Odd primary analogs of Real orientations

Jeremy Hahn; Andrew Senger; Dylan Wilson

arXiv:2009.12716·math.AT·May 10, 2023

Odd primary analogs of Real orientations

Jeremy Hahn, Andrew Senger, Dylan Wilson

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Abstract

We define, in $C_{p}$ -equivariant homotopy theory for $p > 2$ , a notion of $μ_{p}$ -orientation analogous to a $C_{2}$ -equivariant Real orientation. The definition hinges on a $C_{p}$ -space $CP_{μ_{p}}^{\infty}$ , which we prove to be homologically even in a sense generalizing recent $C_{2}$ -equivariant work on conjugation spaces. We prove that the height $p - 1$ Morava $E$ -theory is $μ_{p}$ -oriented and that $tmf (2)$ is $μ_{3}$ -oriented. We explain how a single equivariant map $v_{1}^{μ_{p}} : S^{2 ρ} \to Σ^{\infty} CP_{μ_{p}}^{\infty}$ completely generates the homotopy of $E_{p - 1}$ and $tmf (2)$ , expressing a height-shifting phenomenon pervasive in equivariant chromatic homotopy theory.

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TopicsSpatial Cognition and Navigation · Inertial Sensor and Navigation · Mathematics and Applications