Berkovich spectra of elements in Banach Rings

Abstract

Adapting the notion of the spectrum a for an element a in an ultrametric Banach algebra (as defined by Berkovich), we introduce and briefly study the Berkovich spectrum σBerR(u) of an element u in a Banach ring R. This spectrum is a compact subset of the affine analytic space AZ1 over Z, and the later can be identified with the "equivalence classes" of all elements in all complete valuation fields. If R is generated by u as a unital Banach ring, then σBerR(u) coincides with the spectrum of R (as defined by Berkovich). If R is a unital complex Banach algebra, then σBerR(u) is the "folding up" of the usual spectrum σB(u) alone the real axis. For a non-Archimedean complete valuation field k and an infinite dimensional ultrametric k-Banach space E with an orthogonal base, if u∈ L(E) is a completely continuous operator, we show that many different ways to define the spectrum of u give the same compact set σBerL(E)(u). As an application, we give a lower bound for the valuations of the zeros of the Fredholm determinant (1- t· u) (as defined by Serre) in complete valuation field extensions of k. Using this, we give a concrete example of a completely continuous operator whose Fredholm determinant does not have any zero in any complete valuation field extension of k.