On the number of branches of real curve singularities
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🧮 math.AG
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numberanalyticbranchescurvegermrealcomputingdouble
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There is presented a method for computing the number of branches of a real analytic curve germ from $R^n$ to $R^m$, where m is greater or equal to n, having a singular point at the origin, and the number of half--branches of the set of double points of an analytic germ from $R^2$ to $R^3$.
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