Danz computes the depth of certain twisted group algebra extensions in 10, which are less than the values of the depths of the corresponding untwisted group algebra extensions in 8. In this article, we show that the closely related h-depth of any group crossed product algebra extension is less than or equal to the h-depth of the corresponding (finite rank) group algebra extension. A convenient theoretical underpinning to do so is provided by the entwining structure of a right H-comodule algebra A and a right H-module coalgebra C for a Hopf algebra H. Then A circle times C is an A-coring, where corings have a notion of depth extending h-depth. This coring is Galois in certain cases where C is the quotient module Q of a coideal subalgebra RH. We note that this applies for the group crossed product algebra extension, so that the depth of this Galois coring is less than the h-depth of H in G. Along the way, we show that the subgroup depth behaves exactly like the combinatorial depth with respect to the core of a subgroup, and extend results in 22 to coideal subalgebras of finite dimension.
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