STATISTICS
  Problem name     : L0 pricer
  Variables        : 83 (39 binary, 0 integer, 0 implicit integer, 44 continuous)
  Constraints      : 0 initial, 46 maximal
OBJECTIVE
  Sense            : minimize
VARIABLES
  [binary] <w#0>: obj=0, original bounds=[0,0]
  [binary] <w#1>: obj=0, original bounds=[0,0]
  [binary] <y#1>: obj=0, original bounds=[0,0]
  [binary] <w#2>: obj=0, original bounds=[0,1]
  [binary] <y#2>: obj=0, original bounds=[0,0]
  [binary] <w#3>: obj=0, original bounds=[0,0]
  [binary] <y#3>: obj=0, original bounds=[1,1]
  [binary] <w#4>: obj=0, original bounds=[0,0]
  [binary] <y#4>: obj=0, original bounds=[0,0]
  [binary] <w#5>: obj=0, original bounds=[0,0]
  [binary] <y#5>: obj=0, original bounds=[0,0]
  [binary] <w#6>: obj=0, original bounds=[0,0]
  [binary] <y#6>: obj=0, original bounds=[0,0]
  [binary] <w#7>: obj=0, original bounds=[0,0]
  [binary] <y#7>: obj=0, original bounds=[0,0]
  [binary] <w#8>: obj=0, original bounds=[0,0]
  [binary] <y#8>: obj=0, original bounds=[0,0]
  [binary] <w#9>: obj=0, original bounds=[0,0]
  [binary] <y#9>: obj=0, original bounds=[0,0]
  [binary] <w#10>: obj=0, original bounds=[0,0]
  [binary] <y#10>: obj=0, original bounds=[0,0]
  [binary] <w#11>: obj=0, original bounds=[0,0]
  [binary] <y#11>: obj=0, original bounds=[0,0]
  [binary] <w#12>: obj=0, original bounds=[0,0]
  [binary] <y#12>: obj=0, original bounds=[0,0]
  [binary] <w#13>: obj=0, original bounds=[0,0]
  [binary] <y#13>: obj=0, original bounds=[0,0]
  [binary] <w#14>: obj=0, original bounds=[0,0]
  [binary] <y#14>: obj=0, original bounds=[0,0]
  [binary] <w#15>: obj=0, original bounds=[0,0]
  [binary] <y#15>: obj=0, original bounds=[0,0]
  [binary] <w#16>: obj=0, original bounds=[0,0]
  [binary] <y#16>: obj=0, original bounds=[0,0]
  [binary] <w#17>: obj=0, original bounds=[0,0]
  [binary] <y#17>: obj=0, original bounds=[0,0]
  [binary] <w#18>: obj=0, original bounds=[0,0]
  [binary] <y#18>: obj=0, original bounds=[1,1]
  [binary] <w#19>: obj=0, original bounds=[0,0]
  [binary] <y#19>: obj=0, original bounds=[0,0]
  [continuous] <gamma#10>: obj=0, original bounds=[-inf,+inf]
  [continuous] <beta#10>: obj=0, original bounds=[-inf,+inf]
  [continuous] <gamma#5>: obj=0, original bounds=[-inf,+inf]
  [continuous] <beta#5>: obj=0, original bounds=[-inf,+inf]
  [continuous] <gamma#11>: obj=0, original bounds=[-inf,+inf]
  [continuous] <beta#11>: obj=0, original bounds=[-inf,+inf]
  [continuous] <gamma#1>: obj=0, original bounds=[-inf,+inf]
  [continuous] <beta#1>: obj=0, original bounds=[-inf,+inf]
  [continuous] <gamma#12>: obj=0, original bounds=[-inf,+inf]
  [continuous] <beta#12>: obj=0, original bounds=[-inf,+inf]
  [continuous] <gamma#6>: obj=0, original bounds=[-inf,+inf]
  [continuous] <beta#6>: obj=0, original bounds=[-inf,+inf]
  [continuous] <gamma#13>: obj=0, original bounds=[-inf,+inf]
  [continuous] <beta#13>: obj=0, original bounds=[-inf,+inf]
  [continuous] <gamma#3>: obj=0, original bounds=[-inf,+inf]
  [continuous] <beta#3>: obj=0, original bounds=[-inf,+inf]
  [continuous] <gamma#14>: obj=0, original bounds=[-inf,+inf]
  [continuous] <beta#14>: obj=0, original bounds=[-inf,+inf]
  [continuous] <gamma#7>: obj=0, original bounds=[-inf,+inf]
  [continuous] <beta#7>: obj=0, original bounds=[-inf,+inf]
  [continuous] <gamma#15>: obj=0, original bounds=[-inf,+inf]
  [continuous] <beta#15>: obj=0, original bounds=[-inf,+inf]
