! #1/20 1200792745 0 0 100644 596 ` __.SYMDEF SORTED NN5HA[U{qxypkPx) ; 8S ChD&>8eih_amd_aat_amd_1_amd_2_amd_postorder_amd_post_tree_amd_defaults_amd_order_amd_control_amd_info_amd_valid_amd_l_aat_amd_l1_amd_l2_amd_l_postorder_amd_l_post_tree_amd_l_defaults_amd_l_order_amd_l_control_amd_l_info_amd_l_valid_amd_preprocess_amd_preprocess_valid_amd_wpreprocess_amd_l_preprocess_amd_l_preprocess_valid_amd_l_wpreprocess#1/20 1200792736 0 0 100644 1572 ` amd_i_aat.o H__text__TEXT __data__DATAg__literal8__TEXTl__textcoal_nt__TEXT @$ PUSD}tDE}~$E U EԋUEE;E|U؉ЍEE؃EEUЍE EEE;E|tU؉ЍE EU؉E EEEE;E|UЍEEE;E}.UЍEU؉ЍEEE;EEEԃUE E܋UЍEEE;E|_UЍEEE;E}.UЍEUЍEE뫋E;Eu EEЃUЍ UE U؉Ѝ UE E؃EE;E|}UЍEEUE PE;|CUЍEEUЍEUЍEE룍EyE;EuE"E*ȋUԋE)*^f(EEEE;E|U؉ЍEEE؃׃}t\UE*EE*EEEE *EE(*EEȃD[]?$;  J 0  _amd_aat___i686.get_pc_thunk.bx #1/20 1200792736 0 0 100644 1868 ` amd_i_1.o kk__text__TEXTJ|__data__DATAJZ__picsymbolstub2__TEXTJZ__la_sym_ptr2__DATAcs__textcoal_nt__TEXTgw @@ PUWVUЍE )ЉEE$EEEȋUЍEEEċUЍEEEUЍEEEUЍEEEUЍEEEUЍEEE̋UЍEEĉEEEEEE;E|IUЍ UȋE UЍ UE UЍEEEEE;E|UЍE E؋UE EԋE؉EE;E|lUЍEEE;E}\UЍ4M1‰Ѝ<ŰE:1UЍ4M1‰Ѝ<ŰE:1EE;EEUE EЋUЍEE܋E;E|U܉ЍEEE;E}_UЍ4M1‰Ѝ<ŰE:1UЍ4M1‰Ѝ<ŰE:1E܃wE;EuE܃UЍ UE܉ UЍ UE E)EE;E|UЍEE܋UE PE;|tU܉ЍEEUЍ4M1‰Ѝ<ŰE:1UЍ4M1‰Ѝ<ŰE:1E܃rEEE,D$8E(D$4ED$0ED$,ED$(ED$$ED$ ED$EĉD$ED$ED$ED$ ẺD$EȉD$E$ Đ^_]⍀PW$< cOcO g9 _amd_1___i686.get_pc_thunk.axdyld_stub_binding_helper_amd_2 #1/20 1200792736 0 0 100644 9956 ` amd_i_2.o8 !T!__text__TEXTd!T($/__data__DATAd!#__literal8__TEXTh!(#__picsymbolstub2__TEXT!2#% __la_sym_ptr2__DATA!$&__textcoal_nt__TEXT!$ @ &h&h P&UWVSW!W!8W!(W! _!EDžpEDž\EE+Ex}<t:E<E<W!f.Tg!DžTW!f.w EX/*E$p ݝY,XX} DžXX;E~ UXEE;E|UȉЍE(UȉЍE,UȉЍE$UȉЍE UȉЍE8UȉЍE0UȉЍ u4UȉЍEEȃ@Dž`EE;E|+UȉЍE4E}uMUȉЍE0EUȉЍE UȉЍE8E;X~S`UȉЍE UȉЍE0EUȉЍE ZUЍE,E}tUЍ U(Eȉ UȉЍ U$E UЍ U,Eȉ EȃE;E|EEE;E|%UЍE,E}tEыEEUЍE$E}tUЍE(UЍ U,E UЍE0EЋUЍE EUEUЍ U E؉ E}fUЍE UЍE9~pЍEEȋUȉЍE E}UEUȉЍ U E؉ Ѝ UEȉ UȉЍE(EċUȉЍE$E}tUЍ U(Eĉ }tUĉЍ U$E $UȉЍE4Ѝ U,E UЍE EUЍ EUЋ)Љ|EEЃ9E~E;E~EEԋ|EP‰ЍEEԍUԉЍE UԉЍEEEE;E~8‰ЍEEȍUȉЍE E}E;EUЍ U  UЍ<uUЍ EU)Љ>UЍE<uUЍE UԉЍ U  UԉЍ4MUE)Љ1UԉЍE<uUԉЍE \EE;E|mUЍE xDUЍ u ЍEЍ UE؃ EDžDž;~‰ЍE؃E}xЍ uUЍE UЍ U  UЍEEEE9E~K‰Ѝ u‰ЍEE먋E9~@‰Ѝ uЍE밋EUԉЍE UЍE UEUȉЍ U E؉ E‰Ѝ UEȉ EUȉЍE(EċUȉЍE$E}tUЍ U(Eĉ }tUĉЍ U$E $UȉЍE4Ѝ U,E EE;Et0UԉЍ U E؃ UԉЍE8EEUЍ U4E UЍ U  UЍ4M)Ѓ1UЍ U0EE؃ p;x|]Džhh;E|UUE)ЉE;~pЍEEȋUȉЍE ؉E})UȉЍ U E UȉЍ U4E +EEUE)Љ;M~ E䉅UUЍE,E}tUЍ U(Eȉ UȉЍ U$E UȉЍE(UЍ U,Eȉ M䉍;E~ UMUȉЍ U4E ‰Ѝ UEȉ }UЍ U E UЍ4M)Љ1UЍE<u,UЍE UЍE8}t E}@*EH`E*@Hf(X@f.w݅ݝHX@݅ݝHf(Y@H_!