How Many Zeroes? : Counting Solutions of Systems of Polynomials via Toric Geometry at Infinity / Pinaki Mondal

(Visualizza in formato marc) (Visualizza in BIBFRAME)

Autore:	Mondal, Pinaki
Titolo:	How Many Zeroes? : Counting Solutions of Systems of Polynomials via Toric Geometry at Infinity / Pinaki Mondal
Pubblicazione:	Cham, : Springer, 2021
Descrizione fisica:	xv, 352 p. : ill. ; 24 cm
Soggetto topico:	14-XX - Algebraic geometry [MSC 2020]
	13-XX - Commutative algebra [MSC 2020]
	52A39 - Mixed volumes and related topics in convex geometry [MSC 2020]
	52B20 - Lattice polytopes in convex geometry (including relations with commutative algebra and algebraic geometry) [MSC 2020]
	14M25 - Toric varieties, Newton polyhedra, Okounkov bodies [MSC 2020]
Soggetto non controllato:	Affine Bezout problem
	BKK theorem
	Bernstein-Kushnirenko theorem
	Bezout's theorem
	Intersection multiplicity
	Milnor number
	Newton number
	Non-degenerate polynomials
	Number of solutions/zeros of systems of polynomials
	Toric Varieties
Titolo autorizzato:	How Many Zeroes
Formato:	Materiale a stampa
Livello bibliografico	Monografia
Lingua di pubblicazione:	Inglese
Record Nr.:	VAN0274826
Lo trovi qui:	Univ. Vanvitelli
Localizzazioni e accesso elettronico	https://doi.org/10.1007/978-3-030-75174-6
Opac:	Controlla la disponibilità qui

Serie: CMS/CAIMS Books in Mathematics / Canadian Mathematical Society, Canadian Applied and Industrial Mathematics Society Berlin [etc.] . -Springer ; 2