Abstract
Abstract argumentation is a prominent reasoning framework. It comes with a variety of semantics, and has lately been enhanced by probabilities to enable a quantitative treatment of argumentation. While admissibility is a fundamental notion in the classical setting, it has been merely reflected so far in the probabilistic setting. In this paper, we address the quantitative treatment of argumentation based on probabilistic notions of admissibility in a way that they form fully conservative extensions of classical notions. In particular, our building blocks are not the beliefs regarding single arguments. Instead we start from the fairly natural idea that whatever argumentation semantics is to be considered, semantics systematically induces constraints on the joint probability distribution on the sets of arguments. In some cases there might be many such distributions, even infinitely many ones, in other cases there may be one or none. Standard semantic notions are shown to induce such sets of constraints, and so do their probabilistic extensions. This allows them to be tackled by SMT solvers, as we demonstrate by a proof-of-concept implementation. We present a taxonomy of semantic notions, also in relation to published work, together with a running example illustrating our achievements.
Highlights
In its basic form, an abstract argumentation framework (AF) (Dung 1995) consists of a set of abstract arguments together with a binary relation that represent conflicts between arguments, the so-called attack relation
We focus on the emerging field of AFs in the probabilistic setting
We present a prototypical tool for studying a variety of questions arising in a probabilistic abstract argumentation frameworks (PrAFs)
Summary
In its basic form, an abstract argumentation framework (AF) (Dung 1995) consists of a set of abstract arguments together with a binary relation that represent conflicts between arguments, the so-called attack relation. When lifting the classical concepts from AFs to PrAFs, especially the notion of admissibility gives rise to a hierarchy of different interpretations and lead to an entire taxonomy of semantics Along this discussion, it becomes apparent that each lifted semantics concept imposes a set of constraints on the joint probability distributions of arguments to hold and not to hold. Our contribution is fourfold: We (i) provide a profound study of admissibility and completeness in a probability-theoretic approach to abstract argumentation, (ii) discuss a hierarchy of resulting semantics in the context of earlier work, (iii) present prototypical tool support for experimenting with these notions and further context-specific constraints, and (iv) explicate our contributions by means of the vehicle example introduced above
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