  [continuous] <beta#0>: obj=0, original bounds=[-inf,+inf]
  [continuous] <gamma#0>: obj=0, original bounds=[-inf,+inf]
  [continuous] <gamma#16>: obj=0, original bounds=[-inf,+inf]
  [continuous] <beta#16>: obj=0, original bounds=[-inf,+inf]
  [continuous] <gamma#8>: obj=0, original bounds=[-inf,+inf]
  [continuous] <beta#8>: obj=0, original bounds=[-inf,+inf]
  [continuous] <gamma#17>: obj=0, original bounds=[-inf,+inf]
  [continuous] <beta#17>: obj=0, original bounds=[-inf,+inf]
  [continuous] <gamma#4>: obj=0, original bounds=[-inf,+inf]
  [continuous] <beta#4>: obj=0, original bounds=[-inf,+inf]
  [continuous] <gamma#18>: obj=0, original bounds=[-inf,+inf]
  [continuous] <beta#18>: obj=0, original bounds=[-inf,+inf]
  [continuous] <gamma#9>: obj=0, original bounds=[-inf,+inf]
  [continuous] <beta#9>: obj=0, original bounds=[-inf,+inf]
  [continuous] <gamma#19>: obj=0, original bounds=[-inf,+inf]
  [continuous] <beta#19>: obj=0, original bounds=[-inf,+inf]
  [continuous] <gamma#2>: obj=0, original bounds=[-inf,+inf]
  [continuous] <beta#2>: obj=0, original bounds=[-inf,+inf]
  [continuous] <z>: obj=1, original bounds=[83.774842786079,+inf]
  [continuous] <z_dash>: obj=0, original bounds=[82.774842786079,+inf]
  [continuous] <gd_dash>: obj=0, original bounds=[83.7748881860088,+inf]
  [continuous] <g#1>: obj=0, original bounds=[4.53999297624849e-05,4.53999297624849e-05]
CONSTRAINTS
  [linear] <npa_bound>: <y#1>[B] +<y#2>[B] +<y#3>[B] +<y#4>[B] +<y#5>[B] +<y#6>[B] +<y#7>[B] +<y#8>[B] +<y#9>[B] +<y#10>[B] +<y#11>[B] +<y#12>[B] +<y#13>[B] +<y#14>[B] +<y#15>[B] +<y#16>[B] +<y#17>[B] +<y#18>[B] +<y#19>[B] == 2;
  [linear] <gamma_beta>:  +9.68812997712982<beta#0>[C] +0.386562978955496<beta#1>[C] -0.0207234811224025<beta#2>[C] -0.294691245651668<beta#3>[C] +0.0431622743015352<beta#4>[C] -0.587698296665056<beta#5>[C] +0.356464094051941<beta#6>[C] -0.742439878906572<beta#7>[C] -0.485336243045306<beta#8>[C] +0.15806554573082<beta#9>[C] +0.0449021877989566<beta#10>[C] +0.609559352143144<beta#11>[C] +0.439341743899974<beta#12>[C] +0.0165330338041666<beta#13>[C] -0.438232041550358<beta#14>[C] +0.573011389113537<beta#15>[C] -1.28809590941211<beta#16>[C] -1.16183052668801<beta#17>[C] +0.719216035144989<beta#18>[C] -0.061536116168582<beta#19>[C] -<gamma#0>[C] == -0.0759281071887529;
  [linear] <gamma_beta>:  +0.386562978955496<beta#0>[C] +32.0779958640038<beta#1>[C] -4.05828879549302<beta#2>[C] +2.93421507753918<beta#3>[C] +0.803223673334259<beta#4>[C] -0.699148451359953<beta#5>[C] -0.460403064507958<beta#6>[C] +0.932843650661155<beta#7>[C] -1.39042912751901<beta#8>[C] +8.75102856987022<beta#9>[C] +3.16678028751916<beta#10>[C] -3.09290609100682<beta#11>[C] -0.112604150794085<beta#12>[C] +0.540719002178594<beta#13>[C] -2.07493846374957<beta#14>[C] +5.21615731194666<beta#15>[C] -0.120538207687682<beta#16>[C] +2.11359187450913<beta#17>[C] +3.46215532320529<beta#18>[C] +1.4569805936801<beta#19>[C] -<gamma#1>[C] == -0.963281554003206;
  [linear] <gamma_beta>:  -0.0207234811224027<beta#0>[C] -4.05828879549302<beta#1>[C] +7.01875919593983<beta#2>[C] -3.22461331081334<beta#3>[C] -0.262119681248198<beta#4>[C] +1.63717225884473<beta#5>[C] +0.122960361563866<beta#6>[C] -0.234927584839718<beta#7>[C] -0.933634251937047<beta#8>[C] +1.31938750204995<beta#9>[C] +0.376733392836788<beta#10>[C] -0.753825071083495<beta#11>[C] -0.109478142005306<beta#12>[C] +0.1847167334049<beta#13>[C] -1.56997327996199<beta#14>[C] +0.0804539425951526<beta#15>[C] +0.521698129236942<beta#16>[C] -2.06469805711339<beta#17>[C] +0.208008533100657<beta#18>[C] -1.10280955161126<beta#19>[C] -<gamma#2>[C] == 1.45047750996232;
