Torsion Points of Generalized Honda Formal Groups

Autor:	S. V. Vostokov, O. V. Demchenko
Rok vydání:	2020
Předmět:	Discrete mathematics Endomorphism Mathematics::Number Theory General Mathematics Multiplicative function Torsion (algebra) Formal group Homomorphism Mathematics::Symplectic Geometry Ring of integers Mathematics
Zdroj:	Vestnik St. Petersburg University, Mathematics. 53:404-411
ISSN:	1934-7855 1063-4541
DOI:	10.1134/s1063454120040044
Popis:	Generalized Honda formal groups are a class of formal groups, which includes all formal groups over the ring of integers of local fields weakly ramified over $${{\mathbb{Q}}_{p}}$$ . This class is the next in the chain multiplicative formal group–Lubin-Tate formal groups–Honda formal groups. The Lubin-Tate formal groups are defined by distinguished endomorphisms [π]F. Honda formal groups have distinguished homomorphisms that factor through [π]F. In this article, we prove that for generalized Honda formal groups, the composition of a sequence of distinguished homomorphisms factors through [π]F . As an application of this fact, a number of properties of πn-torsion points of the generalized Honda formal group are proved.
Databáze:	OpenAIRE
Externí odkaz:	https://explore.openaire.eu/search/publication?articleId=doi_________::10875bbef02cd85a3df045dfd03c4eec https://doi.org/10.1134/s1063454120040044 Zobrazit plný text záznamu Full text from SpringerLink