@book {5494,
title = {Fuzzy Description Logics from a Mathematical Fuzzy Logic point of view},
series = {Monografies de l{\textquoteright}Institut d{\textquoteright}Investigaci{\'o} en Intel{\textperiodcentered}lig{\`e}ncia Artificial},
year = {Enviado},
pages = {220},
publisher = {IIIA - CSIC},
organization = {IIIA - CSIC},
address = {Bellaterra},
abstract = {Description Logic is a formalism that is widely used in the framework of Knowledge Representation and Reasoning in Artificial Intelligence. It is based on Classical Logic in order to guarantee the correctness of the inferences on the required reasoning tasks. It is indeed a fragment of First Order Predicate Logic whose language is strictly related to the one of Modal Logic. Fuzzy Description Logic is the generalization of the classical Description Logic framework thought for reasoning with vague concepts that often arise in practical applications. Fuzzy Description Logic has been investigated since the last decade of the 20th century. During the first fifteen years of investigation its semantics has been based on Fuzzy Set Theory. A semantics based on Fuzzy Set Theory, however, has been shown to have some counter-intuitive behavior, due to the fact that the truth function for the implication used is not the residuum of the truth function for the conjunction. In the meanwhile, Fuzzy Logic has been given a formal framework based on Many-valued Logic. This framework, called Mathematical Fuzzy Logic, has been proposed has the kernel of a mathematically well founded Fuzzy Logic. In this monography we propose a Fuzzy Description Logic whose semantics is based on Mathematical Fuzzy Logic as its mathematically well settled kernel. To this end we provide a novel notation that is strictly related to the notation that is used in Mathematical Fuzzy Logic. After having settled the notation, we investigate the hierarchies of description languages over different t-norm based semantics and the reductions that can be performed between reasoning tasks. The new framework that we establish gives us the possibility to systematically investigate the relation of Fuzzy Description Logic to Fuzzy First Order Logic and Fuzzy Modal Logic. Next we provide some (un)decidability results for the case of infinite t-norm based semantics with or without knowledge bases. Finally we investigate the complexity bounds of reasoning tasks without knowledge bases for basic Fuzzy Description Logics over finite t-norms.},
keywords = {Description Logics, Many-valued Modal Logic, mathematical fuzzy logic},
author = {Marco Cerami}
}
@book {5528,
title = {Fuzzy Description Logics},
series = {Studies in Logic},
year = {2015},
publisher = {Springer},
organization = {Springer},
keywords = {fuzzy description logics, fuzzy predicate logics, mathematical fuzzy logic},
isbn = {ISBN: 978-1-84890-054-7},
author = {F. Bobillo and M. Cerami and Francesc Esteva and Angel Garc{\'\i}a-Cerda{\~n}a and R.Pe{\~n}aloza and U.Straccia},
editor = {P.Cintula, C.Ferm{\"u}ler and C. Noguera}
}
@article {5067,
title = {Applications of ultraproducts: from compactness to fuzzy elementary classes},
journal = {Logic Journal of the IGPL},
volume = {22},
year = {2014},
chapter = {166},
keywords = {mathematical fuzzy logic, model theory, Ultraproducts},
author = {Pilar Dellunde}
}
@conference {5251,
title = {Axiomatising a fuzzy modal logic over the standard product algebra},
booktitle = {Logic, Algebra and Truth Degrees 2014 (LATD 2014)},
year = {2014},
month = {16/07/2014},
pages = {275-279},
edition = {M. Baaz, A. Ciabattoni, S. Hetzl},
address = {Vienna, Austria},
keywords = {Many-valued Modal Logic, mathematical fuzzy logic, modal logic, product logic},
url = {http://www.logic.at/latd2014/abstract_booklet_final.pdf},
author = {Amanda Vidal and Francesc Esteva and Llu{\'\i}s Godo}
}