We present here the two fields under consideration, discretized gauge theories and pairwise comparisons in approximate reasoning, in a way to highlight the correspondence.
Wajch, "Inconsistency indicator maps on groups for pairwise comparisons," International Journal of Approximate Reasoning, vol.
Eyupoglu, "
Approximate reasoning on a basis of Z-number valued If-Then rules," IEEE Transactions on Fuzzy Systems, vol.
Wang, "Topological structures of L-fuzzy rough sets and similarity sets of L-fuzzy relations," International Journal of
Approximate Reasoning, vol.
of
Approximate Reasoning, vol.6, no.2, pp267-292, Feb 1992.
Benferhat, "A belief revision framework for revising epistemic states with partial epistemic states," International Journal of
Approximate Reasoning, vol.
Shang, "On an optimization representation of decision-theoretic rough set model," International Journal of
Approximate Reasoning, vol.
In general, fuzzy systems are suitable for uncertain or
approximate reasoning, especially for the system with a mathematical model that is difficult to derive.
In a narrow sense, fuzzy logic is a logical system that aims at a formalization of
approximate reasoning. As such, it is rooted in multivalued logic, but its agenda is quite different from that of traditional multivalued logical systems, e.g., Lukasiewicz's logic.
International Journal of
Approximate Reasoning. Submit double-spaced paper on computational complexity of
approximate reasoning to Dr.