@inbook{Lakshman1991,
    Abstract = {Let R = ℚ[x1, x2, {\ldots}, xn] denote the ring of polynomials in n variables over the rational numbers ℚ. Let f1, f2,{\ldots}, fr∈ R, r ≥ n with deg(fi) = diand let d = max(di).},
    Address = {Boston, MA},
    Author = {Lakshman, Y. N.},
    BookTitle = {Effective Methods in Algebraic Geometry},
    Editor = {Mora, Teo and Traverso, Carlo},
    ISBN = {978-1-4612-0441-1},
    Pages = {227--234},
    Publisher = {Birkh{\"a}user Boston},
    Title = {A Single Exponential Bound on the Complexity of Computing Gr{\"o}bner Bases of Zero Dimensional Ideals},
    URL = {https://doi.org/10.1007/978-1-4612-0441-1\_15},
    Year = {1991},
    bdsk-url-1 = {https://doi.org/10.1007/978-1-4612-0441-1\_15},
    date-added = {2022-11-26 10:47:37 +0100},
    date-modified = {2022-11-26 10:47:37 +0100},
    doi = {10.1007/978-1-4612-0441-1_15}
}

@inbook{Lakshman1991, Abstract = {Let R = ℚ[x1, x2, {\ldots}, xn] denote the ring of polynomials in n variables over the rational numbers ℚ. Let f1, f2,{\ldots}, fr∈ R, r ≥ n with deg(fi) = diand let d = max(di).}, Address = {Boston, MA}, Author = {Lakshman, Y. N.}, BookTitle = {Effective Methods in Algebraic Geometry}, Editor = {Mora, Teo and Traverso, Carlo}, ISBN = {978-1-4612-0441-1}, Pages = {227--234}, Publisher = {Birkh{\"a}user Boston}, Title = {A Single Exponential Bound on the Complexity of Computing Gr{\"o}bner Bases of Zero Dimensional Ideals}, URL = {https://doi.org/10.1007/978-1-4612-0441-1_15}, Year = {1991}, bdsk-url-1 = {https://doi.org/10.1007/978-1-4612-0441-1_15}, date-added = {2022-11-26 10:47:37 +0100}, date-modified = {2022-11-26 10:47:37 +0100}, doi = {10.1007/978-1-4612-0441-1_15} }