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D.15.5.18 evaluatePDivisor

Procedure from library divisors.lib (see divisors_lib).

Usage:
evaluatePDivisor(D,v); D = pdivisor, v = intvec.

Assume:
D is a polyhedral divisor on X and v is a point in the dual of the tailcone of the coefficients.

Return:
a formal divisor on X

Theory:
Will evaluate the polyhedral sum to an integer formal sum.

Example:
 
LIB "divisors.lib";
LIB("polymake.so");
ring r=31991,(x,y,z),dp;
ideal I = y^2*z - x*(x-z)*(x+3*z);
qring Q = std(I);
divisor A = makeDivisor(ideal(x,z),ideal(1));
divisor B = makeDivisor(ideal(x,y),ideal(1));
intmat M[4][4]= 1,4,0,0,
1,0,3,0,
0,0,0,2,
1,1,1,1;
polytope PP = polytopeViaPoints(M);
pdivisor pD = makePDivisor(list(list(PP,A),list(PP,B)));
intvec v=1,1,1;
evaluatePDivisor(pD,v);


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