TL;DR
This paper develops the theory of logarithmic p-divisible groups and finite locally free commutative group schemes, extending classical concepts into the logarithmic setting for better understanding of their structure.
Contribution
It introduces the foundational theory of logarithmic p-divisible groups and finite locally free commutative group schemes, expanding the scope of algebraic geometry in logarithmic contexts.
Findings
Established the structure of logarithmic p-divisible groups.
Extended finite locally free group schemes to the logarithmic setting.
Provided new tools for studying algebraic groups with logarithmic structures.
Abstract
We develop the theory of logarithmic p-divisible groups and the theory of logarithmic finite locally free commutative group schemes.
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Taxonomy
TopicsAlgebraic Geometry and Number Theory · Advanced Algebra and Geometry · Rings, Modules, and Algebras