00762nam0 2200253 450 00000680720060324120113.088-14-10524-320060324d2003----km-y0itay50------baitaITy-------001yy<<I >>procedimenti speciali in materia penalescritti di Michele Bonetti ... [et al.]a cura di Mario Pisani2. ed.MilanoGiuffrè2003XVI, 718 p.24 cm345.450720Pisani,MarioBonetti,MicheleITUNIPARTHENOPE20060324RICAUNIMARC000006807S-002636842NAVA3PROCEDIMENTI speciali in materia penale625120UNIPARTHENOPE02480nam 2200553 a 450 991046133660332120200520144314.01-283-23388-697866132338821-61146-011-5(CKB)2670000000113054(EBL)753243(OCoLC)747410598(SSID)ssj0000538667(PQKBManifestationID)12181312(PQKBTitleCode)TC0000538667(PQKBWorkID)10560323(PQKB)10761860(MiAaPQ)EBC753243(Au-PeEL)EBL753243(CaPaEBR)ebr10493735(CaONFJC)MIL323388(EXLCZ)99267000000011305420100708d2011 uy 0engur|n|---|||||txtccrLogic with a probability semantics[electronic resource] including solutions to some philosophical problems /Theodore HailperinBethlehem [Pa.] Lehigh University Pressc20111 online resource (124 p.)Description based upon print version of record.1-61146-010-7 Includes bibliographical references and index.Chapter 3. Probability Semantics for ON Logic3.1 Probability functions on ON languages; 3.2 Main Theorem of ON probability logic; 3.3 Borel's denumerable probability; 3.4 Infinite ""events"" and probability functions; 3.5 Kolmogorov probability spaces; 3.6 Logical consequence in probability logic; 3.7 Borel's denumerable probability defended; Chapter 4. Conditional-Probability and Quantifiers; 4.1 Conditional-probability in quantifier logic; 4.2 The paradox of confirmation; Bibliography; IndexThe book extends the development of probability logic_a logic using probability, not verity (true, false) as the basic semantic notion. The basic connectives 'not,' 'and,' and 'or' are described in depth to include quantified formulas. Also discussed is the notion of the suppositional, and resolution of the paradox of confirmation.ProbabilitiesPhilosophyElectronic books.ProbabilitiesPhilosophy.519.2Hailperin Theodore58967MiAaPQMiAaPQMiAaPQBOOK9910461336603321Logic with a probability semantics1983224UNINA