| version 1.1, 2000/12/14 13:18:41 |
version 1.5, 2000/12/28 00:08:14 |
|
|
| /* $OpenXM$ */ |
/* $OpenXM: OpenXM/src/k097/lib/restriction/demo.k,v 1.4 2000/12/27 10:16:13 takayama Exp $ */ |
| |
|
| load["restriction.k"];; |
load["restriction.k"];; |
| load("../ox/ox.k");; |
load("../ox/ox.k");; |
| Line 6 load("../ox/ox.k");; |
|
| Line 6 load("../ox/ox.k");; |
|
| def demoSendAsirCommand(a) { |
def demoSendAsirCommand(a) { |
| a.executeString("load(\"bfct\");"); |
a.executeString("load(\"bfct\");"); |
| a.executeString(" def myann(F) { B=ann(eval_str(F)); print(B); return(map(dp_ptod,B,[hoge,x,y,z,s,hh,ee,dx,dy,dz,ds,dhh])); }; "); |
a.executeString(" def myann(F) { B=ann(eval_str(F)); print(B); return(map(dp_ptod,B,[hoge,x,y,z,s,hh,ee,dx,dy,dz,ds,dhh])); }; "); |
| |
a.executeString(" def myann0(F) { B=ann0(eval_str(F)); print(B); return(map(dp_ptod,B[1],[hoge,x,y,z,s,hh,ee,dx,dy,dz,ds,dhh])); }; "); |
| a.executeString(" def mybfct(F) { return(rtostr(bfct(eval_str(F)))); }; "); |
a.executeString(" def mybfct(F) { return(rtostr(bfct(eval_str(F)))); }; "); |
| |
a.executeString(" def mygeneric_bfct(F,VV,DD,WW) { print([F,VV,DD,WW]); return(generic_bfct(F,VV,DD,WW));}; "); |
| } |
} |
| |
|
| as = startAsir(); |
as = startAsir(); |
| Line 31 def asirAnnfsXYZ(a,f) { |
|
| Line 33 def asirAnnfsXYZ(a,f) { |
|
| return(b); |
return(b); |
| } |
} |
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|
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def asir_generic_bfct(a,ii,vv,dd,ww) { |
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local ans; |
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ans = a.rpc_str("mygeneric_bfct",[ii,vv,dd,ww]); |
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return(ans); |
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} |
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/* a=startAsir(); |
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asir_generic_bfct(a,[Dx^2+Dy^2-1,Dx*Dy-4],[x,y],[Dx,Dy],[1,1]): */ |
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|
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/* usage: misc/tmp/complex-ja.texi */ |
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def changeRing(f) { |
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local r; |
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r = GetRing(f); |
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if (Tag(r) == 14) { |
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SetRing(r); |
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return(true); |
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}else{ |
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return(false); |
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} |
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} |
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|
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def asir_BfRoots2(G) { |
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local bb,ans,ss; |
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sm1(" G flatten {dehomogenize} map /G set "); |
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changeRing(G); |
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ss = asir_generic_bfct(asssssir,G,[x,y],[Dx,Dy],[1,1]); |
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bb = [ss]; |
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sm1(" bb 0 get findIntegralRoots { (universalNumber) dc } map /ans set "); |
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return([ans, bb]); |
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} |
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def asir_BfRoots3(G) { |
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local bb,ans,ss; |
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sm1(" G flatten {dehomogenize} map /G set "); |
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changeRing(G); |
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ss = asir_generic_bfct(asssssir,G,[x,y,z],[Dx,Dy,Dz],[1,1,1]); |
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bb = [ss]; |
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sm1(" bb 0 get findIntegralRoots { (universalNumber) dc } map /ans set "); |
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return([ans, bb]); |
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} |
| |
|
| def findMinSol(f) { |
def findMinSol(f) { |
| sm1(" f (string) dc findIntegralRoots 0 get (universalNumber) dc /FunctionValue set "); |
sm1(" f (string) dc findIntegralRoots 0 get (universalNumber) dc /FunctionValue set "); |
| } |
} |
| Line 49 def asirAnnXYZ(a,f) { |
|
| Line 91 def asirAnnXYZ(a,f) { |
|
| return(b); |
return(b); |
| } |
} |
| |
|
| |
|
| def nonquasi2(p,q) { |
def nonquasi2(p,q) { |
| local s,ans,f; |
local s,ans,f; |
| f = x^p+y^q+x*y^(q-1); |
f = x^p+y^q+x*y^(q-1); |
| Line 65 def nonquasi2(p,q) { |
|
| Line 108 def nonquasi2(p,q) { |
|
| Res = Sminimal(pp); |
Res = Sminimal(pp); |
| Res0 = Res[0]; |
Res0 = Res[0]; |
