Compartir
Polynomial Rings and Affine Algebraic Geometry: Praag 2018, Tokyo, Japan, February 12−16: 319 (Springer Proceedings in Mathematics & Statistics) (en Inglés)
Shigeru Kuroda
(Ilustrado por)
·
Nobuharu Onoda
(Ilustrado por)
·
Gene Freudenburg
(Ilustrado por)
·
Springer
· Tapa Blanda
Polynomial Rings and Affine Algebraic Geometry: Praag 2018, Tokyo, Japan, February 12−16: 319 (Springer Proceedings in Mathematics & Statistics) (en Inglés) - Kuroda, Shigeru ; Onoda, Nobuharu ; Freudenburg, Gene
$ 274.960
$ 458.270
Ahorras: $ 183.310
Elige la lista en la que quieres agregar tu producto o crea una nueva lista
✓ Producto agregado correctamente a la lista de deseos.
Ir a Mis Listas
Origen: Estados Unidos
(Costos de importación incluídos en el precio)
Se enviará desde nuestra bodega entre el
Lunes 27 de Mayo y el
Jueves 06 de Junio.
Lo recibirás en cualquier lugar de Chile entre 1 y 3 días hábiles luego del envío.
Reseña del libro "Polynomial Rings and Affine Algebraic Geometry: Praag 2018, Tokyo, Japan, February 12−16: 319 (Springer Proceedings in Mathematics & Statistics) (en Inglés)"
This proceedings volume gathers selected, peer-reviewed works presented at the Polynomial Rings and Affine Algebraic Geometry Conference, which was held at Tokyo Metropolitan University on February 12-16, 2018. Readers will find some of the latest research conducted by an international group of experts on affine and projective algebraic geometry. The topics covered include group actions and linearization, automorphism groups and their structure as infinite-dimensional varieties, invariant theory, the Cancellation Problem, the Embedding Problem, Mathieu spaces and the Jacobian Conjecture, the Dolgachev-Weisfeiler Conjecture, classification of curves and surfaces, real forms of complex varieties, and questions of rationality, unirationality, and birationality. These papers will be of interest to all researchers and graduate students working in the fields of affine and projective algebraic geometry, as well as on certain aspects of commutative algebra, Lie theory, symplectic geometry and Stein manifolds.