1Created DMDA of type da in 2D with faces (7, 7, 1), global vector size 56 2DM Object: 1 MPI process 3 type: da 4Processor [0] M 7 N 8 m 1 n 1 w 1 s 1 5X range of indices: 0 7, Y range of indices: 0 8 6Observation Operator H: 7Mat Object: H_observation_operator 1 MPI process 8 type: seqaijkokkos 9row 0: (0, 1.) 10row 1: (2, 1.) 11row 2: (4, 1.) 12row 3: (6, 1.) 13row 4: (14, 1.) 14row 5: (16, 1.) 15row 6: (18, 1.) 16row 7: (20, 1.) 17row 8: (28, 1.) 18row 9: (30, 1.) 19row 10: (32, 1.) 20row 11: (34, 1.) 21row 12: (42, 1.) 22row 13: (44, 1.) 23row 14: (46, 1.) 24row 15: (48, 1.) 25Localization Matrix Q: 26Mat Object: Q_localization 1 MPI process 27 type: seqaijkokkos 28row 0: (0, 1.) (1, 0.825631) (2, 0.468332) (4, 0.825729) (5, 0.684872) (6, 0.38524) (8, 0.468429) (9, 0.385256) (10, 0.208333) 29row 1: (0, 0.938966) (1, 0.939055) (2, 0.580316) (3, 0.208333) (4, 0.738039) (5, 0.738078) (6, 0.454174) (8, 0.352904) (9, 0.352934) 30row 2: (0, 0.737939) (1, 1.) (2, 0.738056) (3, 0.290784) (4, 0.546085) (5, 0.738025) (6, 0.546181) (7, 0.208333) (9, 0.290664) 31row 3: (0, 0.447426) (1, 0.912417) (2, 0.91236) (3, 0.447576) (4, 0.30799) (5, 0.640969) (6, 0.641099) (7, 0.308013) (10, 0.208333) 32row 4: (0, 0.29062) (1, 0.738066) (2, 1.) (3, 0.738161) (5, 0.546068) (6, 0.738193) (7, 0.546245) (10, 0.290778) (11, 0.208333) 33row 5: (1, 0.580447) (2, 0.939091) (3, 0.939075) (5, 0.454178) (6, 0.738212) (7, 0.738202) (9, 0.208333) (10, 0.353077) (11, 0.353056) 34row 6: (1, 0.468553) (2, 0.8258) (3, 1.) (5, 0.385301) (6, 0.684992) (7, 0.825784) (9, 0.208333) (10, 0.38531) (11, 0.468459) 35row 7: (0, 0.939093) (1, 0.738074) (2, 0.352975) (4, 0.939016) (5, 0.738094) (6, 0.353008) (8, 0.580256) (9, 0.454122) (10, 0.208333) 36row 8: (0, 0.843046) (1, 0.84305) (2, 0.429611) (4, 0.843119) (5, 0.843111) (6, 0.429688) (8, 0.429642) (9, 0.429652) (10, 0.208333) 37row 9: (0, 0.559184) (1, 0.887717) (2, 0.559012) (4, 0.559267) (5, 0.88763) (6, 0.559046) (8, 0.20841) (9, 0.346073) (10, 0.208333) 38row 10: (0, 0.208413) (1, 0.738249) (2, 0.738021) (4, 0.208534) (5, 0.738178) (6, 0.738121) (7, 0.208333) (9, 0.20835) (10, 0.208386) 39row 11: (1, 0.559218) (2, 0.887699) (3, 0.559056) (5, 0.559158) (6, 0.887784) (7, 0.5591) (9, 0.208333) (10, 0.346196) (11, 0.208346) 40row 12: (1, 0.429785) (2, 0.843175) (3, 0.843) (5, 0.429762) (6, 0.843266) (7, 0.843129) (9, 0.208333) (10, 0.429776) (11, 0.429687) 41row 13: (1, 0.352972) (2, 0.738132) (3, 0.939009) (5, 0.35293) (6, 0.738143) (7, 0.939094) (10, 0.454094) (11, 0.580267) (15, 0.208333) 42row 14: (0, 0.738064) (1, 0.546063) (4, 1.) (5, 0.73814) (6, 0.290745) (8, 0.73802) (9, 0.546183) (10, 0.208333) (12, 0.290651) 43row 15: (0, 0.559272) (1, 0.559165) (2, 0.208372) (4, 0.887804) (5, 0.887667) (6, 0.346115) (8, 