@article {IOPORT.06008021,
    author       = {Borodzik, Maciej},
    title        = {Puiseux expansion of a cuspidal singularity.},
    year         = {2012},
    journal      = {Bulletin of the Polish Academy of Sciences, Mathematics},
    volume       = {60},
    number       = {1},
    issn         = {0239-7269},
    pages        = {21-25},
    publisher    = {Instytut Matematyczny PAN, Warszawa},
    doi          = {10.4064/ba60-1-2},
    abstract     = {It is well-known that the topological type of a locally irreducible complex plane curve singularity is determined by its Puiseux parametrization $y=c_qx^{q/p}+c_{q+1}x^{(q+1)/p}+\cdots$. The article provides a new and efficient method how one can recover the Piseux parametrization from a local parametrization of type $x(t)=a_0t^p+a_1t^{p+1}+\cdots$, $y(t)=b_0t^q+b_1t^{q+1}+\cdots$.},
    reviewer     = {Andras Nemethi (Budapest)},
    identifier   = {06008021},
}