’§¹ōzYpŗ}:‡“Ś˜®¢JŖ¬Ā­Ö±žµ·¾$PŠbT} ~TŲ•Ü›€©«­l®@µüµ@ømvnlatticemvnlattice_mvnlattice_mod1mvnlattice_pivcholmvnlattice_selectmvnlattice_substitutemvnlattice_transformrank1_F2rank1_F4rank1_Korobovrank1_Qfrank1_mod1rank1_prodrank1coefD Q„„„#ƒmaxnƒeps K K K K Kipinifhfa1fb1fipcNcreps%R1cresultmetaisŠmvnlattice_pivcholŠmvnlattice_77 ‚(ģ7)Ü7)7Œ—(ņ7)Ž7)7'­(ł7)ą7)7S Å( 7)ą7)7S Ż(7)ą7)P ,O ÷(+7)ā7) (37)ā7)7 I7ÓI7Ó$O:O:Ó(C7“)(L7;(O77° 7°7° 7)7P hmH7P | H     7Œä7ŒØęO Å    ÓPčQ7P`KR& ©@.Ŗ@©@Č©@-Cėā6?ˆĆ@@' R is not square\nR has missing values\nR is not symmetric; try R = (R+R')/2 to ensure symmetry\nlower bound vector, a, and R do not have the same dimension\nupper bound vector, b, and R do not have the same dimension\nvariance must be positive\nlower bound, a, must be greater than the upper bound, b\nqui findfile mvnlattice.mmatr(fn)r DQ„„„#ƒmaxnƒeps K K K K Kipinifhfa1fb1fipcNcreps%R1cresultmetaisŠmvnlattice_pivcholŠmvnlattice_77 ‚(ģ7)Ü7)7Œ—(ņ7)Ž7)7'­(ł7)ą7)7S Å( 7)ą7)7S Ż(7)ą7)P ,O ÷(+7)ā7)  (37)ā7)7 I7ÓI7Ó$O:O:Ó(C7“)(L7;(O77° 7°7° 7)7P hmH7P | H     7Œä7ŒØęO Å    ÓPčQ7P`KR&@© @Ŗ.@©@©Č?6āėC-@ƈ@' R is not square\nR has missing values\nR is not symmetric; try R = (R+R')/2 to ensure symmetry\nlower bound vector, a, and R do not have the same dimension\nupper bound vector, b, and R do not have the same dimension\nvariance must be positive\nlower bound, a, must be greater than the upper bound, b\nqui findfile mvnlattice.mmatr(fn)r0 L„„„ K K K K K K  Kiiijikilininlinkinnietakipiplipkid1ivivlisiajibjfq1fq2fzfkvcucz0%e1%e2iMVN_MAXPTSiMVN_BLOCKSZ%m%nb%k2%ib%k1ŠminŠmvnlattice_mod1Šmvnlattice_transform4#7S"7$PO7$PO7OPO7O$O7! OPO7OPO O"7ŁP   ]  ]p$P$]PP`6  $ F P$] 7Ł ` (OO #I73P %P   ] «$P7Q`O&OOP''% c&P (&#  :)&(&X ?7S7S Ó$O7! PO7PP7ą [PP7Q^Q`P  $ E6 ]> ]F*>P=7 Q` ] ]  +)P=Q` !+) ć7… 7… 6 'zI$ I  P — P$ I$6I  6    P Ļ ]P$I ]IP Ļõ P õ$ I  I87     &(< 7): :K&jč@@$@'{txt}note: estimated absolute error %g using %g points\n 0L„„„ K K K K K K  Kiiijikilininlinkinnietakipiplipkid1ivivlisiajibjfq1fq2fzfkvcucz0%e1%e2iMVN_MAXPTSiMVN_BLOCKSZ%m%nb%k2%ib%k1ŠminŠmvnlattice_mod1Šmvnlattice_transform4#7S"7$PO7$PO7OPO7O$O7! OPO7OPO O"7ŁP   ]  ]p$P$]PP`6  $ F P$] 7Ł ` (OO #I73P %P   ] «$P7Q`O&OOP''% c&P (&#  :)&(&X ?7S7S Ó$O7! PO7PP7ą [PP7Q^Q`P  $ E6 ]> ]F*>P=7 Q` ] ]  +)P=Q` !