  [linear] <gamma_beta>:  -0.294691245651668<beta#0>[C] +2.93421507753918<beta#1>[C] -3.22461331081334<beta#2>[C] +17.8053672154848<beta#3>[C] -0.634805188685948<beta#4>[C] +4.2225786836952<beta#5>[C] -0.0769128566437806<beta#6>[C] -0.124706144672612<beta#7>[C] +1.72942907172782<beta#8>[C] +0.00227862988399835<beta#9>[C] -1.4095909053089<beta#10>[C] -0.192456147331044<beta#11>[C] -0.5203976174548<beta#12>[C] -0.343348281079669<beta#13>[C] +0.518978475141378<beta#14>[C] +0.604122400980816<beta#15>[C] +0.992343439843865<beta#16>[C] +2.61309889667775<beta#17>[C] -0.662362050029415<beta#18>[C] -3.10527540169164<beta#19>[C] -<gamma#3>[C] == 0.772415726206676;
  [linear] <gamma_beta>:  +0.0431622743015354<beta#0>[C] +0.803223673334259<beta#1>[C] -0.262119681248198<beta#2>[C] -0.634805188685948<beta#3>[C] +10.0324979406613<beta#4>[C] -0.657787947327997<beta#5>[C] +0.269798759187512<beta#6>[C] +0.373305030712209<beta#7>[C] -0.36051609665625<beta#8>[C] +0.199127991734252<beta#9>[C] +0.826596513224505<beta#10>[C] +1.02618891773377<beta#11>[C] +0.363226612836033<beta#12>[C] +0.144571857874813<beta#13>[C] +0.0835148268327672<beta#14>[C] +1.04485711363848<beta#15>[C] -0.720938682599303<beta#16>[C] -0.572856872570143<beta#17>[C] +0.406713771481189<beta#18>[C] +0.558042896846951<beta#19>[C] -<gamma#4>[C] == 0.0693337283642145;
  [linear] <gamma_beta>:  -0.587698296665056<beta#0>[C] -0.699148451359954<beta#1>[C] +1.63717225884473<beta#2>[C] +4.2225786836952<beta#3>[C] -0.657787947327997<beta#4>[C] +8.92252541315533<beta#5>[C] +0.226880141941919<beta#6>[C] -0.144971101829411<beta#7>[C] +0.380483416220399<beta#8>[C] +0.75078846753132<beta#9>[C] +0.316171347807265<beta#10>[C] -0.288000983570702<beta#11>[C] -0.949080191162832<beta#12>[C] +0.405233768395745<beta#13>[C] -0.456560934978917<beta#14>[C] +1.10171479849176<beta#15>[C] +0.214046600626289<beta#16>[C] +0.545024253514962<beta#17>[C] +0.0774548804582166<beta#18>[C] -4.41307032476724<beta#19>[C] -<gamma#5>[C] == 0.0913887753985383;
  [linear] <gamma_beta>:  +0.356464094051941<beta#0>[C] -0.460403064507958<beta#1>[C] +0.122960361563866<beta#2>[C] -0.0769128566437805<beta#3>[C] +0.269798759187512<beta#4>[C] +0.226880141941919<beta#5>[C] +7.81621747254538<beta#6>[C] -0.218504841786149<beta#7>[C] -2.03357876266394<beta#8>[C] +0.982790315156104<beta#9>[C] +0.707964803524256<beta#10>[C] +0.149291463152171<beta#11>[C] -0.899319819459671<beta#12>[C] +0.466414991646151<beta#13>[C] +1.35128871362221<beta#14>[C] +0.00990998445065493<beta#15>[C] -4.2284992996403<beta#16>[C] +0.468829299012536<beta#17>[C] -0.365924578138008<beta#18>[C] +0.680543178960382<beta#19>[C] -<gamma#6>[C] == 0.675390709462822;
  [linear] <gamma_beta>:  -0.742439878906572<beta#0>[C] +0.932843650661154<beta#1>[C] -0.234927584839718<beta#2>[C] -0.124706144672613<beta#3>[C] +0.373305030712208<beta#4>[C] -0.144971101829411<beta#5>[C] -0.218504841786149<beta#6>[C] +10.9978166939738<beta#7>[C] +0.589526305203027<beta#8>[C] +1.43001039271785<beta#9>[C] -0.130468582067007<beta#10>[C] -0.332736763131021<beta#11>[C] -0.458730276887781<beta#12>[C] -0.309373040080336<beta#13>[C] +0.610772054389876<beta#14>[C] +0.1181546598656<beta#15>[C] -0.416533058964786<beta#16>[C] +1.06441917909607<beta#17>[C] +0.178004458368356<beta#18>[C] +1.67181794973041<beta#19>[C] -<gamma#7>[C] == 0.273876076758348;