\f(f(YHo!^f(XX8X8HY@f(Y@H_!\f(Y@YHf(XH_!\f(f(YHHf(Xȍ_!\f(f(Yȍw!^f(X0(X0(0f(Xo!^ X }@ *`H*`f.w݅ݝ*`݅ݝH_!\f(f(YHo!^f(X8X8H_!\f(f(YHHf(Xȍ_!\f(f(Yȍw!^f(0(X0(0f(Xo!^ X E@HE@P8E@X E@`(E@0*`E@hE@@*\U@W!EE;E|ZUȉЍ4M UȉЍE ؃1UȉЍ4M0UȉЍE0؃1EȃEE;E|UȉЍE <UȉЍE E}uUЍE <tUЍE EҋEEԋEȉEUЍE <t2UЍE EUЍ U Eԉ EE뷍Eȃ+E(D$E$D$E,D$E8D$E0D$ E D$E D$E$EE;E|4UЍE,UЍE$EEE;E|8UԉЍE8E}tUЍ U,Eԉ EԃEEE;E|QUЍE,Eԃ}u4UԉЍ U$E UԉЍE EEEE;E|UȉЍE <uoUȉЍE Eԃ}t9UȉЍ u$UԉЍE$UԉЍE$UȉЍ U$E EEȃdEE;E|2UȉЍE$EUЍ U(Eȉ EȃāĜ[^_]?$@@@k-⍀-PWR⍀P>!!$Ë$xh!J!!p!p!j!Lp!!w!]p!/p!p!!mp!5h!x!h![p!Ih!7h!%h!h!  . (!! !!  !!!!  !!Q`8_amd_2___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_amd_postorder_sqrt#1/20 1200792736 0 0 100644 172 ` amd_i_dump.o| |__text__TEXT#1/28 1200792736 0 0 100644 1508 ` amd_i_postorder.o __text__TEXT__data__DATA__picsymbolstub2__TEXT__la_sym_ptr2__DATA8__textcoal_nt__TEXT @HxP P@UVTEE;E|4UЍEUЍE E‹EE}yqUЍE<~TUЍE E}t9UЍ u UЍEUЍ UE E(EE;E|:UЍE<UЍE<EEEEUЍEE}uLUЍEEE;E|EE؋E܉EԋEEЋEE܋UЍE E묋UЉЍE Ẽ}t]}uUЍ UẺ UԉЍ U Ẻ UЉЍE U܉Ѝ U EЉ EEE;E|UЍEEEEE;E|cUЍE <uFUЍE<~1E$D$ED$E D$ ED$ED$E$EE듃T^]/⍀P$  A(_amd_postorder___i686.get_pc_thunk.axdyld_stub_binding_helper_amd_post_tree#1/28 1200792737 0 0 100644 612 ` amd_i_post_tree.o |%%__text__TEXT%(4 PUEUE}yUЍEEUЍE<UЍEE}uEUЍEEۋEEUЍEE}u4E‰Ѝ UE E(UЍEEċUЍEE(UЍ UE  E E _amd_post_tree #1/20 1200792737 0 0 100644 740 ` amd_i_defaults.o H__text__TEXTpX__data__DATAp<__literal8__TEXTp<__textcoal_nt__TEXTT @( PUS}tXE}~$E Ud EԋUlUt[]$@?$^ Jx 0p  _amd_defaults___i686.get_pc_thunk.bx#1/20 1200792737 0 0 100644 2540 ` amd_i_order.o8 ITI__text__TEXTrT!__data__DATAr__literal8__TEXTx8__picsymbolstub2__TEXT}__la_sym_ptr2__DATA-__textcoal_nt__TEXTA @ T P USd}E؃}tSE}~$E Ul EԋE*EUt}t} t}t}x#}tU|E}u EUЍE E}tE*E}y#}tU|EU*M荃f(Y*MYf(Xȍf.w#}tUlEED$ E D$ED$E$yu#}tU|EUЉ$&E}u#}tUlEhED$ED$ED$ ED$E D$E$EMgfff)‰EMUЍE}t&U8*M*EXȍYUЉ$ZE}u.E$}tUlEUЉMU)ȉE܋UE)ED$$ED$ ED$ED$ED$E܉D$ED$ ED$E D$E$dE$rE$gEEԃd[]333333@ @A@Kx⍀xP72c⍀cPN⍀NP9⍀9P$⍀$P!