+) ć7… 7… 6 'zI$ I  P — P$ I$6I  6    P Ļ ]P$I ]IP Ļõ P õ$ I  I87     &(< 7): :K&@čj@@$'{txt}note: estimated absolute error %g using %g points\nT„„„ KN73=KT„„„ KN73=K B„„„ K K K Kinfdfinffifj%DiMVN_INFINITY%m%mina%maxb%eps%sŠmvnlattice_substituteŠmvnlattice_selectŠdiag 7 P X PO7 PO7 G   ($7<7.7 7ŒO7…+»()7)7)QA)]]?P_QA]PFP_]]?P_O@]]$P_OC7…Q(27)7)]B7…aOP@] =P_@ ]=P_@ )P7*Q`P?  C7…PX]]]]N[PP:N:J7)7Œ ()7)7)  K&@@Y@2Ŗ@@Č©@@šæ'c(epsdouble)R is not positive definite\nlower bound, a, must be greater than the upper bound, b\n B„„„ K K K Kinfdfinffifj%DiMVN_INFINITY%m%mina%maxb%eps%sŠmvnlattice_substituteŠmvnlattice_selectŠdiag 7 P X PO7 PO7 G   ($7<7.7 7ŒO7…+»()7)7)QA)]]?P_QA]PFP_]]?P_O@]]$P_OC7…Q(27)7)]B7…aOP@] =P_@ ]=P_@ )P7*Q`P?  C7…PX]]]]N[PP:N:J7)7Œ ()7)7) K&@@@Y@Ŗ2@@©Č@æš'c(epsdouble)R is not positive definite\nlower bound, a, must be greater than the upper bound, b\n°¬„„„ K Kiiijikilinicircres7S77 MŖ7)7…PQ7 O £OP £]O ŸP$I73P P$$[P_ g K&©@°¬„„„ K Kiiijikilinicircres7S77 MŖ7)7…PQ7 O £OP £]O ŸP$I73P P$$[P_ g K&@©š¼„„„ K K Kiiijikilinicirim7S7 7  Sŗ7)7…O a*µ7S OP “]O °P$I73P P$$ 7ŁP ]_n*Z&©@š¼„„„ K K Kiiijikilinicirim7S7 7  Sŗ7)7…O a*µ7S OP “]O °P$I73P P$$ 7ŁP ]_n*Z&@©Ą°„„„ K K K K K K Kikiimfajfbjfnafnb%nO7S Q VP` P7 Q o¬ y P7 P ĒP   [Q[>= ‚ N[? 7Ó  >7ĢQ_ >Q`¦¬ P ļ [Q[>= Ń N[? 7Ó P= >F7ĢQ_P =>Q`¦® 0 PP7Q`¦P d [Q[>=  [Q[>= 3 N[?  N[? 7Ó  7Ó P= > >F7ĢQ_  =>Q`*Z&@@Ą°„„„ K K K K K K Kikiimfajfbjfnafnb%nO7S Q VP` P7 Q o¬ y P7 P ĒP   [Q[>= ‚ N[? 7Ó  >7ĢQ_ >Q`¦¬ P ļ [Q[>= Ń N[? 7Ó P= >F7ĢQ_P =>Q`¦® 0 PP7Q`¦P d [Q[>=  [Q[>= 3 N[?  N[? 7Ó  7Ó P= > >F7ĢQ_  =>Q`*Z&@@ø.„„„ Kxf1xf2Šrank1_prodPNP=>F>FKø.„„„ Kxf1xf2Šrank1_prodPNP=>F>FKš<„„„ Kxf1xf2Šrank1_prodPP:M>P=:M>=>FKR&@š<„„„ Kxf1xf2Šrank1_prodPP:M>P=:M>=>FKR&@˜&„„„ KŠrank1_prodP$>=$MK&@˜&„„„ KŠrank1_prodP$>=$MK&@XÖ„„„ K K K iiik1ik2iresultip2inb%zkiRANK1_BLOCKSZŠminŠrank1_mod1Ņ PP7 Ō s P$]7Ł` UŌI73 I73P  OOP  ÉP  : X?  pw7…  KR&jč@@XÖ„„„ K K K iiik1ik2iresultip2inb%zkiRANK1_BLOCKSZŠminŠrank1_mod1Ņ PP7 Ō s P$]7Ł` UŌI73 I73P  OOP  ÉP  : X?  pw7…  KR&@čj@L„„„ KN73=KL„„„ KN73=KD„„„ KiiinfpQP[7B :Q[>$K&@D„„„ KiiinfpQP[7B :Q[>$K&@¼o„„„#ƒalpha K K Kiziaiminihip2iresultlfaxf1 Kxf2 K%sŠrank1_QfDI737ŒhŠrank1_Korobovq ĄD D(R7<D PFI Šrank1_F2q ĄH ¤(U7)J7)(R7<HLI N Šrank1_F4q PQ7P`(\7)D   <(e7<D     ķ  $(j7)-(l7)7œ) ` ŪK&@@@Ąh@€F@>@'c(pi)alpha must be 2 or 4\ng_p[++i] = %g\ng_eta[i] = &(c(maxdouble)%g,%g)\n¼o„„„#ƒalpha K K Kiziaiminihip2iresultlfaxf1 Kxf2 K%sŠrank1_QfDI737ŒhŠrank1_Korobovq ĄD D(R7<D PFI Šrank1_F2q ĄH ¤(U7)J7)(R7<HLI N Šrank1_F4q PQ7P`(\7)D   <(e7<D     ķ  $(j7)-(l7)7œ) ` ŪK&@@@@hĄ@F€@>'c(pi)alpha must be 2 or 4\ng_p[++i] = %g\ng_eta[i] = &(c(maxdouble)%g,%g)\n