0) [5]: 1 <---- 10 (-1) [5]: 2 <---- 11 (-1) [5]: 2 <---- 16 (0) [5]: 2 <---- 17 (0) [5]: 3 <---- 10 (0) [5]: 3 <---- 11 (0) [5]: 3 <---- 12 (0) [5]: 10 <---- 7 (0) [5]: 10 <---- 8 (0) [5]: 11 <---- 8 (0) [5]: 11 <---- 9 (0) [5]: 12 <---- 9 (0) [5]: 12 <---- 7 (0) [5]: 13 <---- 5 (0) [5]: 13 <---- 7 (0) [5]: 14 <---- 7 (0) [5]: 14 <---- 4 (0) [5]: 15 <---- 4 (0) [5]: 15 <---- 8 (0) [5]: 16 <---- 8 (0) [5]: 16 <---- 6 (0) [5]: 17 <---- 6 (0) [5]: 17 <---- 9 (0) [5]: 18 <---- 9 (0) [5]: 18 <---- 5 (0) [6] Max cone size: 3 [6]: 0 <---- 16 (-1) [6]: 0 <---- 12 (-1) [6]: 0 <---- 13 (-1) [6]: 1 <---- 15 (-1) [6]: 1 <---- 17 (0) [6]: 1 <---- 10 (-1) [6]: 2 <---- 11 (-1) [6]: 2 <---- 18 (0) [6]: 2 <---- 14 (-1) [6]: 3 <---- 10 (0) [6]: 3 <---- 11 (0) [6]: 3 <---- 12 (0) [6]: 10 <---- 8 (0) [6]: 10 <---- 9 (0) [6]: 11 <---- 9 (0) [6]: 11 <---- 7 (0) [6]: 12 <---- 7 (0) [6]: 12 <---- 8 (0) [6]: 13 <---- 5 (0) [6]: 13 <---- 7 (0) [6]: 14 <---- 7 (0) [6]: 14 <---- 4 (0) [6]: 15 <---- 6 (0) [6]: 15 <---- 8 (0) [6]: 16 <---- 8 (0) [6]: 16 <---- 5 (0) [6]: 17 <---- 6 (0) [6]: 17 <---- 9 (0) [6]: 18 <---- 9 (0) [6]: 18 <---- 4 (0) [7] Max cone size: 3 [7]: 0 <---- 16 (-1) [7]: 0 <---- 12 (-1) [7]: 0 <---- 13 (-1) [7]: 1 <---- 15 (-1) [7]: 1 <---- 17 (0) [7]: 1 <---- 10 (-1) [7]: 2 <---- 11 (-1) [7]: 2 <---- 18 (0) [7]: 2 <---- 14 (-1) [7]: 3 <---- 10 (0) [7]: 3 <---- 11 (0) [7]: 3 <---- 12 (0) [7]: 10 <---- 8 (0) [7]: 10 <---- 9 (0) [7]: 11 <---- 9 (0) [7]: 11 <---- 7 (0) [7]: 12 <---- 7 (0) [7]: 12 <---- 8 (0) [7]: 13 <---- 4 (0) [7]: 13 <---- 7 (0) [7]: 14 <---- 7 (0) [7]: 14 <---- 5 (0) [7]: 15 <---- 6 (0) [7]: 15 <---- 8 (0) [7]: 16 <---- 8 (0) [7]: 16 <---- 4 (0) [7]: 17 <---- 6 (0) [7]: 17 <---- 9 (0) [7]: 18 <---- 9 (0) [7]: 18 <---- 5 (0) coordinates with 1 fields field 0 with 2 components Process 0: ( 4) dof 2 offset 0 0. 0. ( 5) dof 2 offset 2 0.5 0. ( 6) dof 2 offset 4 0. 0.5 ( 7) dof 2 offset 6 0.25 0. ( 8) dof 2 offset 8 0.25 0.25 ( 9) dof 2 offset 10 0. 