Varieties of Formal Languages

Relations.- 1. Semigroups, languages and automata.- 1. Semigroups..- 1.1. Semigroups, monoids, morphisms.- 1.2. Idempotents, zero, ideal.- 1.3. Congruences.- 1.4. Semigroups of transformations.- 1.5. Free semigroups.- 2. Languages.- 2.1. Words.- 2.2. Automata.- 2.3. Rational and recognizable languages.- 2.4. Syntactic monoids.- 2.5. Codes.- 2.6. The case of free semigroups.- 3. Explicit calculations.- 3.1. Syntactic semigroup of L = A*abaA* over the alphabet A = {a,b}.- 3.2. The syntactic monoid of L = {a2,aba,ba}* over the alphabet A = {a,b}.- Problems.- 2. Varieties.- 1. Varieties of semigroups and monoids.- 1.1. Definitions and examples.- 1.2. Equations of a variety.- 2. The variety theorem.- 3. Examples of varieties.- Problems.- Chapters 3. Structure of finite semigroups.- 1. Green’s relations.- 2. Practical calculation.- 3. The Rees semigroup and the structure of regular D-classes.- 4. Varieties defined by Green’s relations.- 5. Relational morphisms and V-morphisms.- Problems.- 4. Piecewise-testable languages and star-free Languages.- 1. Piecewise-testable languages; Simon’s theorem.- 2. Star-free languages; Schützenberger’s theorem.- 3. ?-trivial and ?-trivial languages.- Problems.- 5. Complementary results.- 1. Operations.- 1.1. Operations on languages.- 1.2. Operations on monoids.- 1.3. Operations on varieties.- 2. Concatenation hierarchies.- 2.1. Locally testable languages.- 2.2. General results on concatenation hierarchies.- 2.3. Straubing’s hierarchy.- 2.4. Brzozowski’s hierarchy.- 2.5. Connection between the hierarchies of Straubing and Brzozowski.- 2.6. The group-languages hierarchy.- 2.7. Hierarchies and symbolic logic.- 3. Relations with the theory of codes.- 3.1. Restriction of the operations star and plus.- 3.2. Varieties described by codes.- 3.3. Return to the operation V*W.- 4. Other results and problems.- 4.1. Congruences.- 4.2. The lattice of varieties.- Bibliographic notes.