An \textit{abstract argumentation framework} ({\sc af} for short) is a directed graph (A,R) where A is a set of \textit{abstract arguments} and R⊆A×A is the \textit{attack} relation. Let H=(A,R) be an {\sc af}, S⊆A be a set of arguments and S+={y∣∃x∈S with (x,y)∈R}. Then, S is a \textit{stable extension} in H if and only if S+=A∖S. In this paper, we present a thorough, formal validation of a known backtracking algorithm for listing all stable extensions in a given {\sc af}.
@article{arxiv.2011.01489,
title = {On Computing Stable Extensions of Abstract Argumentation Frameworks},
author = {Samer Nofal and Amani Abu Jabal and Abdullah Alfarrarjeh and Ismail Hababeh},
journal= {arXiv preprint arXiv:2011.01489},
year = {2021}
}