逃避责任
发表于 2025-3-25 04:22:32
Textbook 1998ions with Russian mathematicians around VENKOV, VINBERG, MANIN, SHAFAREVICH and the nice guide line of investigations of HILBERT modular surfaces started by HIRZEBRUCH in Bonn. More recently, we can refer to the independent (until now) study of Zeta functions of PICARD modular surfaces in the book [
PLIC
发表于 2025-3-25 09:18:02
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granite
发表于 2025-3-25 15:33:24
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Minikin
发表于 2025-3-25 16:55:02
Partielle Differenzengleichungended by many outstanding mathematicians and it is not finished until these days. For algebraic surfaces we converse in some sense the idea. Let . be algebraic surfaces, say smooth, complex, compact, and . : . → . a finite covering. The branch locus .. of . is a (reduced) divisor on .. For a simple il
Adenocarcinoma
发表于 2025-3-25 21:52:31
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胖人手艺好
发表于 2025-3-26 00:44:14
Allgemeine Betrachtungen über Asymptotik germ . on . through . such that (., .; ., .) is a reduced abelian point. A . along . is a pair (., .), . ≠ 0 a natural number. We say that the abelian point P = (., .; ., .’.’.) . (., .), if . = ., with ., . as above.
admission
发表于 2025-3-26 05:27:20
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remission
发表于 2025-3-26 11:13:29
Orbital Curves, germ . on . through . such that (., .; ., .) is a reduced abelian point. A . along . is a pair (., .), . ≠ 0 a natural number. We say that the abelian point P = (., .; ., .’.’.) . (., .), if . = ., with ., . as above.
FEIGN
发表于 2025-3-26 13:47:02
Picard Modular Surfaces,rresponding to K with higher discriminants. There are some new results for the . modular surfaces of . numbers which are of number theoretic interest in close connection with 2-dimensional versions of . 12-th (class field) and 7-th (transendence) problem. We refer to the monograph .
解脱
发表于 2025-3-26 17:03:23
Textbook 1998years appearing in a lot of special articles. The first four chapters present the heart of this work in a self-contained manner (up to well-known ba sic facts) increased by the new functorial concept of orbital heights living on orbital surfaces. It is extended in chapter 6 to an explicit HURWITZ t