0.559062) (9, 0.558996) (10, 0.208333) 44row 16: (0, 0.208354) (1, 0.468432) (2, 0.208333) (4, 0.468644) (5, 1.) (6, 0.46845) (8, 0.208474) (9, 0.46846) (10, 0.208419) 45row 17: (1, 0.558937) (2, 0.558961) (4, 0.346094) (5, 0.887616) (6, 0.887667) (7, 0.346066) (8, 0.208333) (9, 0.558967) (10, 0.559128) 46row 18: (1, 0.208598) (2, 0.46882) (3, 0.2086) (5, 0.468579) (6, 1.) (7, 0.468643) (9, 0.208333) (10, 0.468512) (11, 0.208456) 47row 19: (1, 0.208547) (2, 0.559396) (3, 0.559212) (5, 0.34628) (6, 0.887794) (7, 0.887609) (9, 0.208333) (10, 0.559082) (11, 0.558955) 48row 20: (2, 0.546208) (3, 0.738115) (5, 0.290678) (6, 0.738061) (7, 1.) (10, 0.546016) (11, 0.737949) (14, 0.208333) (15, 0.290752) 49row 21: (0, 0.447611) (1, 0.307968) (4, 0.912453) (5, 0.641109) (8, 0.912292) (9, 0.641072) (10, 0.208333) (12, 0.447334) (13, 0.307848) 50row 22: (0, 0.208343) (4, 0.738166) (5, 0.738135) (6, 0.208333) (8, 0.738213) (9, 0.738209) (10, 0.208422) (12, 0.208343) (13, 0.208379) 51row 23: (1, 0.346027) (4, 0.559217) (5, 0.887657) (6, 0.558886) (8, 0.559272) (9, 0.887657) (10, 0.559024) (13, 0.346123) (14, 0.208333) 52row 24: (1, 0.208333) (4, 0.208467) (5, 0.73816) (6, 0.737905) (8, 0.208498) (9, 0.738044) (10, 0.738054) (13, 0.20838) (14, 0.208394) 53row 25: (2, 0.346183) (3, 0.208333) (5, 0.559034) (6, 0.887665) (7, 0.559037) (9, 0.558802) (10, 0.887575) (11, 0.558987) (14, 0.346073) 54row 26: (2, 0.208411) (3, 0.208364) (5, 0.208333) (6, 0.738036) (7, 0.738055) (10, 0.738073) (11, 0.738108) (14, 0.208498) (15, 0.208455) 55row 27: (2, 0.308005) (3, 0.447459) (5, 0.208333) (6, 0.641004) (7, 0.912299) (10, 0.641069) (11, 0.912408) (14, 0.30819) (15, 0.447741) 56row 28: (0, 0.290682) (4, 0.738022) (5, 0.546165) (8, 1.) (9, 0.738262) (10, 0.290824) (12, 0.738035) (13, 0.546147) (14, 0.208333) 57row 29: (4, 0.559053) (5, 0.559089) (6, 0.208333) (8, 0.887753) (9, 0.887828) (10, 0.346277) (12, 0.559147) (13, 0.559227) (14, 0.208464) 58row 30: (4, 0.208622) (5, 0.46859) (6, 0.208333) (8, 0.46897) (9, 1.) (10, 0.468527) (12, 0.208586) (13, 0.468698) (14, 0.2085) 59row 31: (4, 0.208333) (5, 0.558986) (6, 0.558832) (8, 0.346243) (9, 0.887609) (10, 0.887658) (11, 0.346068) (13, 0.559189) (14, 0.559194) 60row 32: (5, 0.208436) (6, 0.4684) (7, 0.208333) (9, 0.468414) (10, 1.) (11, 0.468523) (13, 0.208485) (14, 0.46871) (15, 0.208427) 61row 33: (5, 0.208375) (6, 0.559108) (7, 0.559015) (9, 0.34604) (10, 0.88771) (11, 0.887608) (13, 0.208333) (14, 0.559151) (15, 0.558958) 62row 34: (3, 0.290645) (6, 0.546014) (7, 0.737939) (9, 0.29063) (10, 0.738047) (11, 1.) (13, 0.208333) (14, 0.546292) (15, 0.738211) 63row 35: (0, 0.208333) (4, 0.580337) (5, 0.454107) (8, 0.93905) (9, 0.738114) (10, 0.352973) (12, 0.939053) (13, 0.738005) (14, 0.352921) 64row 36: (4, 0.429789) (5, 0.429775) (6, 0.208333) (8, 0.843241) (9, 0.843222) (10, 0.42976) (12, 0.843077) (13, 0.843054) (14, 0.429662) 65row 37: (4, 0.208521) (5, 0.34627) (6, 0.208333) (8, 0.559433) (9, 0.887776) (10, 0.559113) (12, 0.559206) (13, 0.887661) (14, 0.558996) 66row 38: (5, 0.208462) (8, 0.208646) (9, 0.738187) (10, 0.738073) (11, 0.208387) (12, 0.208529) (13, 0.738348) (14, 0.738114) (15, 0.208333) 67row 39: (5, 0.208447) (6, 0.346155) (7, 0.208333) (9, 0.559135) (10, 0.887771) (11, 0.559138) (13, 0.559183) (14, 0.887693) (15, 0.558947) 68row 40: (5, 0.208333) (6, 0.429596) (7, 0.429568) (9, 0.429635) (10, 0.843104) (11, 0.843104) (13, 0.429797) (14, 0.843277) (15, 0.843105) 69row 41: (3, 0.208333) (6, 0.454112) (7, 0.580345) (9, 0.35289) (10, 0.738079) (11, 0.939124) (13, 0.352973) (14, 0.738139) (15, 0.939046) 70row 42: (4, 0.468458) (5, 0.385298) (6, 0.208333) (8, 0.82573) (9, 0.684987) (10, 0.385326) (12, 1.) (13, 0.825702) (14, 0.468437) 71row 43: (4, 0.353048) (5, 0.353083) (6, 0.208333) (8, 0.738201) (9, 0.738269) (10, 0.454248) (12, 0.939002) (13, 0.939056) (14, 0.580315) 72row 44: (5, 0.290696) (8, 0.54613) (9, 0.738085) (10, 0.546144) (11, 0.208333) (12, 0.737983) (13, 1.) (14, 0.738026) (15, 0.290695) 73row 45: (5, 0.208333) (8, 0.308137) (9, 0.641028) (10, 0.640962) (11, 0.307951) (12, 0.447647) (13, 0.912509) (14, 0.91227) (15, 0.447392) 74row 46: (6, 0.290737) (7, 0.208333) (9, 0.546069) (10, 0.738171) (11, 0.546307) (12, 0.290631) (13, 0.738036) (14, 1.) (15, 0.738087) 75row 47: (5, 0.208333) (6, 0.352981) (7, 0.353021) (9, 0.454066) (10, 0.738111) (11, 0.738235) (13, 0.580343) (14, 0.939061) (15, 0.939056) 76row 48: (5, 0.208333) (6, 0.385246) (7, 0.468469) (9, 0.385182) (10, 0.684893) (11, 0.825826) (13, 0.46843) (14, 0.825732) (15, 1.) 77row 49: (4, 0.355468) (5, 0.298602) (8, 0.691885) (9, 0.588083) (10, 0.355493) (12, 0.958075) (13, 0.813237) (14, 0.498605) (15, 0.208333) 78row 50: (4, 0.208403) (5, 0.208401) (8, 0.559208) (9, 0.559201) (10, 0.346195) (12, 0.887731) (13, 0.88766) (14, 0.559013) (15, 0.208333) 79row 51: (5, 0.208333) (8, 0.45424) (9, 0.580404) (10, 0.454141) (11, 0.208338) (12, 0.738141) (13, 0.939067) (14, 0.737951) (15, 0.352886) 80row 52: (5, 0.208333) (8, 0.346217) (9, 0.559113) (10, 0.559082) (11, 0.346123) (12, 0.559123) (13, 0.887747) (14, 0.88757) (15, 0.558927) 81row 53: (6, 0.208333) (8, 0.208407) (9, 0.454186) (10, 0.580456) (11, 0.454279) (12, 0.352989) (13, 0.738168) (14, 0.93906) (15, 0.738051) 82row 54: (6, 0.208341) (7, 0.208333) (9, 0.346172) (10, 0.55916) (11, 0.559185) (12, 0.208391) (13, 0.559226) (14, 0.887733) (15, 0.887601) 83row 55: (6, 0.298527) (7, 0.3554) (9, 0.355423) (10, 0.588017) (11, 0.69191) (12, 0.208333) (13, 0.498726) (14, 0.813326) (15, 0.95804) 84