$Ë$^SHx ~ +x  cx H 2    f =x  y s=k=e ` Z9R9L G A5953 . (1 1  --  $A EUbs\k<_amd_order___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_amd_1_free_amd_aat_malloc_amd_valid #1/20 1200792737 0 0 100644 1724 ` amd_i_control.o| }}__text__TEXT__data__DATAw__cstring__TEXTax__literal8__TEXTH__picsymbolstub2__TEXTX__la_sym_ptr2__DATAq __textcoal_nt__TEXTu  @D` PUS$}t4EEE<f.EDEEED$$M<f.w)$ED$T$}t$$$[] amd: approximate minimum degree ordering, parameters: dense row parameter: %g no rows treated as dense (rows with more than max (%g * sqrt (n), 16) entries are considered "dense", and placed last in output permutation) aggressive absorption: yes aggressive absorption: no $@⍀Pe$Ë$   ` 5 |H qi HP *H   q]q] &uyW>_amd_control___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_printf #1/20 1200792737 0 0 100644 4948 ` amd_i_info.o|   __text__TEXTzx__data__DATAz__cstring__TEXT9__literal8__TEXT (X__picsymbolstub2__TEXT h__la_sym_ptr2__DATA __textcoal_nt__TEXT  @\ PUSt}u]EEEPEEXEE`E؋EHEM f.s(MЍ f.sEXEE ]E]ȍt$( E f.zt$ dE f.zt$ 9E f.zt$ $ M f.sED$$i E f.sED$4$/ E f.sED$t$ E  f.sE D$$ E( f.sE(D$$ E0 f.sE0D$4$G E8 f.sE8D$t$ E@ f.sE@D$$$MЍ f.sED$$Mȍ f.sED$4 $eM荃 f.sED$t $5M f.sED$ $M؍ f.sED$ $Eh f.sEhD$4 $M f.s M荃 f.sM f.sM؍ f.sM荃 f(YM؍ YXD$$EXXED$M荃 f(YM YXD$EXXED$ Ef(XMEXXD$t $tt[] amd: approximate minimum degree ordering, results: status: OK out of memory invalid matrix unknown n, dimension of A: %.20g nz, number of nonzeros in A: %.20g symmetry of A: %.4f number of nonzeros on diagonal: %.20g nonzeros in pattern of A+A' (excl. diagonal): %.20g # dense rows/columns of A+A': %.20g memory used, in bytes: %.20g # of memory compactions: %.20g The following approximate statistics are for a subsequent factorization of A(P,P) + A(P,P)'. They are slight upper bounds if there are no dense rows/columns in A+A', and become looser if dense rows/columns exist. nonzeros in L (excluding diagonal): %.20g nonzeros in L (including diagonal): %.20g # divide operations for LDL' or LU: %.20g # multiply-subtract operations for LDL': %.20g # multiply-subtract