Counting subalgebras of on
Abstract
Let o be a compact discrete valuation ring and n≥ 2. We introduce a method to study the cotype zeta function of subalgebras of on. This multivariable series encodes the number of finite-index subalgebras of the o-algebra on of a given elementary divisor type. We express this zeta function as a finite sum of o-adic integrals and compute these integrals in many cases. As a first application, we recover known results in a natural way from our approach. For instance, we obtain a lower bound for the abscissa of convergence of the subalgebra zeta function of on by exhibiting an explicit pole. We also determine the number of irreducible subrings of on of small index. As a second application, we give an explicit formula for the cotype zeta function of subalgebras of o4.
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