@inproceedings{10.1145/3373207.3404028,
    Abstract = {We present an algorithm which for any given ideal I ⊆ K[x, y] finds all elements of I that have the form f(x) - g(y), i.e., all elements in which no monomial is a multiple of xy.},
    Address = {New York, NY, USA},
    Author = {Buchacher, Manfred and Kauers, Manuel and Pogudin, Gleb},
    BookTitle = {Proceedings of the 45th International Symposium on Symbolic and Algebraic Computation},
    ISBN = {9781450371001},
    Location = {Kalamata, Greece},
    Pages = {54--61},
    Publisher = {Association for Computing Machinery},
    Series = {ISSAC '20},
    Title = {Separating Variables in Bivariate Polynomial Ideals},
    URL = {https://doi.org/10.1145/3373207.3404028},
    Year = {2020},
    bdsk-url-1 = {https://doi.org/10.1145/3373207.3404028},
    date-added = {2021-03-30 22:11:53 +0200},
    date-modified = {2021-03-30 22:11:53 +0200},
    numpages = {8},
    doi = {10.1145/3373207.3404028}
}

@inproceedings{10.1145/3373207.3404028, Abstract = {We present an algorithm which for any given ideal I ⊆ K[x, y] finds all elements of I that have the form f(x) - g(y), i.e., all elements in which no monomial is a multiple of xy.}, Address = {New York, NY, USA}, Author = {Buchacher, Manfred and Kauers, Manuel and Pogudin, Gleb}, BookTitle = {Proceedings of the 45th International Symposium on Symbolic and Algebraic Computation}, ISBN = {9781450371001}, Location = {Kalamata, Greece}, Pages = {54--61}, Publisher = {Association for Computing Machinery}, Series = {ISSAC '20}, Title = {Separating Variables in Bivariate Polynomial Ideals}, URL = {https://doi.org/10.1145/3373207.3404028}, Year = {2020}, bdsk-url-1 = {https://doi.org/10.1145/3373207.3404028}, date-added = {2021-03-30 22:11:53 +0200}, date-modified = {2021-03-30 22:11:53 +0200}, numpages = {8}, doi = {10.1145/3373207.3404028} }