operations for LU: %.20g max nz. in any column of L (incl. diagonal): %.20g chol flop count for real A, sqrt counted as 1 flop: %.20g LDL' flop count for real A: %.20g LDL' flop count for complex A: %.20g LU flop count for real A (with no pivoting): %.20g LU flop count for complex A (with no pivoting): %.20g "@ @⍀P $Ë$ph       n T IA@        w@ Z OG *       @ s c[ 9 )!    @  {s V KC ;3     i      #  T;_amd_info___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_printf#1/20 1200792737 0 0 100644 572 ` amd_i_valid.o |  __text__TEXT  PU(}x} x EU ЍEEE8u}x EEE;E |UЍEEUEEE;E~ EgEEE܋E;E|>U܉ЍEEE;E~ E;E} E EEE܃븍EWEE_amd_valid#1/20 1200792738 0 0 100644 1572 ` amd_l_aat.o H__text__TEXT __data__DATAg__literal8__TEXTl__textcoal_nt__TEXT @$ PUSD}tDE}~$E U EԋUEE;E|U؉ЍEE؃EEUЍE EEE;E|tU؉ЍE EU؉E EEEE;E|UЍEEE;E}.UЍEU؉ЍEEE;EEEԃUE E܋UЍEEE;E|_UЍEEE;E}.UЍEUЍEE뫋E;Eu EEЃUЍ UE U؉Ѝ UE E؃EE;E|}UЍEEUE PE;|CUЍEEUЍEUЍEE룍EyE;EuE"E*ȋUԋE)*^f(EEEE;E|U؉ЍEEE؃׃}t\UE*EE*EEEE *EE(*EEȃD[]?$;  J 0  _amd_l_aat___i686.get_pc_thunk.bx #1/20 1200792738 0 0 100644 1868 ` amd_l_1.o kk__text__TEXTJ|__data__DATAJZ__picsymbolstub2__TEXTJZ__la_sym_ptr2__DATAcs__textcoal_nt__TEXTgw @D PUWVUЍE )ЉEE$EEEȋUЍEEEċUЍEEEUЍEEEUЍEEEUЍEEEUЍEEE̋UЍEEĉEEEEEE;E|IUЍ UȋE UЍ UE UЍEEEEE;E|UЍE E؋UE EԋE؉EE;E|lUЍEEE;E}\UЍ4M1‰Ѝ<ŰE:1UЍ4M1‰Ѝ<ŰE:1EE;EEUE EЋUЍEE܋E;E|U܉ЍEEE;E}_UЍ4M1‰Ѝ<ŰE:1UЍ4M1‰Ѝ<ŰE:1E܃wE;EuE܃UЍ UE܉ UЍ UE E)EE;E|UЍEE܋UE PE;|tU܉ЍEEUЍ4M1‰Ѝ<ŰE:1UЍ4M1‰Ѝ<ŰE:1E܃rEEE,D$8E(D$4ED$0ED$,ED$(ED$$ED$ ED$EĉD$ED$ED$ED$ ẺD$EȉD$E$ Đ^_]⍀PW$< cOcO  g:!_amd_l1___i686.get_pc_thunk.axdyld_stub_binding_helper_amd_l2#1/20 1200792738 0 0 100644 9964 ` amd_l_2.o8 !T!__text__TEXTd!T($/__data__DATAd!#__literal8__TEXTh!(#__picsymbolstub2__TEXT!2#% __la_sym_ptr2__DATA!$&__textcoal_nt__TEXT!$ @ &h&l P&UWVSW!W!8W!(W! _!EDžpEDž\EE+Ex}<t:E<E<W!f.Tg!DžTW!f.w EX/*E$p ݝY,XX} DžXX;E~ UXEE;E|UȉЍE(UȉЍE,UȉЍE$UȉЍE UȉЍE8UȉЍE0UȉЍ u4UȉЍEEȃ@Dž`EE;E|+UȉЍE4E}uMUȉЍE0EUȉЍE UȉЍE8E;X~S`UȉЍE UȉЍE0EUȉЍE ZUЍE,E}tUЍ U(Eȉ UȉЍ U$E UЍ U,Eȉ EȃE;E|EEE;E|%UЍE,E}tEыEEUЍE$E}tUЍE(UЍ U,E UЍE0EЋUЍE EUEUЍ U E؉ E}fUЍE UЍE9~pЍEEȋUȉЍE E}UEUȉЍ U E؉ Ѝ UEȉ UȉЍE(EċUȉЍE$E}tUЍ U(Eĉ }tUĉЍ U$E $UȉЍE4Ѝ U,E UЍE EUЍ EUЋ)Љ|EEЃ9E~E;E~EEԋ|EP‰ЍEEԍUԉЍE UԉЍEEEE;E~8‰ЍEEȍUȉЍE E}E;EUЍ U  UЍ<uUЍ EU)Љ>UЍE<uUЍE UԉЍ U  UԉЍ4MUE)Љ1UԉЍE<uUԉЍE \EE;E|mUЍE xDUЍ u ЍEЍ UE؃ EDžDž;~‰ЍE؃E}xЍ uUЍE UЍ U  UЍEEEE9E~K‰Ѝ u‰ЍEE먋E9~@‰Ѝ uЍE밋EUԉЍE UЍE UEUȉЍ U E؉ E‰Ѝ UEȉ EUȉЍE(EċUȉЍE$E}tUЍ U(Eĉ }tUĉЍ U$E $UȉЍE4Ѝ U,E EE;Et0UԉЍ U E؃ UԉЍE8EEUЍ U4E UЍ U  UЍ4M)Ѓ1UЍ U0EE؃ p;x|]Džhh;E|UUE)ЉE;~pЍEEȋUȉЍE ؉E})UȉЍ U E UȉЍ U4E +EEUE)Љ;M~ E䉅UUЍE,E}tUЍ U(Eȉ UȉЍ U$E UȉЍE(UЍ U,Eȉ M䉍;E~ UMUȉЍ U4E ‰Ѝ UEȉ }UЍ U E UЍ4M)Љ1UЍE<u,UЍE UЍE8}t E}@*EH`E*@Hf(X@f.w݅ݝHX@݅ݝHf(Y@H_!\f(f(YHo!^f(XX8X8HY@f(Y@H_!\f(Y@YHf(XH_!\f(f(YHHf(Xȍ_!\f(f(Yȍw!^f(X0(X0(0f(Xo!^ X }@ *`H*`f.w݅ݝ*`݅ݝH_!\f(f(YHo!^f(X8X8H_!\f(f(YHHf(Xȍ_!\f(f(Yȍw!^f(0(X0(0f(Xo!^ X E@HE@P8E@X E@`(E@0*`E@hE@@*\U@W!EE;E|ZUȉЍ4M UȉЍE ؃1UȉЍ4M0UȉЍE0؃1EȃEE;E|UȉЍE <UȉЍE E}uUЍE <tUЍE EҋEEԋEȉEUЍE <t2UЍE EUЍ U Eԉ EE뷍Eȃ+E(D$E$D$E,D$E8D$E0D$ E D$E D$E$EE;E|4UЍE,UЍE$EEE;E|8UԉЍE8E}tUЍ U,Eԉ EԃEEE;E|QUЍE,Eԃ}u4UԉЍ U$E UԉЍE EEEE;E|UȉЍE <uoUȉЍE Eԃ}t9UȉЍ u$UԉЍE$UԉЍE$UȉЍ U$E EEȃdEE;E|2UȉЍE$EUЍ U(Eȉ EȃāĜ[^_]?$@@@k-⍀-PWR⍀P>!!$Ë$xh!J!!p!p!j!Lp!!w!]p!/p!p!!mp!5h!x!h![p!Ih!7h!%h!h!  . (!! !!  !!!! !! !Rc9_amd_l2___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_amd_l_postorder_sqrt #1/20 1200792738 0 0 100644 172 ` amd_l_dump.o| |__text__TEXT#1/28 1200792738 0 0 100644 1516 ` amd_l_postorder.o __text__TEXT__data__DATA__picsymbolstub2__TEXT__la_sym_ptr2__DATA8__textcoal_nt__TEXT @HxT P@UVTEE;E|4UЍEUЍE E‹EE}yqUЍE<~TUЍE E}t9UЍ u UЍEUЍ UE E(EE;E|:UЍE<UЍE<EEEEUЍEE}uLUЍEEE;E|EE؋E܉EԋEEЋEE܋UЍE E묋UЉЍE Ẽ}t]}uUЍ UẺ UԉЍ U Ẻ UЉЍE U܉Ѝ U EЉ EEE;E|UЍEEEEE;E|cUЍE <uFUЍE<~1E$D$ED$E D$ ED$ED$E$EE듃T^]/⍀P$  C*_amd_l_postorder___i686.get_pc_thunk.axdyld_stub_binding_helper_amd_l_post_tree #1/28 1200792738 0 0 100644 612 ` amd_l_post_tree.o |%%__text__TEXT%(4 PUEUE}yUЍEEUЍE<UЍEE}uEUЍEEۋEEUЍEE}u4E‰Ѝ UE E(UЍEEċUЍEE(UЍ UE  E E _amd_l_post_tree#1/20 1200792739 0 0 100644 748 ` amd_l_defaults.o H__text__TEXTpX__data__DATAp<__literal8__TEXTp<__textcoal_nt__TEXTT @, PUS}tXE}~$E Ud EԋUlUt[]$@?$^ Jx 0p  _amd_l_defaults___i686.get_pc_thunk.bx #1/20 1200792739 0 0 100644 2548 ` amd_l_order.o8 ITI__text__TEXTrT!