0.25 Process 1: ( 4) dof 2 offset 0 0. 0.5 ( 5) dof 2 offset 2 0.5 0.5 ( 6) dof 2 offset 4 0. 1. ( 7) dof 2 offset 6 0.25 0.75 ( 8) dof 2 offset 8 0. 0.75 ( 9) dof 2 offset 10 0.25 0.5 Process 2: ( 4) dof 2 offset 0 0.5 0. ( 5) dof 2 offset 2 0. 0.5 ( 6) dof 2 offset 4 0.5 0.5 ( 7) dof 2 offset 6 0.25 0.25 ( 8) dof 2 offset 8 0.25 0.5 ( 9) dof 2 offset 10 0.5 0.25 Process 3: ( 4) dof 2 offset 0 1. 0. ( 5) dof 2 offset 2 0.5 0.5 ( 6) dof 2 offset 4 1. 0.5 ( 7) dof 2 offset 6 0.75 0.25 ( 8) dof 2 offset 8 1. 0.25 ( 9) dof 2 offset 10 0.75 0.5 Process 4: ( 4) dof 2 offset 0 0.5 0. ( 5) dof 2 offset 2 1. 0. ( 6) dof 2 offset 4 0.5 0.5 ( 7) dof 2 offset 6 0.5 0.25 ( 8) dof 2 offset 8 0.75 0.25 ( 9) dof 2 offset 10 0.75 0. Process 5: ( 4) dof 2 offset 0 1. 0.5 ( 5) dof 2 offset 2 0.5 1. ( 6) dof 2 offset 4 1. 1. ( 7) dof 2 offset 6 0.75 0.75 ( 8) dof 2 offset 8 1. 0.75 ( 9) dof 2 offset 10 0.75 1. Process 6: ( 4) dof 2 offset 0 0.5 0.5 ( 5) dof 2 offset 2 1. 0.5 ( 6) dof 2 offset 4 0.5 1. ( 7) dof 2 offset 6 0.75 0.5 ( 8) dof 2 offset 8 0.75 0.75 ( 9) dof 2 offset 10 0.5 0.75 Process 7: ( 4) dof 2 offset 0 0.5 0.5 ( 5) dof 2 offset 2 0. 1. ( 6) dof 2 offset 4 0.5 1. ( 7) dof 2 offset 6 0.25 0.75 ( 8) dof 2 offset 8 0.5 0.75 ( 9) dof 2 offset 10 0.25 1. Labels: Label 'celltype': [0]: 10 (1) [0]: 11 (1) [0]: 12 (1) [0]: 13 (1) [0]: 14 (1) [0]: 15 (1) [0]: 16 (1) [0]: 17 (1) [0]: 18 (1) [0]: 0 (3) [0]: 1 (3) [0]: 2 (3) [0]: 3 (3) [0]: 4 (0) [0]: 5 (0) [0]: 6 (0) [0]: 7 (0) [0]: 8 (0) [0]: 9 (0) [1]: 10 (1) [1]: 11 (1) [1]: 12 (1) [1]: 13 (1) [1]: 14 (1) [1]: 15 (1) [1]: 16 (1) [1]: 17 (1) [1]: 18 (1) [1]: 0 (3) [1]: 1 (3) [1]: 2 (3) [1]: 3 (3) [1]: 4 (0) [1]: 5 (0) [1]: 6 (0) [1]: 7 (0) [1]: 8 (0) [1]: 9 (0) [2]: 10 (1) [2]: 11 (1) [2]: 12 (1) [2]: 13 (1) [2]: 14 (1) [2]: 15 (1) [2]: 16 (1) [2]: 17 (1) [2]: 18 (1) [2]: 0 (3) [2]: 1 (3) [2]: 2 (3) [2]: 3 (3) [2]: 4 (0) [2]: 5 (0) [2]: 6 (0) [2]: 7 (0) [2]: 8 (0) [2]: 9 (0) [3]: 10 (1) [3]: 