=================================================================== RCS file: /home/cvs/OpenXM/src/k097/lib/minimal/minimal-test.k,v retrieving revision 1.3 retrieving revision 1.6 diff -u -p -r1.3 -r1.6 --- OpenXM/src/k097/lib/minimal/minimal-test.k 2000/06/09 08:04:54 1.3 +++ OpenXM/src/k097/lib/minimal/minimal-test.k 2000/07/26 02:21:31 1.6 @@ -1,4 +1,4 @@ -/* $OpenXM: OpenXM/src/k097/lib/minimal/minimal-test.k,v 1.2 2000/06/08 08:37:53 takayama Exp $ */ +/* $OpenXM: OpenXM/src/k097/lib/minimal/minimal-test.k,v 1.5 2000/06/15 07:38:35 takayama Exp $ */ load["minimal.k"]; def test5() { local a,b,c,cc,v; @@ -214,6 +214,28 @@ def test11() { return(a); } /* f should be a string. */ +/* a=test_ann3("x^3+y^3+z^3"); +It returns the following resolution in 1.5 hours. June 14, 2000. + [ + [ + [ x*Dx+y*Dy+z*Dz-3*h^2 ] + [ -z*Dy^2+y*Dz^2 ] + [ -z*Dx^2+x*Dz^2 ] + [ -y*Dx^2+x*Dy^2 ] + ] + [ + [ 0 , -x , y , -z ] + [ z*Dx^2-x*Dz^2 , x*Dy , x*Dx+z*Dz-3*h^2 , z*Dy ] + [ y*Dx^2-x*Dy^2 , -x*Dz , y*Dz , x*Dx+y*Dy-3*h^2 ] + [ 0 , Dx^2 , -Dy^2 , Dz^2 ] + [ z*Dy^2-y*Dz^2 , x*Dx+y*Dy+z*Dz-2*h^2 , 0 , 0 ] + ] + [ + [ -x*Dx+3*h^2 , y , -z , 0 , -x ] + [ Dy^3+Dz^3 , Dy^2 , -Dz^2 , x*Dx+y*Dy+z*Dz , -Dx^2 ] + ] + ] +*/ def test_ann3(f) { local a,v,ww2,ans2; a = Sannfs3_laScala2(f); @@ -279,11 +301,92 @@ def test12() { ans2 = a[0]; v = [x,y,z]; ww2 = [["x",-1,"y",-1,"z",-1,"Dx",1,"Dy",1,"Dz",1]]; - Sweyl("x,y,z",ww2); - ans2 = ReParse(ans2); + Sweyl("x,y,z",ww2); + ans2 = ReParse(ans2); /* DO NOT FORGET! */ r= IsExact_h(ans2,[x,y,z]); Println(r); Println("It may stop by non-exact statement. The code of Sminimal_v (non-LaScala-Stillman contains bugs."); return([r,ans2]); } + +def test13() { + Println("test13 try to construct a minimal free resolution"); + Println("of a GKZ system [[1,2]]. 6/12, 2000."); + ans2 = GKZ([[1,2]],[0]); + /* Be careful!! It resets the grade to module1, not module1v */ + ww2 = [["x1",-1,"x2",-1,"Dx1",1,"Dx2",1]]; + Sweyl("x1,x2",ww2); + ans2 = ReParse(ans2[0]); + Println(ans2); + return(Sminimal(ans2)); +} + +def test14() { + Println("test14 try to construct a minimal free resolution"); + Println("of a GKZ system [[1,2,3]]. 6/12, 2000."); + ans2 = GKZ([[1,2,3]],[0]); + /* It stops by the strategy error. + July 26, 2000. It works fine after fixing a bug in resol.c */ + ww2 = [["x1",-1,"x2",-1,"x3",-1,"Dx1",1,"Dx2",1,"Dx3",1]]; + Sweyl("x1,x2,x3",ww2); + ans2 = ReParse(ans2[0]); + return(Sminimal(ans2)); +} +def test14a() { + Println("test14a try to construct a minimal free resolution"); + Println("of a GKZ system [[1,2,3]]. 6/12, 2000."); + Println("Without automatic homogenization."); + ww2 = [["x1",-1,"x2",-1,"x3",-1,"Dx1",1,"Dx2",1,"Dx3",1]]; + Sweyl("x1,x2,x3",ww2); + ans2 = [x1*Dx1+2*x2*Dx2+3*x3*Dx3 , Dx1^2-Dx2*h , -Dx1*Dx2+Dx3*h , + Dx2^2-Dx1*Dx3 ]; + ans2 = ReParse(ans2); + return(Sminimal(ans2,"homogenized")); +} + +def test15() { + Println("test15 try to construct a minimal free resolution"); + Println("of a GKZ system [[1,2,3]] by the order filt. 6/12, 2000."); + ww2 = [["Dx1",1,"Dx2",1,"Dx3",1]]; + Sweyl("x1,x2,x3",ww2); + ans2 = GKZ([[1,2,3]],[0]); + ans2 = ReParse(ans2[0]); + return(Sminimal(ans2)); +} + +def test15b() { + Println("test15b try to construct a minimal free resolution"); + Println("of toric [[1,2,3]] by the order filt. 6/12, 2000."); + ww2 = [["Dx1",1,"Dx2",1,"Dx3",1]]; + Sweyl("x1,x2,x3",ww2); + ans2 = [Dx1^2-Dx2*h , -Dx1*Dx2+Dx3*h , Dx2^2-Dx1*Dx3 ]; + ans2 = ReParse(ans2); + return(Sminimal(ans2,"homogenized")); +} + +def test16() { + Println("test16 try to construct a minimal free resolution"); + Println("of a GKZ system [[1,2,3,5]] by the order filt. 6/12, 2000."); + ww2 = [["Dx1",1,"Dx2",1,"Dx3",1,"Dx4",1]]; + Sweyl("x1,x2,x3,x4",ww2); + ans2 = GKZ([[1,2,3,5]],[0]); + ans2 = ReParse(ans2[0]); + return(Sminimal(ans2)); +} + +def test16b() { + Println("test16b try to construct a minimal free resolution"); + Println("of a toric [[1,2,3,5]] by the order filt. 6/12, 2000."); + ww2 = [["Dx1",1,"Dx2",1,"Dx3",1,"Dx4",1]]; + Sweyl("x1,x2,x3,x4",ww2); + ans2 = GKZ([[1,2,3,5]],[0]); + ans3 = Rest(ans2[0]); + ans3 = ReParse(ans3); + Println("Toric variety:"); + Println(ans3); + return(Sminimal(ans3)); +} + + +