Anti-isomorphisms and involutions on the idealization of the incidence space over the finitary incidence algebra

Abstract

Let K be a field and X a partially ordered set (poset). Let FI(X,K) and I(X,K) be the finitary incidence algebra and the incidence space of X over K, respectively, and let D(X,K)=FI(X,K)(+)I(X,K) be the idealization of the FI(X,K)-bimodule I(X,K). In the first part of this paper, we show that D(X,K) has an anti-automorphism (involution) if and only if X has an anti-automorphism (involution). We also present a characterization of the anti-automorphisms and involutions on D(X,K). In the second part, we obtain the classification of involutions on D(X,K) to the case when characteristic of K is different from 2 and X is a connected poset such that every multiplicative automorphism of FI(X,K) is inner and every derivation from FI(X,K) to I(X,K) is inner (in particular, when X has an element that is comparable with all its elements).

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