__data__DATAr__literal8__TEXTx8__picsymbolstub2__TEXT}__la_sym_ptr2__DATA-__textcoal_nt__TEXTA @ T P USd}E؃}tSE}~$E Ul EԋE*EUt}t} t}t}x#}tU|E}u EUЍE E}tE*E}y#}tU|EU*M荃f(Y*MYf(Xȍf.w#}tUlEED$ E D$ED$E$yu#}tU|EUЉ$&E}u#}tUlEhED$ED$ED$ ED$E D$E$EMgfff)‰EMUЍE}t&U8*M*EXȍYUЉ$ZE}u.E$}tUlEUЉMU)ȉE܋UE)ED$$ED$ ED$ED$ED$E܉D$ED$ ED$E D$E$dE$rE$gEEԃd[]333333@ @A@Kx⍀xP72c⍀cPN⍀NP9⍀9P$⍀$P!$Ë$^SHx ~ +x  cx H 2    f =x  y s=k=e ` Z9R9L G A5953 . (1 1  --  &AEWex_p>_amd_l_order___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_amd_l1_free_amd_l_aat_malloc_amd_l_valid #1/20 1200792739 0 0 100644 1724 ` amd_l_control.o| }}__text__TEXT__data__DATAw__cstring__TEXTax__literal8__TEXTH__picsymbolstub2__TEXTX__la_sym_ptr2__DATAq __textcoal_nt__TEXTu  @Dd PUS$}t4EEE<f.EDEEED$$M<f.w)$ED$T$}t$$$[] amd: approximate minimum degree ordering, parameters: dense row parameter: %g no rows treated as dense (rows with more than max (%g * sqrt (n), 16) entries are considered "dense", and placed last in output permutation) aggressive absorption: yes aggressive absorption: no $@⍀Pe$Ë$   ` 5 |H qi HP *H   q]q] (uyY@_amd_l_control___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_printf#1/20 1200792739 0 0 100644 4956 ` amd_l_info.o|   __text__TEXTzx__data__DATAz__cstring__TEXT9__literal8__TEXT (X__picsymbolstub2__TEXT h__la_sym_ptr2__DATA __textcoal_nt__TEXT  @` PUSt}u]EEEPEEXEE`E؋EHEM f.s(MЍ f.sEXEE ]E]ȍt$( E f.zt$ dE f.zt$ 9E f.zt$ $ M f.sED$$i E f.sED$4$/ E f.sED$t$ E  f.sE D$$ E( f.sE(D$$ E0 f.sE0D$4$G E8 f.sE8D$t$ E@ f.sE@D$$$MЍ f.sED$$Mȍ f.sED$4 $eM荃 f.sED$t $5M f.sED$ $M؍ f.sED$ $Eh f.sEhD$4 $M f.s M荃 f.sM f.sM؍ f.sM荃 f(YM؍ YXD$$EXXED$M荃 f(YM YXD$EXXED$ Ef(XMEXXD$t $tt[] amd: approximate minimum degree ordering, results: status: OK out of memory invalid matrix unknown n, dimension of A: %.20g nz, number of nonzeros in A: %.20g symmetry of A: %.4f number of nonzeros on diagonal: %.20g nonzeros in pattern of A+A' (excl. diagonal): %.20g # dense rows/columns of A+A': %.20g memory used, in bytes: %.20g # of memory compactions: %.20g The following approximate statistics are for a subsequent factorization of A(P,P) + A(P,P)'. They are slight upper bounds if there are no dense