| 5G5G__text__TEXT*I$__data__DATA*U-__cstring__TEXT*X-__literal8__TEXTFPXI__picsymbolstub2__TEXTGIb__la_sym_ptr2__DATA)GI c__textcoal_nt__TEXT-GI @0cxcx P(cUS4EEEEMFf.wM荃Ff.+ED$*$FMFf.sED$E $~F*$nFM荃Ff.sED$E $AF*$1FMFf.swM荃Ff.s`MFf.uz%E^EEFYEE F]E\$*$E*$E4[]ÐUSm}t7EUf.ztE,DDžD DžDDX} (X(`)D$})$D)$D)$D *$D4*$Dm*$D*$D*$D*$DE ,dE ,``@@;d~ d@@\*d=Ef.wdD$ +$D*`=Ef.w`D$M+$CE ,*ȍ=Ef.w E ,D$+$CE ,*ȍ=Ef.w E ,D$+$MCE ,*ȍ=Ef.w E ,D$ ,$ CE (,*ȍ=Ef.w E (,D$M,$BE 0,*ȍ=Ef.w E 0,D$,$BE 8,*ȍ=Ef.w E 8,D$,$EBE EEf.zt -$B^E MEf.ztM-$A.E UEf.zt-$AE MEf.zt-$A^E =Ef.zt .$YA.E UEf.ztM.$)AE MEf.zt.$@.E =Ef.zt.$@E =Ef.zt /$@.E MEf.ztM/$m@E U f(X E U Xf.u/z-E U f(X =Ef.w-E U XD$/$?E @U @f.uzE @=Ef.wE @D$/$?E PU Pf.uzE P=Ef.wE PD$M0$-?E HU Hf.uzE H=Ef.wE HD$0$>E XU Xf.uzE X=Ef.wE XD$0$>E ,TT~ 1$X>TuM1$?>E hh=Ef.s1$>hhf.uzh=Ef.whD$1$=E U f.uzE =Ef.w E D$ 2$Z=E U f.uzE =Ef.w E D$M2$<E U f.uzE =Ef.w E D$2$<E =Ef.sBh=Ef.w(E ^hD$2$@<E U ˜f.uzE =Ef.w E D$ 3$;E U  f.uzE =Ef.w E D$3$;E U ¨f.uzE =Ef.w E D$3$);E U °f.uzE =Ef.w E D$ 4$:E U ¸f.uzE =Ef.w E D$M4$o:E =Ef.sBh=Ef.w(E ^hD$4$:E MEf.ztE 8H4$9E (U (f.uzE (=Ef.w E (D$ 5$m9E  U f.uzE  =Ef.w E  D$M5$9Hf(YHHYHf.u&z$Hf(YH=Ef.w$HYHD$5$8HHf.uzH=Ef.wHD$5$P8E 0U 0f.uzE 0=Ef.w E 0D$ 6$7E xEE EE `U `f.uzE `=Ef.wE `D$M6$7E hU hf.uzE h=Ef.wE hD$6$+7E h]EYȍeEf(^ЋE h]EYȍeE^f(f.u8z6E h]EYȍeE^ȍ=Ef.w>E h]EYȍeE^f(D$6$[6E pU pf.uzE p=Ef.wE pD$ 7$6E p]EYȍeEf(^ЋE p]EYȍeE^f(f.u8z6E p]EYȍeE^ȍ=Ef.w>E p]EYȍeE^f(D$M7$75MEf.uzM=Ef.wED$7$4MEf.uzM=Ef.wED$7$4E  =Ef.zt8$4E  MEf.zt^8$V4M8$H4E (D$8$(4E 0D$8$4|E  UEf.zt\8$3 9$3E (D$M9$3E 0D$9$3E `=Ef.sE =Ef.s*9$D3 :$63-:$(3E hD$E D$Y:D$a:$E pD$E D$Y:D$z:$E xD$E D$Y:D$:$dE @D$E D$Y:D$:$(E @]EYȍeE^f(D$E ]EYȍeE^f(D$:D$:$E HD$E D$Y:D$:$pE H]EYȍeE^f(D$E ]EYȍeE^f(D$:D$;$E PD$E D$;D$#;$E EE EM=Ef.s<M荃=Ef.s%Ef(XM*\\f(EmEEE XE؋E `EM؍=Ef.s<MЍ=Ef.s%Ef(XM*\\f(EmEEED$ED$Y:D$?;$ED$ED$Y:D$W;$TED$ED$Y:D$o;$&E D$E D$Y:D$;$E D$E D$Y:D$;$E D$E D$Y:D$;$rE EE XEE PEE HU Hf.uzE H=Ef.w E HD$;$-E PU Pf.uzE P=Ef.w E PD$-<$-E `U `f.uzE `=Ef.w E `D$m<$8-E hU hf.uzE h=Ef.w E hD$<$,E pU pf.uzE p=Ef.w E pD$<$~,E xU xf.uzE x=Ef.w E xD$-=$!,E U f.uzE =Ef.w E D$m=$+E 8U 8f.uzE 8=Ef.w E 8D$=$g+E @U @f.uzE @=Ef.w E @D$=$ +E U f.uzE =Ef.w E D$->$*E U f.uzE =Ef.w E D$m>$P*E U f.uzE =Ef.w E D$>$)E U f.uzE =Ef.w E D$>$)E U f.uzE =Ef.w E D$-?$9)E U f.uzE =Ef.w E D$m?$(MEf.uzM=Ef.wED$?$(MEf.uzM=Ef.wED$?