| Println("Step2: (-1,1)-minimal resolution (Res0) "); sm1_pmat(Res0); |
Println("Step2: (-1,1)-minimal resolution (Res0) "); sm1_pmat(Res0); |
| R = BfRoots1(Res0[0],"x,y"); |
/* R = BfRoots1(Res0[0],"x,y"); */ |
| |
R = asir_BfRoots2(Res0[0]); |
| Println("Step3: computing the cohomology of the truncated complex."); |
Println("Step3: computing the cohomology of the truncated complex."); |
| Print("Roots and b-function are "); Println(R); |
Print("Roots and b-function are "); Println(R); |
| R0 = R[0]; |
R0 = R[0]; |
| Ans=Srestall(Res0, ["x", "y"], ["x", "y"], R0[Length(R0)-1]); |
Ans=Srestall(Res0, ["x", "y"], ["x", "y"], R0[Length(R0)-1]); |
| Print("Answer is "); Println(Ans[0]); |
Print("Answer is "); Println(Ans[0]); |
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return(Ans); |
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} |
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|
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def asirAnn0XYZ(a,f) { |
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local p,b,b0; |
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RingD("x,y,z,s"); /* Fix!! See the definition of myann() */ |
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p = ToString(f); |
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b = a.rpc("myann0",[p]); |
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Print("Annhilating ideal of f^r is "); Println(b); |
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return(b); |
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} |
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|
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def DeRham2WithAsir(f) { |
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local s; |
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s = ToString(f); |
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II = asirAnn0XYZ(asssssir,f); |
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Print("Step 1: Annhilating ideal (II)"); Println(II); |
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sm1(" II { [(x) (y) (Dx) (Dy) ] laplace0 } map /II set "); |
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Sweyl("x,y",[["x",-1,"y",-1,"Dx",1,"Dy",1]]); |
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pp = Map(II,"Spoly"); |
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Res = Sminimal(pp); |
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Res0 = Res[0]; |
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Print("Step2: (-1,1)-minimal resolution (Res0) "); sm1_pmat(Res0); |
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/* R = BfRoots1(Res0[0],"x,y"); */ |
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R = asir_BfRoots2(Res0[0]); |
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Println("Step3: computing the cohomology of the truncated complex."); |
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Print("Roots and b-function are "); Println(R); |
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R0 = R[0]; |
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Ans=Srestall(Res0, ["x", "y"], ["x", "y"],R0[Length(R0)-1] ); |
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Print("Answer is ");Println(Ans[0]); |
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return(Ans); |
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} |
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def DeRham3WithAsir(f) { |
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local s; |
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s = ToString(f); |
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II = asirAnn0XYZ(asssssir,f); |
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Print("Step 1: Annhilating ideal (II)"); Println(II); |
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sm1(" II { [(x) (y) (z) (Dx) (Dy) (Dz)] laplace0 } map /II set "); |
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Sweyl("x,y,z",[["x",-1,"y",-1,"z",-1,"Dx",1,"Dy",1,"Dz",1]]); |
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pp = Map(II,"Spoly"); |
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Res = Sminimal(pp); |
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Res0 = Res[0]; |
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Print("Step2: (-1,1)-minimal resolution (Res0) "); sm1_pmat(Res0); |
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/* R = BfRoots1(Res0[0],"x,y,z"); */ |
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R = asir_BfRoots3(Res0[0]); |
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Println("Step3: computing the cohomology of the truncated complex."); |
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Print("Roots and b-function are "); Println(R); |
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R0 = R[0]; |
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Ans=Srestall(Res0, ["x", "y", "z"], ["x", "y", "z"],R0[Length(R0)-1] ); |
| |
Print("Answer is ");Println(Ans[0]); |
| return(Ans); |
return(Ans); |
| } |
} |
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