Titlebook: Discriminants, Resultants, and Multidimensional Determinants; Israel M. Gelfand,Mikhail M. Kapranov,Andrei V. Ze Book 1994 Springer Scienc

Irksome

HARP

禮節(jié)

Associated Varieties and General Resultants vector subspaces in C. correspond to projective subspaces in .., we see that .(.) parametrizes (.?1)-dimensional projective subspaces in ... In a more invariant fashion, we can start from any finite-dimensional vector space . and construct the Grassmannian .(.) of .dimensional vector subspaces in ..

大溝

Triangulations and Secondary Polytopesertain class of polytopes, called ., whose vertices correspond to certain triangulations of a given convex polytope. These polytopes will play a crucial role later in the study of the Newton polytopes of discriminants and resultants. The constructions in this chapter are quite elementary.

–吃

https://doi.org/10.1007/978-0-8176-4771-1algebra; algebraic geometry; elimination theory; geometry; hyperdeterminants; mathematics; polytopes; resul

Dysarthria

反應(yīng)

Israel M. Gelfand,Mikhail M. Kapranov,Andrei V. ZeThe definitive text on eliminator theory.Revives the classical theory of resultants and discriminants.Presents both old and new results of the theory

Diuretic

Modern Birkh?user Classicshttp://image.papertrans.cn/e/image/281221.jpg

Cabg318

Discriminants, Resultants, and Multidimensional Determinants

思考而得

Projective Dual Varieties and General Discriminants∈ C, which are not all equal to 0 and are regarded modulo simultaneous multiplication by a non-zero number. More generally, if . is a finite-dimensional complex vector space, then we denote by .(.) the projectivization of ., i.e., the set of 1-dimensional vector subspaces in .. Thus .. = .(C.).