步履蹒跚
发表于 2025-3-25 04:01:04
Transport at the Air-Sea Interfacetor. This regulator and its generalizations will play a fundamental role in some of the most intriguing conjectures on L-functions of recent times. These conjectures, due to A. Beilinson, will be discussed in later chapters.
烧瓶
发表于 2025-3-25 10:45:36
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EVICT
发表于 2025-3-25 15:25:36
The Explanation of Flow Systems,e values of L-functions of motives at so-called critical points. We will state the conjectures only for smooth projective varieties defined over the rational numbers, but it should be observed that almost everything can be formulated for motives over arbitrary number fields, the statements becoming just more complicated.
反省
发表于 2025-3-25 17:14:32
The Explanation of Network Form,ic cohomology is enough to give a .-structure on Deligne cohomology with volume (up to a non-zero rational number) equal to the first non-zero coefficient of the Taylor series expansion of the L-function at s = m. This seems to be a general phenomenon.
Mendicant
发表于 2025-3-25 23:47:08
Transport for the Space Economyr map that is conjectured to have dense image, at least for smooth schemes that can be defined over a number field. This conjectured property induces the classical Hodge Conjecture for smooth, projective varieties.
协定
发表于 2025-3-26 01:59:45
The zero-dimensional case: number fields,tor. This regulator and its generalizations will play a fundamental role in some of the most intriguing conjectures on L-functions of recent times. These conjectures, due to A. Beilinson, will be discussed in later chapters.
BYRE
发表于 2025-3-26 08:01:00
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栏杆
发表于 2025-3-26 09:07:06
,Regulators, Deligne’s conjecture and Beilinson’s first conjecture,e values of L-functions of motives at so-called critical points. We will state the conjectures only for smooth projective varieties defined over the rational numbers, but it should be observed that almost everything can be formulated for motives over arbitrary number fields, the statements becoming just more complicated.
intention
发表于 2025-3-26 13:08:38
,Beilinson’s second conjecture,ic cohomology is enough to give a .-structure on Deligne cohomology with volume (up to a non-zero rational number) equal to the first non-zero coefficient of the Taylor series expansion of the L-function at s = m. This seems to be a general phenomenon.
Obstreperous
发表于 2025-3-26 19:43:33
Absolute Hodge cohomology, Hodge and Tate conjectures and Abel-Jacobi maps,r map that is conjectured to have dense image, at least for smooth schemes that can be defined over a number field. This conjectured property induces the classical Hodge Conjecture for smooth, projective varieties.