rows/columns in A+A', and become looser if dense rows/columns exist. nonzeros in L (excluding diagonal): %.20g nonzeros in L (including diagonal): %.20g # divide operations for LDL' or LU: %.20g # multiply-subtract operations for LDL': %.20g # multiply-subtract operations for LU: %.20g max nz. in any column of L (incl. diagonal): %.20g chol flop count for real A, sqrt counted as 1 flop: %.20g LDL' flop count for real A: %.20g LDL' flop count for complex A: %.20g LU flop count for real A (with no pivoting): %.20g LU flop count for complex A (with no pivoting): %.20g "@ @⍀P $Ë$ph       n T IA@        w@ Z OG *       @ s c[ 9 )!    @  {s V KC ;3     i      %  V=_amd_l_info___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_printf #1/20 1200792739 0 0 100644 580 ` amd_l_valid.o |  __text__TEXT  PU(}x} x EU ЍEEE8u}x EEE;E |UЍEEUEEE;E~ EgEEE܋E;E|>U܉ЍEEE;E~ E;E} E EEE܃븍EWEE_amd_l_valid #1/28 1200792737 0 0 100644 2348 ` amd_i_preprocess.o __text__TEXT~__data__DATA~__picsymbolstub2__TEXT~d@__la_sym_ptr2__DATA__textcoal_nt__TEXT @@x P UHED$E D$E$t }t}u EEE}}EEEE$OE}u EEE}}EEEE$E}uE$ERED$ED$ED$ED$ ED$E D$E$E$E$EEUWVEE;E|4UЍEUЍE EEE;E|UE EUЍE EE;E|\UЍEEUЍE ;Et(UЍEUЍ U E E뚍EWEEE;E|?UExUЍ uUЍEEEE;E|BUЍ uUЍEUЍE EEE;E|UE EUЍE EE;E|sUЍEEUЍE ;Et?UЍ4M1‰Ѝ<UE:1UЍ U E E냍E@^_]ÐUV$}x }t} u EUЍE EE 8u}x EEE;E|8UЍ u UE P;~ EVEEE;E|6UЍEE}x E;E} EEEE$^]}_⍀_PidJ⍀JPPK5⍀5P72 ⍀ P$]` ZRL G A93 . (    8"ioP_amd_preprocess_amd_wpreprocess_amd_preprocess_valid___i686.get_pc_thunk.axdyld_stub_binding_helper_free_malloc #1/28 1200792739 0 0 100644 2356 ` amd_l_preprocess.o __text__TEXT~__data__DATA~__picsymbolstub2__TEXT~d@__la_sym_ptr2__DATA__textcoal_nt__TEXT @@ P UHED$E D$E$t }t}u EEE}}EEEE$OE}u EEE}}EEEE$E}uE$ERED$ED$ED$ED$ ED$E D$E$E$E$EEUWVEE;E|4UЍEUЍE EEE;E|UE EUЍE EE;E|\UЍEEUЍE ;Et(UЍEUЍ U E E뚍EWEEE;E|?UExUЍ uUЍEEEE;E|BUЍ uUЍEUЍE EEE;E|UE EUЍE EE;E|sUЍEEUЍE ;Et?UЍ4M1‰Ѝ<UE:1UЍ U E E냍E@^_]ÐUV$}x }t} u EUЍE EE 8u}x EEE;E|8UЍ u UE P;~ EVEEE;E|6UЍEE}x E;E} EEEE$^]}_⍀_PidJ⍀JPPK5⍀5P72 ⍀ P$]` ZRL G A93 . (    >&ouV_amd_l_preprocess_amd_l_wpreprocess_amd_l_preprocess_valid___i686.get_pc_thunk.axdyld_stub_binding_helper_free_malloc