  [linear] <gamma_beta>:  -0.485336243045306<beta#0>[C] -1.39042912751901<beta#1>[C] -0.933634251937047<beta#2>[C] +1.72942907172782<beta#3>[C] -0.36051609665625<beta#4>[C] +0.380483416220399<beta#5>[C] -2.03357876266394<beta#6>[C] +0.589526305203027<beta#7>[C] +19.4334470504279<beta#8>[C] -0.116665804311444<beta#9>[C] +0.489374774023803<beta#10>[C] +0.682091290915868<beta#11>[C] -4.00402261661917<beta#12>[C] +2.19863853290394<beta#13>[C] +2.1925857858025<beta#14>[C] +8.87915890959638<beta#15>[C] +10.6898342295354<beta#16>[C] +1.77907422447564<beta#17>[C] -0.951915893006574<beta#18>[C] +5.21245352468386<beta#19>[C] -<gamma#8>[C] == -0.339023066832938;
  [linear] <gamma_beta>:  +0.15806554573082<beta#0>[C] +8.75102856987022<beta#1>[C] +1.31938750204995<beta#2>[C] +0.00227862988399811<beta#3>[C] +0.199127991734253<beta#4>[C] +0.750788467531321<beta#5>[C] +0.982790315156103<beta#6>[C] +1.43001039271785<beta#7>[C] -0.116665804311445<beta#8>[C] +16.9763697021045<beta#9>[C] -1.16396654185673<beta#10>[C] -3.06355498867922<beta#11>[C] +0.786809178820801<beta#12>[C] -0.593512582071955<beta#13>[C] +3.2920682065851<beta#14>[C] +10.5298339418465<beta#15>[C] -2.5972200447507<beta#16>[C] -0.706746602952979<beta#17>[C] +2.97511442041625<beta#18>[C] -1.78726150837809<beta#19>[C] -<gamma#9>[C] == 0.853745237303796;
  [linear] <gamma_beta>:  +0.0449021877989563<beta#0>[C] +3.16678028751916<beta#1>[C] +0.376733392836788<beta#2>[C] -1.4095909053089<beta#3>[C] +0.826596513224504<beta#4>[C] +0.316171347807265<beta#5>[C] +0.707964803524256<beta#6>[C] -0.130468582067007<beta#7>[C] +0.489374774023802<beta#8>[C] -1.16396654185673<beta#9>[C] +8.68112822531611<beta#10>[C] +0.43828506106779<beta#11>[C] -0.292756053734144<beta#12>[C] +1.29495212778983<beta#13>[C] +0.682252733775967<beta#14>[C] -0.52848432504844<beta#15>[C] +0.0563030593772998<beta#16>[C] +0.195640157369707<beta#17>[C] -0.635699367805988<beta#18>[C] +0.771199584650275<beta#19>[C] -<gamma#10>[C] == -1.11321166142297;
  [linear] <gamma_beta>:  +0.609559352143144<beta#0>[C] -3.09290609100682<beta#1>[C] -0.753825071083495<beta#2>[C] -0.192456147331045<beta#3>[C] +1.02618891773377<beta#4>[C] -0.288000983570702<beta#5>[C] +0.149291463152171<beta#6>[C] -0.332736763131021<beta#7>[C] +0.682091290915868<beta#8>[C] -3.06355498867922<beta#9>[C] +0.43828506106779<beta#10>[C] +8.98759190050779<beta#11>[C] -0.521282201001506<beta#12>[C] +0.490940000883328<beta#13>[C] +0.502443188062492<beta#14>[C] -2.0158682814979<beta#15>[C] -0.0323944152353246<beta#16>[C] +0.104832872982518<beta#17>[C] +1.25279640895867<beta#18>[C] +0.542714982069685<beta#19>[C] -<gamma#11>[C] == -0.727224482847929;
  [linear] <gamma_beta>:  +0.439341743899974<beta#0>[C] -0.112604150794086<beta#1>[C] -0.109478142005306<beta#2>[C] -0.5203976174548<beta#3>[C] +0.363226612836033<beta#4>[C] -0.949080191162832<beta#5>[C] -0.899319819459671<beta#6>[C] -0.458730276887781<beta#7>[C] -4.00402261661917<beta#8>[C] +0.786809178820801<beta#9>[C] -0.292756053734144<beta#10>[C] -0.521282201001506<beta#11>[C] +8.00429998253857<beta#12>[C] -2.28459859806031<beta#13>[C] +0.378703635283706<beta#14>[C] -2.11688450888703<beta#15>[C] -5.88535409010353<beta#16>[C] -2.40692986516149<beta#17>[C] -0.213610454063468<beta#18>[C] -5.20873717005602<beta#19>[C] -<gamma#12>[C] == -0.331668831958059;
