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on an upper bound for the arithmetic self-intersection ...CORE
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von ULF KÜHN · · Zitiert von: 1 — ULF KÜHN. Abstract. We give an upper bound for the arithmetic self-intersec- tion number of the dualizing sheaf on arithmetic surfaces that arise from Belyi ... von ULF KÜHN · · Zitiert von: 1 — ULF KÜHN. Abstract. We give an upper bound for the arithmetic self-intersec- tion number of the dualizing sheaf on arithmetic surfaces that arise from Belyi ...
On the Height Conjecture for Algebraic Points on Curves ...Springer
link.springer.com
von U Kühn · Zitiert von: 1 — Ulf Kühn. Chapter Accesses. Part of the Progress in Mathematics ... Ulf Kühn. Authors. Ulf Kühn. View author publications. You can also search for ... von U Kühn · Zitiert von: 1 — Ulf Kühn. Chapter Accesses. Part of the Progress in Mathematics ... Ulf Kühn. Authors. Ulf Kühn. View author publications. You can also search for ...
A geometric approach to constructing elements of $K_2$ of ...ResearchGate
www.researchgate.net
... Ulf Kühn at University of Hamburg · Ulf Kühn · University of Hamburg · Steffen Müller at University of Groningen · Steffen Müller · University of Groningen Ulf Kühn at University of Hamburg · Ulf Kühn · University of Hamburg · Steffen Müller at University of Groningen · Steffen Müller · University of Groningen.
Number Fields and Function Fields—Two Parallel Worlds ...link.springer.com › book
link.springer.com
... Conjecture for Algebraic Points on Curves Defined over Number Fields. Ulf Kühn. Pages PDF · A Note on Absolute Derivations and Zeta Functions.
On the arithmetic self-intersection number of the dualizing sheaf on...
archive.org
We study the arithmetic self-intersection number of the dualizing sheaf on arithmetic surfaces with respect to morphisms of a particular kind. We obtain...
Neron-Tate heights on algebraic curves and subgroups of the modular...
edoc.hu-berlin.de
Autor(en): Ulf Kühn. Titel: Neron-Tate heights on algebraic curves and subgroups of the modular group. Erscheinungsdatum: Erschienen in ...
N ron-Tate heights on algebraic curves and subgroups of ...ResearchGate
www.researchgate.net
... Ulf Kühn at ... A short note on a conjecture of Okounkov about a q-analogue of multiple zeta values. July Ulf Kühn · Henrik Bachmann Ulf Kühn at ... A short note on a conjecture of Okounkov about a q-analogue of multiple zeta values. July Ulf Kühn · Henrik Bachmann.
On the Height Conjecture for Algebraic Points on Curves Defined over...
link.springer.com
We study the basic height conjecture for points on curves defined over number fields and show: On any algebraic curve defined over a number field the set of...
short note on multiple des
ftp.listingcake.com
NT] 25 Jul A short note on a conjecture of Okounkov about a q-analogue of multiple zeta values Henrik Bachmann, Ulf Kühn Note the initial column of 1's.
On the Height Conjecture for Algebraic Points Springer LINK
link.springer.com
von U Kühn · · Zitiert von: 1 — ... Algebraic Points on Curves Defined over Number Fields. Ulf Kühn. Chapter Accesses. Part of the Progress in Mathematics book series (PM,volume 239) ... › chapter
Sinn und Unsinn von Energie-TochtergesellschaftenForum Contracting
energietagung.de
Ulf Kühn. Geschäftsführer, ImmoTherm GmbH, Stuttgart. 14:35 Uhr. Meinungs- und Erfahrungsaustausch zwischen den Teilnehmern. 15:00 Uhr. Ende der Videokonferenz. Ulf Kühn. Geschäftsführer, ImmoTherm GmbH, Stuttgart. 14:35 Uhr. Meinungs- und Erfahrungsaustausch zwischen den Teilnehmern. 15:00 Uhr. Ende der Videokonferenz.
Néron-Tate heights on algebraic curves and subgroups of the modular...
link.springer.com
Combining Arakelov theory with Belyi’s theorem we derive that the values of the Néron-Tate height pairing for divisors on algebraic curves defin
Jürg Kramer - Wikidata
www.wikidata.org
— Ulf Kühn. 1 reference. stated in · Mathematics Genealogy Project · Thomas Borek. 1 reference. stated in · Mathematics Genealogy Project. › wiki
Number Fields and Function Fields—Two Parallel Worlds | SpringerLink
link.springer.com
Ever since the analogy between number fields and function fields was discovered, it has been a source of inspiration for new ideas, and a long history has not...
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