$\(M=Ef.wM=Ef.wMuEYf(^UMuEY^Ef.u.z,MuEYf(^M=Ef.w,MuEY^ED$-@$'M=Ef.wM=Ef.wMuEYf(^UMuEY^Ef.u.z,MuEYf(^M=Ef.w,MuEY^ED$m@$&mEEEEM=Ef.s1M=Ef.sEXEEMEf.uzM=Ef.wED$@$0&M=Ef.wM=Ef.wMuEYf(^UMuEY^Ef.u.z,MuEYf(^M=Ef.w,MuEY^ED$@$h%mEpM=Ef.sOM=Ef.s5EXEpppf.uzp=Ef.wpD$-A$$M=Ef.wp=Ef.wMuEYf(^pMuEY^pf.u1z/MuEYf(^p=Ef.w/MuEY^pD$mA$#E EE xE EMEf.uzM=Ef.wED$A$w#E U €f.uzE =Ef.w E D$A$#E U ˆf.uzE =Ef.w E D$-B$"E U f.uzE =Ef.w E D$mB$`"E U ˜f.uzE =Ef.w E D$B$"MEf.uzM=Ef.wED$B$!xxf.uzx=Ef.wxD$-C$w!M=Ef.wM=Ef.wMuEYf(^UMuEY^Ef.u.z,MuEYf(^M=Ef.w,MuEY^ED$mC$ M=Ef.wx=Ef.wMuEYf(^xMuEY^xf.u1z/MuEYf(^x=Ef.w/MuEY^xD$C$M=Ef.sfM=Ef.sOEXEEMEf.uzM=Ef.wED$C$[M=Ef.sKM=Ef.s1M=Ef.sEXEEMEf.uzM=Ef.wED$-D$M=Ef.wM=Ef.wMuEYf(^UMuEY^Ef.u.z,MuEYf(^M=Ef.w,MuEY^ED$mD$x=Ef.sop=Ef.sRM=Ef.s8pXEpppf.uzp=Ef.wpD$D$AM=Ef.wp=Ef.wMuEYf(^pMuEY^pf.u1z/MuEYf(^p=Ef.w/MuEY^pD$D$j&E$\[] %-27s - %5.0f%% - UMFPACK V4.4 (Jan. 28, 2005) %s, Info: matrix entry defined as: double Int (generic integer) defined as: long BLAS library used: none. UMFPACK will be slow. MATLAB: no. CPU timer: POSIX times ( ) routine. number of rows in matrix A: %ld number of columns in matrix A: %ld entries in matrix A: %ld memory usage reported in: %ld-byte Units size of int: %ld bytes size of long: %ld bytes size of pointer: %ld bytes size of numerical entry: %ld bytes strategy used: symmetric strategy used: unsymmetric strategy used: symmetric 2-by-2 ordering used: amd on A+A' ordering used: colamd on A ordering used: provided by user modify Q during factorization: no modify Q during factorization: yes prefer diagonal pivoting: no prefer diagonal pivoting: yes pivots with zero Markowitz cost: %0.f submatrix S after removing zero-cost pivots: number of "dense" rows: %.0f number of "dense" columns: %.0f number of empty rows: %.0f number of empty columns %.0f submatrix S square and diagonal preserved submatrix S not square or diagonal not preserved pattern of square submatrix S: number rows and columns %.0f symmetry of nonzero pattern: %.6f nz in S+S' (excl. diagonal): %.0f nz on diagonal of matrix S: %.0f fraction of nz on diagonal: %.6f 2-by-2 pivoting to place large entries on diagonal: # of small diagonal entries of S: %.0f # unmatched: %.0f symmetry of P2*S: %.6f nz in P2*S+(P2*S)' (excl. diag.): %.0f nz on diagonal of P2*S: %.0f fraction of nz on diag of P2*S: %.6f AMD statistics, for strict diagonal pivoting: est. flops for LU factorization: %.5e est. nz in L+U (incl. diagonal): %.0f est. largest front (# entries): %.0f est. max nz in any column of L: %.0f number of "dense" rows/columns in S+S': %.0f symbolic factorization defragmentations: %.0f symbolic memory usage (Units): %.0f symbolic memory usage (MBytes): %.1f Symbolic size (Units): %.0f Symbolic size (MBytes): %.0f symbolic factorization CPU time (sec): %.2f symbolic factorization wallclock time(sec): %.2f matrix scaled: no matrix scaled: yes (divided each row by sum of abs values in each row) minimum sum (abs (rows of A)): %.5e maximum sum (abs (rows of A)): %.5e (divided each row by max abs value in each row) minimum max (abs (rows of A)): %.5e maximum max (abs (rows of A)): %.5e symbolic/numeric factorization: upper bound actual %% variable-sized part of Numeric object: %20.0f initial size (Units) peak size (Units) final size (Units)Numeric final size (Units) %20.1fNumeric final size (MBytes)peak memory usage (Units)peak memory usage (MBytes) %20.5enumeric factorization flopsnz in L (incl diagonal)nz in U (incl diagonal)nz in L+U (incl diagonal)largest front (# entries)largest # rows in frontlargest # columns in front initial allocation ratio used: %0.3g # of forced updates due to frontal growth: %.0f number of off-diagonal pivots: %.0f nz in L (incl diagonal), if none dropped %.0f nz in U (incl diagonal), if none dropped %.0f number of small entries dropped %.0f nonzeros on diagonal of U: %.0f min abs. value on diagonal of U: %.2e max abs. value on diagonal of U: %.2e estimate of reciprocal of condition number: %.2e indices in compressed pattern: %.0f numerical values stored in Numeric object: %.0f numeric factorization defragmentations: %.0f numeric factorization reallocations: %.0f costly numeric factorization reallocations: %.0f numeric factorization CPU time (sec): %.2f numeric factorization wallclock time (sec): %.2f numeric factorization mflops (CPU time): %.2f numeric factorization mflops (wallclock): %.2f symbolic + numeric CPU time (sec): %.2f symbolic + numeric mflops (CPU time): %.2f symbolic + numeric wall clock time (sec): %.2f symbolic + numeric mflops (wall clock): %.2f solve flops: %.5e iterative refinement steps taken: %.0f iterative refinement steps attempted: %.0f sparse backward error omega1: %.2e sparse backward error omega2: %.2e solve CPU time (sec): %.2f solve wall clock time (sec): %.2f solve mflops (CPU time): %.2f solve mflops (wall clock time): %.2f total symbolic + numeric + solve flops: %.5e total symbolic + numeric + solve CPU time: %.2f total symbolic + numeric + solve mflops (CPU): %.2f total symbolic+numeric+solve wall clock time: %.2f total symbolic+numeric+solve mflops(wallclock) %.2f Y@@?@ @0Aư>⍀P׸G$Ë$**F**F~*Gi*FO*G,*G *G)F)F))@F)F[)FA)F$)F))F(G(F(G(G(Gs(FY(FN(F(E+(F'F'F'F''E'FV'F?'F4','@E'G&F&G&G&G&Fh&F]&U&E<&G'&F&G%G%G%F%F%%Do%FI%A%D&%F %%@D$F$$D$FO$G$C%$F##C#F##@Cr#F##C"G"F"G"G"Gp"FS"FH"@"B""F!F!F!G!!B!Gn!FW!G7!G!G!F F  @B F~ Fd FF G@ 8 B G FGGGFFxpAWGBF+G GGFFAFph@AMF0(AF@Fvn@LF@@F@F_W?5F?F@?{FH@?F>F>dF1)@>F>Fwo=MF=FN=x;NF6=<; =;=;<;zr<h;CG FFGFqFD<<2<<U<FFFFy<z;PH]<>U<&FFFF:<;#<;\T <J; ;;;;`;FFz ;bZ:B::4,9F`: :99F{9gFUM`92F  9F8FFFFqFMF?F#FF8F`8FFiF[FMF)FFFF 8F7eF7F`7Fph 7BF  6 F  6u FB : `6 F  6 F F  5s F@ 8 5 F  `5 F ~ 5\ F) ! 4 F  `4 F~ Fl d 4B F  3 F  3 FU M `3/ F  3F22`2_F3+ 2 F1F`1cF7/ 1F0Fog0SFA9`0%F  0F/F/F{`/gFUM /9F%. 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