  [linear] <gamma_beta>:  +0.0165330338041665<beta#0>[C] +0.540719002178594<beta#1>[C] +0.1847167334049<beta#2>[C] -0.343348281079669<beta#3>[C] +0.144571857874813<beta#4>[C] +0.405233768395745<beta#5>[C] +0.466414991646151<beta#6>[C] -0.309373040080337<beta#7>[C] +2.19863853290394<beta#8>[C] -0.593512582071955<beta#9>[C] +1.29495212778983<beta#10>[C] +0.490940000883328<beta#11>[C] -2.28459859806031<beta#12>[C] +8.87238981828387<beta#13>[C] -0.330449493413755<beta#14>[C] +0.118149988500113<beta#15>[C] +2.47103428189041<beta#16>[C] +1.15663613517225<beta#17>[C] -0.310993151328365<beta#18>[C] +2.69356925846019<beta#19>[C] -<gamma#13>[C] == 0.173471142651647;
  [linear] <gamma_beta>:  -0.438232041550358<beta#0>[C] -2.07493846374957<beta#1>[C] -1.56997327996199<beta#2>[C] +0.518978475141378<beta#3>[C] +0.0835148268327672<beta#4>[C] -0.456560934978917<beta#5>[C] +1.35128871362221<beta#6>[C] +0.610772054389875<beta#7>[C] +2.1925857858025<beta#8>[C] +3.2920682065851<beta#9>[C] +0.682252733775966<beta#10>[C] +0.502443188062492<beta#11>[C] +0.378703635283706<beta#12>[C] -0.330449493413755<beta#13>[C] +7.59519500494932<beta#14>[C] +4.14619464610518<beta#15>[C] -2.82056828832266<beta#16>[C] +0.41280717201602<beta#17>[C] -0.85296675170427<beta#18>[C] -0.200652932510614<beta#19>[C] -<gamma#14>[C] == 0.00275491246536852;
  [linear] <gamma_beta>:  +0.573011389113537<beta#0>[C] +5.21615731194666<beta#1>[C] +0.0804539425951527<beta#2>[C] +0.604122400980817<beta#3>[C] +1.04485711363848<beta#4>[C] +1.10171479849176<beta#5>[C] +0.00990998445065472<beta#6>[C] +0.1181546598656<beta#7>[C] +8.87915890959638<beta#8>[C] +10.5298339418465<beta#9>[C] -0.52848432504844<beta#10>[C] -2.0158682814979<beta#11>[C] -2.11688450888703<beta#12>[C] +0.118149988500112<beta#13>[C] +4.14619464610518<beta#14>[C] +21.190984668148<beta#15>[C] +3.72731553988788<beta#16>[C] +0.930924493212036<beta#17>[C] +2.11247661995811<beta#18>[C] +2.18646982109204<beta#19>[C] -<gamma#15>[C] == -0.399553661546511;
  [linear] <gamma_beta>:  -1.28809590941211<beta#0>[C] -0.12053820768768<beta#1>[C] +0.521698129236942<beta#2>[C] +0.992343439843864<beta#3>[C] -0.720938682599303<beta#4>[C] +0.214046600626289<beta#5>[C] -4.2284992996403<beta#6>[C] -0.416533058964786<beta#7>[C] +10.6898342295354<beta#8>[C] -2.5972200447507<beta#9>[C] +0.0563030593772996<beta#10>[C] -0.0323944152353248<beta#11>[C] -5.88535409010353<beta#12>[C] +2.4710342818904<beta#13>[C] -2.82056828832266<beta#14>[C] +3.72731553988788<beta#15>[C] +18.6174625907117<beta#16>[C] +2.80856852944103<beta#17>[C] +0.232882664930857<beta#18>[C] +5.54191566908185<beta#19>[C] -<gamma#16>[C] == -1.35318333879207;
  [linear] <gamma_beta>:  -1.16183052668801<beta#0>[C] +2.11359187450913<beta#1>[C] -2.06469805711339<beta#2>[C] +2.61309889667775<beta#3>[C] -0.572856872570143<beta#4>[C] +0.545024253514962<beta#5>[C] +0.468829299012536<beta#6>[C] +1.06441917909607<beta#7>[C] +1.77907422447564<beta#8>[C] -0.706746602952979<beta#9>[C] +0.195640157369707<beta#10>[C] +0.104832872982518<beta#11>[C] -2.40692986516149<beta#12>[C] +1.15663613517225<beta#13>[C] +0.41280717201602<beta#14>[C] +0.930924493212036<beta#15>[C] +2.80856852944103<beta#16>[C] +10.8538453023677<beta#17>[C] -0.5528586062639<beta#18>[C] +2.71401426292917<beta#19>[C] -<gamma#17>[C] == 1.1910054333222;
