I am a Singular newbie.
Suppose the ambient polynomial ring is QQ[x0,...,xN] for QQ a field. How would one calculate the intersection multiplicity of a point in the variety of N curves h1,...,hN in QQ[x1,...,xN] at a point from Q x ... x Q.
This value is equivalent to the (vector) dimension of the local ring at p modulo <h1,...,hN>. In particular, im( p, h1,...,hN ) = dim( {f/g : g(p) <> 0} / <h1,...,hN> );
I am a Singular newbie.
Suppose the ambient polynomial ring is QQ[x0,...,xN] for QQ a field. How would one calculate the intersection multiplicity of a point in the variety of N curves h1,...,hN in QQ[x1,...,xN] at a point from Q x ... x Q.
This value is equivalent to the (vector) dimension of the local ring at p modulo <h1,...,hN>. In particular, im( p, h1,...,hN ) = dim( {f/g : g(p) <> 0} / <h1,...,hN> );
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