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eBook Families of meromorphic functions on compact Riemann surfaces (Lecture notes in mathematics ; 767) ePub

by Makoto Namba

eBook Families of meromorphic functions on compact Riemann surfaces (Lecture notes in mathematics ; 767) ePub
Author: Makoto Namba
Language: English
ISBN: 0387097228
ISBN13: 978-0387097220
Publisher: Springer-Verlag (1979)
Pages: 284
Category: Mathematics
Subcategory: Science
Rating: 4.1
Votes: 587
Formats: lrf rtf docx doc
ePub file: 1558 kb
Fb2 file: 1133 kb

Families of linear systems on compact Riemann surfaces. Lecture Notes in Mathematics.

Lecture Notes in Mathematics.

Part of the Lecture Notes in Mathematics book series (LNM, volume 767). Families of holomorphic maps of compact complex manifolds. Readable on all devices. Local sales tax included if applicable. Families of effective divisors and linear systems on projective manifolds. Families of linear systems on compact Riemann surfaces.

Lecture Notes in Mathematics, Vol. 767. Index: N-20.

This is an introduction to the geometry of compact Riemann surfaces, largely following .

This is an introduction to the geometry of compact Riemann surfaces, largely following the books Farkas-Kra, Fay, Mumford Tata lectures. 1) Defining Riemann surfaces with atlases of charts, and as locus of solutions of algebraic equations. 2) Space of meromorphic functions and forms, we classify them with the Newton polygon. 3) Abel map, the Jacobian and Theta functions. Fay, Theta Functions on Riemann Surfaces, Lecture Notes in Mathematics, Springer Berlin Heidelberg, Vol. 352, 1973.

Kindle Notes & Highlights. Start by marking Families Of Meromorphic Functions On Compact Riemann Surfaces as Want to Read: Want to Read savin. ant to Read.

Functions meromorphic on some Riemann surfaces Segawa, Shigeo, Nagoya Mathematical Journal, 1978. Meromorphic functions on compact Riemann surfaces Namba, Makoto, Proceedings of the Japan Academy, Series A, Mathematical Sciences, 1978

Functions meromorphic on some Riemann surfaces Segawa, Shigeo, Nagoya Mathematical Journal, 1978. Meromorphic functions on compact Riemann surfaces Namba, Makoto, Proceedings of the Japan Academy, Series A, Mathematical Sciences, 1978. Riemann surfaces in fibered polynomial hulls Whittlesey, Marshall . Arkiv för Matematik, 1999. Meromorphic functions and conformal metrics on Riemann surfaces. Sario, Leo, Pacific Journal of Mathematics, 1962. On the uniform approximation by meromorphic functions on a Riemann surface Tarumoto, Kôichi, Proceedings of the Japan Academy, 1960.

oceedings{1979FamiliesOM, title {Families of meromorphic functions on compact Riemann . A note on smooth multiple fibers in pencils of algebraic curves.

Structure of Hol(V, ?1. Rn(V) for n?.

3 Compact Riemann surface from an algebraic equation We shall denote.

3 Compact Riemann surface from an algebraic equation. The idea is to show that the locus of zeros (in C C) of a polynomial equation P (x, y) 0 is a Riemann surface. This is morally true for all generic polynomials, but there are some subttleties. Let us start by an example where it works directly, and then see why this assertion has to be slightly adapted. M0(Σ) the vector space of meromorphic functions on Σ,, O(Σ) (or sometimes O0(Σ)) the vector space of holomorphic functions on Σ.

This button opens a dialog that displays additional images for this product with the option to zoom in or out. Tell us if something is incorrect. Families of Meromorphic Functions on Compact Riemann Surfaces.

However, $ {check{H}^{1}}(X,mathcal{O} {X,D}) 0 $ because on a non-compact Riemann surface, the cohomology groups of coherent sheaves are zero (open Riemann surfaces are Stein!).

However, $ {check{H}^{1}}(X,mathcal{O} {X,D}) 0 $ because on a non-compact Riemann surface, the cohomology groups of coherent sheaves are zero (open Riemann surfaces are Stein!)

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