  [linear] <gamma_beta>:  +0.719216035144989<beta#0>[C] +3.46215532320529<beta#1>[C] +0.208008533100657<beta#2>[C] -0.662362050029415<beta#3>[C] +0.40671377148119<beta#4>[C] +0.0774548804582168<beta#5>[C] -0.365924578138008<beta#6>[C] +0.178004458368356<beta#7>[C] -0.951915893006575<beta#8>[C] +2.97511442041625<beta#9>[C] -0.635699367805988<beta#10>[C] +1.25279640895867<beta#11>[C] -0.213610454063468<beta#12>[C] -0.310993151328365<beta#13>[C] -0.85296675170427<beta#14>[C] +2.11247661995811<beta#15>[C] +0.232882664930856<beta#16>[C] -0.5528586062639<beta#17>[C] +7.4031029279125<beta#18>[C] +0.123335579383035<beta#19>[C] -<gamma#18>[C] == 1.48173242103449;
  [linear] <gamma_beta>:  -0.0615361161685821<beta#0>[C] +1.4569805936801<beta#1>[C] -1.10280955161126<beta#2>[C] -3.10527540169163<beta#3>[C] +0.558042896846951<beta#4>[C] -4.41307032476724<beta#5>[C] +0.680543178960382<beta#6>[C] +1.67181794973041<beta#7>[C] +5.21245352468386<beta#8>[C] -1.78726150837809<beta#9>[C] +0.771199584650275<beta#10>[C] +0.542714982069685<beta#11>[C] -5.20873717005602<beta#12>[C] +2.69356925846019<beta#13>[C] -0.200652932510614<beta#14>[C] +2.18646982109204<beta#15>[C] +5.54191566908186<beta#16>[C] +2.71401426292917<beta#17>[C] +0.123335579383035<beta#18>[C] +18.9345431618361<beta#19>[C] -<gamma#19>[C] == -1.27315520471365;
  [soc] <soc>: sqrt( 335.099371144316+ (2*(<gamma#0>[C]+0))^2 + (2*(<gamma#1>[C]+0))^2 + (2*(<gamma#2>[C]+0))^2 + (2*(<gamma#3>[C]+0))^2 + (2*(<gamma#4>[C]+0))^2 + (2*(<gamma#5>[C]+0))^2 + (2*(<gamma#6>[C]+0))^2 + (2*(<gamma#7>[C]+0))^2 + (2*(<gamma#8>[C]+0))^2 + (2*(<gamma#9>[C]+0))^2 + (2*(<gamma#10>[C]+0))^2 + (2*(<gamma#11>[C]+0))^2 + (2*(<gamma#12>[C]+0))^2 + (2*(<gamma#13>[C]+0))^2 + (2*(<gamma#14>[C]+0))^2 + (2*(<gamma#15>[C]+0))^2 + (2*(<gamma#16>[C]+0))^2 + (2*(<gamma#17>[C]+0))^2 + (2*(<gamma#18>[C]+0))^2 + (2*(<gamma#19>[C]+0))^2 + (1*(<z_dash>[C]+0))^2 ) <= 1*(<gd_dash>[C]+0);
  [SOS1] <sos1>: <~y#1> (1), <beta#1> (2);
  [SOS1] <sos1>: <~y#2> (1), <beta#2> (2);
  [SOS1] <sos1>: <~y#3> (1), <beta#3> (2);
  [SOS1] <sos1>: <~y#4> (1), <beta#4> (2);
  [SOS1] <sos1>: <~y#5> (1), <beta#5> (2);
  [SOS1] <sos1>: <~y#6> (1), <beta#6> (2);
  [SOS1] <sos1>: <~y#7> (1), <beta#7> (2);
  [SOS1] <sos1>: <~y#8> (1), <beta#8> (2);
  [SOS1] <sos1>: <~y#9> (1), <beta#9> (2);
  [SOS1] <sos1>: <~y#10> (1), <beta#10> (2);
  [SOS1] <sos1>: <~y#11> (1), <beta#11> (2);
  [SOS1] <sos1>: <~y#12> (1), <beta#12> (2);
  [SOS1] <sos1>: <~y#13> (1), <beta#13> (2);
  [SOS1] <sos1>: <~y#14> (1), <beta#14> (2);
  [SOS1] <sos1>: <~y#15> (1), <beta#15> (2);
  [SOS1] <sos1>: <~y#16> (1), <beta#16> (2);
  [SOS1] <sos1>: <~y#17> (1), <beta#17> (2);
  [SOS1] <sos1>: <~y#18> (1), <beta#18> (2);
  [SOS1] <sos1>: <~y#19> (1), <beta#19> (2);
  [linear] <z_dash>: <z>[C] -<g#1>[C] -<z_dash>[C] == 0;
  [linear] <gd_dash>: <z>[C] +<g#1>[C] -<gd_dash>[C] == 0;
  [linear] <y_w_link>: <w#1>[B] -<y#1>[B] +2<w#2>[B] -<y#2>[B] +3<w#3>[B] -<y#3>[B] +4<w#4>[B] -<y#4>[B] +5<w#5>[B] -<y#5>[B] +6<w#6>[B] -<y#6>[B] +7<w#7>[B] -<y#7>[B] +8<w#8>[B] -<y#8>[B] +9<w#9>[B] -<y#9>[B] +10<w#10>[B] -<y#10>[B] +11<w#11>[B] -<y#11>[B] +12<w#12>[B] -<y#12>[B] +13<w#13>[B] -<y#13>[B] +14<w#14>[B] -<y#14>[B] +15<w#15>[B] -<y#15>[B] +16<w#16>[B] -<y#16>[B] +17<w#17>[B] -<y#17>[B] +18<w#18>[B] -<y#18>[B] +19<w#19>[B] -<y#19>[B] == 0;
  [setppc] <sum_ws=1>:  +<w#0>[B] +<w#1>[B] +<w#2>[B] +<w#3>[B] +<w#4>[B] +<w#5>[B] +<w#6>[B] +<w#7>[B] +<w#8>[B] +<w#9>[B] +<w#10>[B] +<w#11>[B] +<w#12>[B] +<w#13>[B] +<w#14>[B] +<w#15>[B] +<w#16>[B] +<w#17>[B] +<w#18>[B] +<w#19>[B] == 1;
