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An Euler system for GU(2, 1).

David Loeffler1, Christopher Skinner2, Sarah Livia Zerbes3

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Summary
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We developed an Euler system for automorphic representations over imaginary quadratic fields. This mathematical tool uses Shimura variety cohomology, advancing number theory research.

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Area of Science:

  • Number Theory
  • Algebraic Geometry
  • Representation Theory

Background:

  • Euler systems are fundamental objects in modern number theory, providing powerful tools for studying arithmetic objects.
  • Automorphic representations, particularly self-dual cuspidal ones, are central to the Langlands program and have deep connections to number fields.
  • Shimura varieties offer a rich geometric framework for studying automorphic forms and their associated arithmetic invariants.

Purpose of the Study:

  • To construct a new Euler system tailored for a specific class of automorphic representations.
  • To associate this Euler system with regular algebraic, essentially conjugate self-dual cuspidal automorphic representations over imaginary quadratic fields.
  • To leverage the cohomology of Shimura varieties as the foundational structure for this construction.

Main Methods:

  • Utilizing the cohomology of Shimura varieties associated with the general linear group GL(2).
  • Employing techniques from algebraic geometry and the theory of automorphic forms.
  • Developing a novel construction of an Euler system that captures arithmetic information of the specified automorphic representations.

Main Results:

  • Successfully constructed an Euler system associated with regular algebraic, essentially conjugate self-dual cuspidal automorphic representations of GL(2) over imaginary quadratic fields.
  • The construction is intrinsically linked to the geometry and cohomology of the relevant Shimura varieties.
  • This provides a new arithmetic object for studying these automorphic representations.

Conclusions:

  • The constructed Euler system offers a new perspective and tool for investigating the arithmetic of automorphic representations over imaginary quadratic fields.
  • This work deepens the understanding of the interplay between number theory, algebraic geometry, and representation theory.
  • The methods used may pave the way for constructing Euler systems in more general settings.