ApCoCoA-1:Bertini.BPCSSolve
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Revision as of 14:15, 12 May 2010 by 132.231.10.53 (talk)
Bertini.BPCSSolve
Sampling a positive dimensional homogeneous or non-homogeneous polynomial system.
Syntax
Bertini.BPCSSolve(P:LIST, SysTyp:STRING , ConfigSet:LIST):LIST
Description
Please note:
Please note: The function(s) explained on this page is/are using the ApCoCoAServer. You will have to start the ApCoCoAServer in order to use it/them.
Please note: For sampling you need to write (or generate by a positive dimensional run) the witness data file. Then save this file with the name "witness_data" in ApCoCoA directory/Bertini, Otherwise you will get an error message.
@param P: List of polynomials of the given system.
@param SysTyp: Type of polynomials in the system P. Homogeneous ("hom") or nonhomogeneous ("Nhom").
@param ConfigSet: List of strings representing configurations to be used. Bertini uses multiple configuration settings. These configurations should be provided by the user. If you want to use default configurations then set ConfigSet := ["TRACKTYPE: 2"]. If you want to provide specific configurations then simply add them to ConfigSet.For details about configuration settings see Bertini manual http://www.nd.edu/~sommese/bertini/BertiniUsersManual.pdf.
@return A list of lists containing witness point supersets.
Example
-- An example of sampling using default configurations -- We want to sample positive dimensional homogenous system (y-x^2)*(x^2+y^2+z^2-1)*(x-5), (z-x^3)*(x^2+y^2+z^2-1)*(y-5), -- (y-x^2)*(z-x^3)*(x^2+y^2+z^2-1)*(z-5). Use S ::= QQ[x,y,z]; P := [(y-x^2)*(x^2+y^2+z^2-1)*(x-5), (z-x^3)*(x^2+y^2+z^2-1)*(y-5),(y-x^2)*(z-x^3)*(x^2+y^2+z^2-1)*(z-5)]; SysTyp := <quotes>Nhom</quotes>; ConfigSet := [<quotes>TRACKTYPE: 2</quotes>]; -- Save the file witness_data in ApCoCoA directory/Bertini. In this exammple we can use the following file. 4 3 1 2 52 5.565526640875543e-01 3.486877417858003e-01 3.500659632917004e-01 -6.132734154671150e-01 -5.721270410075433e-01 2.012168578122028e-03 6.863472388783394e-01 5.972202311132409e-01 52 5.565526640873006e-01 3.486877417858785e-01 3.500659632926851e-01 -6.132734154660159e-01 -5.721270410085784e-01 2.012168576850362e-03 6.863472388783461e-01 5.972202311130588e-01 1.000000000000000e+00 0 3.319220103162024e-03 0.000000000000000e+00 10 1 0 0 52 5.036510877340633e-01 1.454616573815811e-01 -5.531197782767149e-01 1.264217225328824e-01 4.692782265207243e-01 -7.716455726951312e-01 8.298040333939428e-01 6.089446696116878e-01 52 5.036510877340730e-01 1.454616573815189e-01 -5.531197782770511e-01 1.264217225329790e-01 4.692782265211026e-01 -7.716455726952207e-01 8.298040333939808e-01 6.089446696117080e-01 1.000000000000000e+00 0 1.494343809475570e-03 0.000000000000000e+00 10 1 0 0 2 6 52 1.777791036661873e+00 -5.879389926987107e-01 8.371810169339621e-01 -5.381722763592328e-01 3.596166136115721e-01 -3.879323179323894e-01 1.337065929459078e-01 -2.473259991477609e-01 52 1.777791036661789e+00 -5.879389926985648e-01 8.371810169340158e-01 -5.381722763590965e-01 3.596166136114090e-01 -3.879323179324481e-01 1.337065929459972e-01 -2.473259991477353e-01 9.239465819894503e+00 0 2.311369308586180e-02 0.000000000000000e+00 10 1 3 0 52 2.801078874321721e-01 5.815307461738819e-01 3.602184484724343e-01 -6.856646564513529e-01 -9.183171422752723e-01 1.429861040336559e-01 7.942652024873893e-01 7.828205287876466e-01 52 2.801078874345398e-01 5.815307461783135e-01 3.602184484733199e-01 -6.856646564552420e-01 -9.183171422767007e-01 1.429861040419545e-01 7.942652024894031e-01 7.828205287870957e-01 9.903193701737050e+01 0 6.113734060564361e-04 0.000000000000000e+00 10 1 3 0 52 7.794026532326790e-01 6.438486770366723e-01 -5.511209013756149e-01 -4.552697655906182e-01 3.897013266163394e-01 3.219243385183361e-01 1.054343379801123e+00 5.809168127219385e-01 52 7.794026532326920e-01 6.438486770366824e-01 -5.511209013756679e-01 -4.552697655905938e-01 3.897013266164013e-01 3.219243385183344e-01 1.054343379801143e+00 5.809168127219345e-01 4.374295962959485e+00 0 2.286082168348384e-01 0.000000000000000e+00 10 1 0 0 52 2.480644358066108e-01 2.812814217076330e-01 -5.317945942111184e-01 1.336818293531960e-01 1.829122341866813e-01 -7.805728420468510e-01 8.915030044886882e-01 7.610652719830333e-01 52 2.480644358050654e-01 2.812814217073318e-01 -5.317945942103757e-01 1.336818293522557e-01 1.829122341846779e-01 -7.805728420469515e-01 8.915030044881618e-01 7.610652719839810e-01 6.015239676438355e+02 0 5.166904527784629e-05 0.000000000000000e+00 10 1 3 0 52 1.429155740109253e+00 -5.743679627312509e-01 7.145778700546264e-01 -2.871839813656256e-01 2.279525891501262e-01 -7.528357666690323e-01 1.786444675136565e-01 -7.179599534140634e-02 52 1.429155740109399e+00 -5.743679627313251e-01 7.145778700546536e-01 -2.871839813657727e-01 2.279525891502284e-01 -7.528357666688903e-01 1.786444675135966e-01 -7.179599534147321e-02 1.651321081771953e+01 0 8.707915499833527e-03 0.000000000000000e+00 10 1 1 0 52 7.185714193516700e-01 -2.226007471289887e+00 5.081067233904082e-01 -1.574024977920998e+00 3.592857096758350e-01 -1.113003735644943e+00 -9.638142491390969e-01 5.075337374339561e-01 52 7.185714193515241e-01 -2.226007471290154e+00 5.081067233903571e-01 -1.574024977921150e+00 3.592857096758574e-01 -1.113003735645067e+00 -9.638142491392726e-01 5.075337374340601e-01 3.841442764800970e+01 0 2.603188596646477e-02 0.000000000000000e+00 10 1 2 0 3 1 52 1.299580404330397e+00 -6.044565403080021e-01 6.497902021651987e-01 -3.022282701540011e-01 6.497902021651987e-01 -3.022282701540011e-01 6.497902021651987e-01 -3.022282701540011e-01 52 1.299580404330128e+00 -6.044565403085679e-01 6.497902021653607e-01 -3.022282701541981e-01 6.497902021650848e-01 -3.022282701542752e-01 6.497902021649185e-01 -3.022282701538901e-01 6.896280458897404e+00 0 4.394857579432204e-03 0.000000000000000e+00 10 1 0 0 -1 2 1 2 108723397967774785/1152921504606846976 -1276921637840786251/73786976294838206464 -1830867849111980429/36893488147419103232 -4584732275555858575/4611686018427387904 2 3 4 1 0 0 0 0 0 0 0 0 0 2 4 367776963113838806789/20000000000000000 8578223665279742151/100000000000000000000 -3156090912479527573/100000000000000000 4338464515047412657/2000000000000000000000 -3156090912479527573/100000000000000000 4338464515047412657/2000000000000000000000 -3156090912479527573/100000000000000000 4338464515047412657/2000000000000000000000 -3156090912479527573/100000000000000000 4338464515047412657/2000000000000000000000 -3156090912479527573/100000000000000000 4338464515047412657/2000000000000000000000 -3156090912479527573/100000000000000000 4338464515047412657/2000000000000000000000 -3156090912479527573/100000000000000000 4338464515047412657/2000000000000000000000 4 4028259749117460225/18446744073709551616 -4330798452886879565/36893488147419103232 11914445949293424397/73786976294838206464 10011862545781538653/18446744073709551616 2033170931026697119/18446744073709551616 4595823280080588459/9223372036854775808 10271323522064441169/18446744073709551616 -16068244986954793375/73786976294838206464 2 1 -5527276071396270107/73786976294838206464 6119401794520521373/18446744073709551616 5101220359790769903/36893488147419103232 -8579339317661386167/9223372036854775808 3 1 4 1 0 0 0 0 0 0 0 0 0 1 4 -3156090912479527573/100000000000000000 4338464515047412657/2000000000000000000000 -3156090912479527573/100000000000000000 4338464515047412657/2000000000000000000000 -3156090912479527573/100000000000000000 4338464515047412657/2000000000000000000000 -3156090912479527573/100000000000000000 4338464515047412657/2000000000000000000000 4 4028259749117460225/18446744073709551616 -4330798452886879565/36893488147419103232 11914445949293424397/73786976294838206464 10011862545781538653/18446744073709551616 2033170931026697119/18446744073709551616 4595823280080588459/9223372036854775808 10271323522064441169/18446744073709551616 -16068244986954793375/73786976294838206464 3 0 4 1 0 0 0 0 0 0 0 0 0 0 4 4 4028259749117460225/18446744073709551616 -4330798452886879565/36893488147419103232 11914445949293424397/73786976294838206464 10011862545781538653/18446744073709551616 2033170931026697119/18446744073709551616 4595823280080588459/9223372036854775808 10271323522064441169/18446744073709551616 -16068244986954793375/73786976294838206464 -- Then we compute the sample points with Bertini.BPCSSolve(P,SysTyp,ConfigSet); --For Bertini output files please refer to ApCoCoA directory/Bertini.
See also