  [linear] <set_g1>:  -<g#1>[C] +<w#0>[B] +0.00673794699908547<w#1>[B] +4.53999297624849e-05<w#2>[B] +3.05902320501826e-07<w#3>[B] +2.06115362243856e-09<w#4>[B] == 0;
END
presolving:
(round 1, fast)       42 del vars, 6 del conss, 0 add conss, 0 chg bounds, 0 chg sides, 0 chg coeffs, 0 upgd conss, 0 impls, 0 clqs
(round 2, medium)     59 del vars, 25 del conss, 0 add conss, 0 chg bounds, 0 chg sides, 2 chg coeffs, 0 upgd conss, 0 impls, 0 clqs
(round 3, exhaustive) 59 del vars, 26 del conss, 23 add conss, 0 chg bounds, 0 chg sides, 2 chg coeffs, 0 upgd conss, 0 impls, 0 clqs
presolving (4 rounds: 4 fast, 3 medium, 2 exhaustive):
 59 deleted vars, 26 deleted constraints, 23 added constraints, 0 tightened bounds, 0 added holes, 0 changed sides, 2 changed coefficients
 0 implications, 0 cliques
presolved problem has 46 variables (0 bin, 0 int, 0 impl, 46 cont) and 43 constraints
     22 constraints of type <soc>
     21 constraints of type <linear>
Presolving Time: 0.00

 time | node  | left  |LP iter|LP it/n|mem/heur|mdpt |vars |cons |rows |cuts |sepa|confs|strbr|  dualbound   | primalbound  |  gap   | compl. 
  0.0s|     1 |     0 |    20 |     - |  1231k |   0 |  46 |  43 |  21 |   0 |  0 |   0 |   0 | 8.377484e+01 |      --      |    Inf | unknown
  0.0s|     1 |     0 |    40 |     - |  1248k |   0 |  46 |  43 |  42 |  21 |  1 |   0 |   0 | 8.377484e+01 |      --      |    Inf | unknown
  0.0s|     1 |     0 |    63 |     - |  1263k |   0 |  46 |  43 |  64 |  43 |  2 |   0 |   0 | 1.599056e+02 |      --      |    Inf | unknown
  0.0s|     1 |     0 |    63 |     - |  1263k |   0 |  46 |  43 |  64 |  43 |  2 |   0 |   0 | 1.599056e+02 |      --      |    Inf | unknown
  0.0s|     1 |     0 |    95 |     - |  1305k |   0 |  46 |  43 |  85 |  64 |  3 |   0 |   0 | 3.224634e+02 |      --      |    Inf | unknown
  0.0s|     1 |     0 |    95 |     - |  1305k |   0 |  46 |  43 |  83 |  64 |  3 |   0 |   0 | 3.224634e+02 |      --      |    Inf | unknown
  0.0s|     1 |     0 |   103 |     - |  1352k |   0 |  46 |  43 | 105 |  86 |  4 |   0 |   0 | 6.469376e+02 |      --      |    Inf | unknown
  0.0s|     1 |     0 |   103 |     - |  1352k |   0 |  46 |  43 | 104 |  86 |  4 |   0 |   0 | 6.469376e+02 |      --      |    Inf | unknown
  0.0s|     1 |     0 |   110 |     - |  1354k |   0 |  46 |  43 | 125 | 107 |  5 |   0 |   0 | 1.294683e+03 |      --      |    Inf | unknown
  0.0s|     1 |     0 |   110 |     - |  1354k |   0 |  46 |  43 | 124 | 107 |  5 |   0 |   0 | 1.294683e+03 |      --      |    Inf | unknown
  0.0s|     1 |     0 |   131 |     - |  1360k |   0 |  46 |  43 | 145 | 128 |  6 |   0 |   0 | 2.589027e+03 |      --      |    Inf | unknown
  0.0s|     1 |     0 |   131 |     - |  1360k |   0 |  46 |  43 | 144 | 128 |  6 |   0 |   0 | 2.589027e+03 |      --      |    Inf | unknown
  0.0s|     1 |     0 |   161 |     - |  1365k |   0 |  46 |  43 | 165 | 149 |  7 |   0 |   0 | 5.175120e+03 |      --      |    Inf | unknown
  0.0s|     1 |     0 |   161 |     - |  1365k |   0 |  46 |  43 | 164 | 149 |  7 |   0 |   0 | 5.175120e+03 |      --      |    Inf | unknown
  0.0s|     1 |     0 |   201 |     - |  1369k |   0 |  46 |  43 | 185 | 170 |  8 |   0 |   0 | 1.033773e+04 |      --      |    Inf | unknown
 time | node  | left  |LP iter|LP it/n|mem/heur|mdpt |vars |cons |rows |cuts |sepa|confs|strbr|  dualbound   | primalbound  |  gap   | compl. 
