| Contents | p. VII |
| Preface | p. XI |
| Abstract logic in a lattice | |
| Introduction | p. 1 |
| Lattices, Boolean algebras, triangular norms | p. 1 |
| Closure operators and closure systems | p. 4 |
| A Galois connection between operators and classes | p. 6 |
| Abstract logic in a lattice | p. 8 |
| Continuity for abstract logics | p. 10 |
| Step-by-step deduction systems | p. 12 |
| Logical compactness | p. 13 |
| Product of two abstract deduction systems | p. 15 |
| Duality principle for ordered sets | p. 16 |
| Abstract fuzzy logic | |
| Fuzzy subsets for vagueness | p. 19 |
| Basic notions | p. 21 |
| Closed and open cuts | p. 24 |
| Fuzzy subsets and continuous chains | p. 26 |
| Abstract fuzzy logic | p. 28 |
| Compactness and continuity | p. 30 |
| Logical compactness | p. 32 |
| Ultraproduct of a family of fuzzy models | p. 33 |
| Fuzzy logic is not monotone | p. 36 |
| Abstract similarity logic | p. 37 |
| Any fuzzy logic is equivalent to a crisp logic | p. 39 |
| Extending an abstract crisp logic | |
| An extension principle for closure operators | p. 45 |
| An extension principle for closure systems | p. 48 |
| Canonical extensions and continuous deformations | p. 50 |
| Dualizing the extension principle | p. 52 |
| Extension of a compact closure operator | p. 53 |
| Extension of a crisp logic | p. 56 |
| Characterizations of the canonical extensions | p. 58 |
| Degree of inconsistency of a canonical extension | p. 61 |
| Canonical similarity logic | p. 64 |
| Fuzzy metalogic, facts and preferences | p. 66 |
| Approximate reasoning | |
| The heap paradox | p. 69 |
| Fuzzy inference rules | p. 71 |
| Fuzzy Hilbert logic and homomorphisms | p. 76 |
| Degree of consistency and non-monotonicity | p. 78 |
| Step-by-step deduction and continuity | p. 79 |
| Building up fuzzy Hilbert systems by inequalities | p. 81 |
| Any fuzzy Hilbert system is equivalent to a crisp system | p. 83 |
| Bald men, Lukasiewicz conjunction and induction principle | p. 86 |
| Logic as managment of constraints on the truth values | |
| Heap paradox by negative information | p. 89 |
| Constraints on the truth values | p. 91 |
| Examples: Zadeh logic, Boolean logic, Probability logic | p. 94 |
| Hilbert systems for constraints | p. 96 |
| Fuzzy logics with a negation | p. 97 |
| Refutation procedures | p. 100 |
| Equivalence to a crisp logic | p. 102 |
| Tableaux method | p. 104 |
| Canonical extension of a crisp Hilbert logic | |
| Extending a crisp deduction Hilbert system | p. 109 |
| Controlling the inconsistency | p. 111 |
| Necessity logic | p. 113 |
| A simple example of non-monotone fuzzy logic | p. 116 |
| Fuzzy filters and fuzzy subalgebras | p. 118 |
| Necessity measures as fuzzy theories | p. 119 |
| Fuzzy Hilbert systems and fuzzy subalgebras | p. 121 |
| Extensions by continuous triangular norms | p. 124 |
| Graded consequence relations | |
| Graded information with graded deductive tools | p. 129 |
| Stratified fuzzy closure operators | p. 129 |
| Stratified fuzzy closure systems | p. 132 |
| A characterization of stratified closure systems | p. 135 |
| A characterization of stratified operators | p. 138 |
| Stratified deduction systems | p. 140 |
| Sequents and consequence relations | p. 142 |
| Graded consequences and sequent calculus | p. 144 |
| Finite sequent calculus and compact graded consequences | p. 146 |
| Graded consequences and stratified operators | p. 148 |
| Truth-functional logic and fuzzy logic | |
| Truth-functional fuzzy semantics | p. 151 |
| The main properties | p. 152 |
| Two discontinuous truth-functional semantics | p. 156 |
| Any continuous truth-functional semantics is axiomatizable | p. 158 |
| Any axiomatizable truth-functional semantics is continuous | p. 160 |
| Zadeh (continuous) logic | p. 163 |
| Lukasiewicz (continuous) logic | p. 165 |
| Comparing truth-functional logic with fuzzy logic | p. 168 |
| Probabilistic fuzzy logics | |
| Vagueness and uncertainty | p. 171 |
| Logic of super-additive measures | p. 172 |
| Completeness theorem | p. 176 |
| Logic of upper-lower probabilities | p. 177 |
| Probability logic: semantics | p. 180 |
| Probability logic: Hilbert system | p. 184 |
| Completeness theorem | p. 187 |
| Refutations in probability logic | p. 189 |
| Two remarks: probability of formulas, subjective probability | p. 191 |
| Belief logic and Boolean logic | p. 194 |
| Qualitative probability logics | p. 196 |
| Fuzzy control and approximate reasoning | |
| Information by words versus information by numbers | p. 199 |
| Control by triangular norms | p. 200 |
| Programs and Herbrand models | p. 204 |
| Fuzzy programs and fuzzy Herbrand models | p. 205 |
| Logic approach to fuzzy control | p. 206 |
| The logical interpretation suggests new tools | p. 208 |
| Control by implication and negative information | p. 210 |
| Control by similarity and prototypes | p. 214 |
| Logic interpretation of defuzzification: an open question | p. 216 |
| The predicate MAMD and some observations | p. 219 |
| Effectiveness in fuzzy logic | |
| Introduction | p. 221 |
| Recursively enumerable fuzzy sets | p. 221 |
| Decidability and fuzy computability | p. 225 |
| Enumerability by discrete topology | p. 228 |
| Kleene hierarchy | p. 231 |
| Godel numbering and Church Thesis | p. 234 |
| Reducibility and Universal Machines | p. 236 |
| Effective abstract fuzzy logic | p. 238 |
| Fuzzy logic = enumeration fuzzy closure operator | p. 240 |
| Creative fuzzy sets and Godel theorems | p. 246 |
| Sharpened and shaded versions: limitative theorems | p. 248 |
| References | p. 251 |
| Index | p. 261 |
| List of Symbols | p. 267 |
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