TL;DR
This paper discusses the universal elliptic curve with a level three structure, providing a detailed reference useful for applications in elliptic cohomology and stable homotopy theory.
Contribution
It offers a comprehensive analysis of the universal elliptic curve with level three structure, serving as a reference for related mathematical applications.
Findings
Detailed description of the universal elliptic curve with level three structure
Clarification of the structure's properties over invertible base
Facilitates applications in elliptic cohomology and homotopy theory
Abstract
We give a detailed discussion of the universal example of an elliptic curve equipped with a level three structure over a base on which three is invertible. This is intended as a convenient reference for applications in elliptic cohomology and stable homotopy theory.
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Taxonomy
TopicsAlgebraic Geometry and Number Theory · Homotopy and Cohomology in Algebraic Topology · Geometric and Algebraic Topology