  0.0s|     1 |     0 |   201 |     - |  1369k |   0 |  46 |  43 | 184 | 170 |  8 |   0 |   0 | 1.033773e+04 |      --      |    Inf | unknown
  0.0s|     1 |     0 |   243 |     - |  1431k |   0 |  46 |  43 | 202 | 188 |  9 |   0 |   0 | 2.062513e+04 |      --      |    Inf | unknown
  0.0s|     1 |     0 |   244 |     - |  1431k |   0 |  46 |  43 | 201 | 188 |  9 |   0 |   0 | 2.062515e+04 |      --      |    Inf | unknown
  0.0s|     1 |     0 |   267 |     - |  1431k |   0 |  46 |  43 | 206 | 206 | 10 |   0 |   0 | 4.104987e+04 |      --      |    Inf | unknown
  0.0s|     1 |     0 |   267 |     - |  1431k |   0 |  46 |  43 | 205 | 206 | 10 |   0 |   0 | 4.104987e+04 |      --      |    Inf | unknown
  0.0s|     1 |     0 |   289 |     - |  1431k |   0 |  46 |  43 | 223 | 224 | 11 |   0 |   0 | 8.130627e+04 |      --      |    Inf | unknown
  0.0s|     1 |     0 |   289 |     - |  1431k |   0 |  46 |  43 | 222 | 224 | 11 |   0 |   0 | 8.130627e+04 |      --      |    Inf | unknown
  0.0s|     1 |     0 |   320 |     - |  1431k |   0 |  46 |  43 | 239 | 241 | 12 |   0 |   0 | 1.595004e+05 |      --      |    Inf | unknown
  0.0s|     1 |     0 |   320 |     - |  1431k |   0 |  46 |  43 | 238 | 241 | 12 |   0 |   0 | 1.595004e+05 |      --      |    Inf | unknown
  0.0s|     1 |     0 |   345 |     - |  1465k |   0 |  46 |  43 | 256 | 259 | 13 |   0 |   0 | 3.099052e+05 |      --      |    Inf | unknown
  0.0s|     1 |     0 |   345 |     - |  1465k |   0 |  46 |  43 | 255 | 259 | 13 |   0 |   0 | 3.099052e+05 |      --      |    Inf | unknown
  0.0s|     1 |     0 |   370 |     - |  1509k |   0 |  46 |  43 | 269 | 273 | 14 |   0 |   0 | 1.409724e+06 |      --      |    Inf | unknown
  0.0s|     1 |     0 |   370 |     - |  1509k |   0 |  46 |  43 | 267 | 273 | 14 |   0 |   0 | 1.409724e+06 |      --      |    Inf | unknown
(node 1) numerical troubles in LP 24 -- unresolved
(node 1) unresolved numerical troubles in LP 24 -- using pseudo solution instead (loop 1)
(node 1) forcing the solution of an LP (last LP 24)...
(node 1) numerical troubles in LP 32 -- unresolved
[solve.c:3912] ERROR: (node 1) unresolved numerical troubles in LP 32 cannot be dealt with
[solve.c:4193] ERROR: Error <-6> in function call
[solve.c:4990] ERROR: Error <-6> in function call
[scip_solve.c:2650] ERROR: Error <-6> in function call
[data_bnsl.c:1529] ERROR: Error <-6> in function call
[data_bnsl.c:1997] ERROR: Error <-6> in function call
[probdata_bnsl.c:402] ERROR: Error <-6> in function call
[probdata_bnsl.c:470] ERROR: Error <-6> in function call
[probdata_bnsl.c:1053] ERROR: Error <-6> in function call
[reader_bnsl.c:400] ERROR: Error <-6> in function call
[reader.c:232] ERROR: Error <-6> in function call
[scip_prob.c:379] ERROR: Error <-6> in function call
[scipshell.c:89] ERROR: Error <-6> in function call
[scipshell.c:391] ERROR: Error <-6> in function call
[cmain.c:92] ERROR: Error <-6> in function call
SCIP Error (-6): error in LP solver