Table of Contents


I. Fundamentals

  1. Propositions and sentences—the basic units of logic and language
  2. Truth and (declarative) sentences
  3. Consistency and sets of sentences
  4. Validity and arguments

II. Stories and Situations

  1. Reference and truth
  2. Meaning and truth
  3. Might have beens
  4. Truth with respect to a situation

III. Establishing Inconsistency with Tableaux

  1. Obvious inconsistency
  2. Semantic tableaux: dividing and conquering
  3. Efficiencies in tableaux
  4. A tableau that closes

IV. Extending the Tableau Technique

  1. Counter sets and validity
  2. Resolving reference
  3. Additional constructions
  4. When can a sentence be checked?

V. Generative Grammar

  1. What we mean by a grammar
  2. Phrase-structure grammars; Phrase-markers
  3. Transformations
  4. Syntactic ambiguity

VI. Logical Analysis of Complex Sentences

  1. “If s,” “And’s,” or “But’s”: Conjunctions and sentence connectives
  2. Rule-governed sentence connectives in tableaux
  3. Transformations in logical analysis; Grouping
  4. The reach of rules; Negated conditionals
  5. Tableaux constructed by rules

VII. Logical Analysis of Simple Sentences: Identity and Other Relations

  1. Designators and predicates
  2. Properties and relations; Types of relations
  3. The peculiar relation of identity
  4. Tableau rules for identity

VIII. Logical Analysis of Simple Sentences: One-Word Quantifiers

  1. Quantifiers in general
  2. The simplest quantifiers: “everyone,” “someone,” and “no one”
  3. Tableau rules for the simplest quantifiers
  4. The simplest quantifiers in tableaux
  5. “Anyone,” quantifier scope, and anaphoric pronouns

IX. Quantifier Expressions and Syllogisms

  1. The universal quantifier
  2. Relative pronouns, and the existential and nihilistic quantifiers
  3. Tableaux for syllogisms and other arguments
  4. “Anyone” and logical equivalence
  5. Things, times, and places

Appendix: Truth-Functional Logic

  1. Review: Tableau rules for sentence connectives
  2. Three levels of symbolization
  3. Symbolic languages for algebra
  4. Truth-functions and their computational tables
  5. Truth tables and calculating truth-values
  6. Constructing an arbitrary function; Normal form

For Reading and Reference


Posted on November 2, 2015