Multivariable period rings of p-adic false Tate curve extension

Abstract

Let p≥ 3 be a prime number and K be a finite extension of Qp with uniformizer πK. In this article, we introduce two multivariable period rings AF,Knp and AF,Knp,c for the \'etale (,F,K)-modules of p-adic false Tate curve extension K(πK1/p∞,ζp∞). Various properties of these rings are studied and as applications, we show that (,F,K)-modules over these rings bridge (,)-modules and (,τ)-modules over imperfect period rings in both classical and cohomological sense, which answers a question of Caruso. Finally, we construct the operator for false Tate curve extension and discuss the possibility to calculate Iwasawa cohomology for this extension via (,F,K)-modules over these rings.