11 (1) [3]: 12 (1) [3]: 13 (1) [3]: 14 (1) [3]: 15 (1) [3]: 16 (1) [3]: 17 (1) [3]: 18 (1) [3]: 0 (3) [3]: 1 (3) [3]: 2 (3) [3]: 3 (3) [3]: 4 (0) [3]: 5 (0) [3]: 6 (0) [3]: 7 (0) [3]: 8 (0) [3]: 9 (0) [4]: 10 (1) [4]: 11 (1) [4]: 12 (1) [4]: 13 (1) [4]: 14 (1) [4]: 15 (1) [4]: 16 (1) [4]: 17 (1) [4]: 18 (1) [4]: 0 (3) [4]: 1 (3) [4]: 2 (3) [4]: 3 (3) [4]: 4 (0) [4]: 5 (0) [4]: 6 (0) [4]: 7 (0) [4]: 8 (0) [4]: 9 (0) [5]: 10 (1) [5]: 11 (1) [5]: 12 (1) [5]: 13 (1) [5]: 14 (1) [5]: 15 (1) [5]: 16 (1) [5]: 17 (1) [5]: 18 (1) [5]: 0 (3) [5]: 1 (3) [5]: 2 (3) [5]: 3 (3) [5]: 4 (0) [5]: 5 (0) [5]: 6 (0) [5]: 7 (0) [5]: 8 (0) [5]: 9 (0) [6]: 10 (1) [6]: 11 (1) [6]: 12 (1) [6]: 13 (1) [6]: 14 (1) [6]: 15 (1) [6]: 16 (1) [6]: 17 (1) [6]: 18 (1) [6]: 0 (3) [6]: 1 (3) [6]: 2 (3) [6]: 3 (3) [6]: 4 (0) [6]: 5 (0) [6]: 6 (0) [6]: 7 (0) [6]: 8 (0) [6]: 9 (0) [7]: 10 (1) [7]: 11 (1) [7]: 12 (1) [7]: 13 (1) [7]: 14 (1) [7]: 15 (1) [7]: 16 (1) [7]: 17 (1) [7]: 18 (1) [7]: 0 (3) [7]: 1 (3) [7]: 2 (3) [7]: 3 (3) [7]: 4 (0) [7]: 5 (0) [7]: 6 (0) [7]: 7 (0) [7]: 8 (0) [7]: 9 (0) Label 'marker': [0]: 4 (1) [0]: 5 (1) [0]: 6 (1) [0]: 7 (1) [0]: 9 (1) [0]: 13 (1) [0]: 14 (1) [0]: 17 (1) [0]: 18 (1) [1]: 4 (1) [1]: 6 (1) [1]: 8 (1) [1]: 15 (1) [1]: 16 (1) [2]: 4 (1) [2]: 5 (1) [3]: 4 (1) [3]: 6 (1) [3]: 8 (1) [3]: 15 (1) [3]: 16 (1) [4]: 4 (1) [4]: 5 (1) [4]: 9 (1) [4]: 17 (1) [4]: 18 (1) [5]: 4 (1) [5]: 5 (1) [5]: 6 (1) [5]: 8 (1) [5]: 9 (1) [5]: 15 (1) [5]: 16 (1) [5]: 17 (1) [5]: 18 (1) [6]: 5 (1) [6]: 6 (1) [7]: 5 (1) [7]: 6 (1) [7]: 9 (1) [7]: 17 (1) [7]: 18 (1) Label 'Face Sets': [0]: 7 (1) [0]: 13 (1) [0]: 14 (1) [0]: 9 (4) [0]: 17 (4) [0]: 18 (4) [1]: 8 (4) [1]: 15 (4) [1]: 16 (4) [3]: 8 (2) [3]: 15 (2) [3]: 16 (2) [4]: 9 (1) [4]: 17 (1) [4]: 18 (1) [5]: 8 (2) [5]: 15 (2) [5]: 16 (2) [5]: 9 (3) [5]: 17 (3) [5]: 18 (3) [7]: 9 (3) [7]: 17 (3) [7]: 18 (3) PetscSF Object: 8 MPI processes type: basic [0] Number of roots=19, leaves=5, remote ranks=2 [0] 5 <- (4,4) [0] 6 <- (2,5) [0] 8 <- (2,7) [0] 15 <- (2,13) [0] 16 <- (2,14) [1] Number of roots=19, leaves=9, remote ranks=2 [1] 4 <- (2,5) [1] 5 <- (7,4) [1] 6 <- (7,5) [1] 7 <- (7,7) [1] 9 <- (2,8) [1] 13 <- (7,13) [1] 14 <- (7,14) [1] 17 <- (2,15) [1] 18 <- (2,16) [2] Number of roots=19, leaves=5, remote ranks=2 [2] 4 <- (4,4) [2] 6 <- (7,4) [2] 9 <- (4,7) [2] 17 <- (4,13) [2] 18 <- (4,14) [3] Number of roots=19, leaves=9, remote ranks=3 [3] 4 <- (4,5) [3] 5 <- (7,4) [3] 6 <- (6,5) [3] 7 <- (4,8) [3] 9 <- (6,7) [3] 13 <- (4,15) [3] 14 <- (4,16) [3] 17 <- (6,13) [3] 18 <- (6,14) [4] Number of roots=19, leaves=1, remote ranks=1 [4] 6 <- (7,4) [5] Number of roots=19, leaves=5, remote ranks=2 [5] 4 <- (6,5) [5] 5 <- (7,6) [5] 7 <- (6,8) [5] 13 <- (6,15) [5] 14 <- (6,16) [6] Number of roots=19, leaves=5, remote ranks=1 [6] 4 <- (7,4) [6] 6 <- (7,6) [6] 9 <- (7,8) [6] 17 <- (7,15) [6] 18 <- (7,16) [7] Number of roots=19, leaves=0, remote ranks=0 [0] Roots referenced by my leaves, by rank [0] 2: 4 edges [0] 6 <- 5 [0] 8 <- 7 [0] 15 <- 13 [0] 16 <- 14 [0] 4: 1 edges [0] 5 <- 4 [1] Roots referenced by my leaves, by rank [1] 2: 4 edges [1] 4 <- 5 [1] 9 <- 8 [1] 17 <- 15 [1] 18 <- 16 [1] 7: 5 edges [1] 5 <- 4 [1] 6 <- 5 [1] 7 <- 7 [1] 13 <- 13 [1] 14 <- 14 [2] Roots referenced by my leaves, by rank [2] 4: 4 edges [2] 4 <- 4 [2] 9 <- 7 [2] 17 <- 13 [2] 18 <- 14 [2] 7: 1 edges [2] 6 <- 4 [3] Roots referenced by my leaves, by rank [3] 4: 4 edges [3] 4 <- 5 [3] 7 <- 8 [3] 13 <- 15 [3] 14 <- 16 [3] 6: 4 edges [3] 6 <- 5 [3] 9 <- 7 [3] 17 <- 13 [3] 18 <- 14 [3] 7: 1 edges [3] 5 <- 4 [4] Roots referenced by my leaves, by rank [4] 7: 1 edges [4] 6 <- 4 [5] Roots referenced by my leaves, by rank [5] 6: 4 edges [5] 4 <- 5 [5] 7 <- 8 [5] 13 <- 15 [5] 14 <- 16 [5] 7: 1 edges [5] 5 <- 6 [6] Roots referenced by my leaves, by rank [6] 7: 5 edges [6] 4 <- 4 [6] 6 <- 6 [6] 9 <- 8 [6] 17 <- 15 [6] 18 <- 16 [7] Roots referenced by my leaves, by rank MultiSF sort=rank-order