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pt. I, The Basics. - chap. 1, Introduction to pure inductive logic. - chap. 2, Context. - chap. 3, Probability functions. - chap. 4, Conditional probability. - chap. 5, The Dutch book argument. - chap. 6, Some basic principles. - chap. 7, Specifying probability functions. - pt. II, Unary Inductive Logic. - chap. 8, Introduction to unary pure inductive logic. - chap. 9, de Finetti's representation theorem. - chap. 10, Regularity and universal certainty. - chap. 11, Relevance. - chap. 12, Asymptotic conditional probabilities. - 13, The conditionalization theorem. - chap. 14, Atom exchangeability. - chap. 15, Reichenbach’s Axiom. - chap. 16, Carnap's continuum of inductive methods. - chap. 17, Irrelevance. - chap. 18, Another continuum of inductive methods. - chap. 19, The NP-continuum. - chap. 20, The weak irrelevance principle. - chap. 21, Equalities and inequalities. - chap. 22, Principles of analogy. - chap. 23, Unary symmetry. - pt. III, Polyadic Inductive Logic. - 24, Introduction to polyadic pure inductive logic. - 25, Polyadic constant exchangeability. - 26, Polyadic regularity. - chap. 27, Spectrum exchangeability. - chap. 28, Conformity. - chap. 29, The probability functions $u^p,L$. - chap. 30, The homogeneous/heterogeneous divide. - chap. 31, Representation theorems for Sx. - chap. 32, Language invariance with Sx. - chap. 33, Sx without language invariance. - chap. 34, A general representation theorem for Sx. - chap. 35, The Carnap-Stegmuller principle. - chap. 36, Instantial relevance and Sx. - 37, Equality. - chap. 38, The polyadic Johnson's sufficientness postulate. - 39, Polyadic symmetry. - chap. 40, Nathanial's invariance principle, NIP. - 41, NIP and atom exchangeability. - chap. 42, The functions $u_E^p,L$. - chap. 43, The state of play. - Bibliography. - Index. - Glossary,Glossary.
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