@article{Huber:1997aa,
    Abstract = {The stable mixed volume of the Newton polytopes of a polynomial system is defined and shown to equal (genetically) the number of zeros in affine space Cn. This result refines earlier bounds by Rojas, Li, and Wang {$[$}5{$]$}, {$[$}7{$]$}, {$[$}8{$]$}. The homotopies in {$[$}4{$]$}, {$[$}9{$]$}, and {$[$}10{$]$} extend naturally to a computation of all isolated zeros in Cn},
    Author = {Huber, B. and Sturmfels, B.},
    Date = {1997/03/01},
    File = {Bernstein’s theorem in affine space - BF02770870 - a.pdf},
    ISBN = {1432-0444},
    Journal = {Discrete \& Computational Geometry},
    Number = {2},
    Pages = {137--141},
    Title = {Bernstein's theorem in affine space},
    URL = {https://doi.org/10.1007/BF02770870},
    Volume = {17},
    Year = {1997},
    bdsk-url-1 = {https://doi.org/10.1007/BF02770870},
    date-added = {2022-11-26 08:53:34 +0100},
    date-modified = {2022-11-26 08:53:34 +0100},
    id = {Huber1997},
    doi = {10.1007/BF02770870}
}

@article{Huber:1997aa, Abstract = {The stable mixed volume of the Newton polytopes of a polynomial system is defined and shown to equal (genetically) the number of zeros in affine space Cn. This result refines earlier bounds by Rojas, Li, and Wang {$[$}5{$]$}, {$[$}7{$]$}, {$[$}8{$]$}. The homotopies in {$[$}4{$]$}, {$[$}9{$]$}, and {$[$}10{$]$} extend naturally to a computation of all isolated zeros in Cn}, Author = {Huber, B. and Sturmfels, B.}, Date = {1997/03/01}, File = {Bernstein’s theorem in affine space - BF02770870 - a.pdf}, ISBN = {1432-0444}, Journal = {Discrete \& Computational Geometry}, Number = {2}, Pages = {137--141}, Title = {Bernstein's theorem in affine space}, URL = {https://doi.org/10.1007/BF02770870}, Volume = {17}, Year = {1997}, bdsk-url-1 = {https://doi.org/10.1007/BF02770870}, date-added = {2022-11-26 08:53:34 +0100}, date-modified = {2022-11-26 08:53:34 +0100}, id = {Huber1997}, doi = {10.1007/BF02770870} }