Titlebook: Rigid Geometry of Curves and Their Jacobians; Werner Lütkebohmert Book 2016 Springer International Publishing Switzerland 2016 Algebraic G

大雨

https://doi.org/10.1007/978-3-319-27371-6Algebraic Geometry; Arithmetic Geometry; Number Theory; Several Complex Variables and Analytic Spaces; C

regale

Salivary-Gland

助記

LASH

FOR

lesion

Formal and Rigid Geometry, introduced such spaces in Bosch (Manuscr. Math. 20:1–27, .)..In Sect.?. admissible formal .-schemes and formal blowing-ups are defined. In a canonical way the generic fiber of an admissible formal .-scheme is a formal analytic space..In Sect.?. we will discuss the important result in Theorem?. of R

鴕鳥(niǎo)

Rigid Analytic Curves,rd (in Publ. Math. IHES 36:75–109, .), see also Raynaud (in Proceedings of the Conference on Fundamental Groups of Curves in Algebraic Geometry Held in Luminy, vol.?187, .; Chap.?5)..In Sect.?. the result on the periphery is used to constitute a genus formula in Proposition?. which relates the genus

osteoclasts

Jacobian Varieties,. with semi-abelian reduction. . is a formal torus extension of a formal abelian .-scheme . with reduction ...The generic fiber . of . is the largest connected open subgroup of . which admits a smooth formal .-model; this is discussed in Sect.?. in a more general context. The relationship between th

蓋他為秘密

Raynaud Extensions,cial interest are the polarizations of Jacobians .. There are two, the usual theta polarization and the canonical polarization which is related to a pairing on the homology group . of the curve .. In Sect.?. we discuss these polarizations. This is related to Riemann’s vanishing theorem Corollary?. f