The stable Picard group of finite Adams Hopf algebroids with an application to the R-motivic Steenrod subalgebra A(1)R

Abstract

In this paper, we investigate the rigidity of the stable comodule category of a specific class of Hopf algebroids known as finite Adams, shedding light on its Picard group. Then we establish a reduction process through base changes, enabling us to effectively compute the Picard group of the R-motivic mod 2 Steenrod subalgebra A(1)R. Our computation shows that Pic(A(1)R) is isomorphic to Z4, where two ranks come from the motivic grading, one from the algebraic loop functor, and the last is generated by the R-motivic joker J.