. "43" . "70312" . . "0323-2220" . "23330" . . "Studia comeniana et historica" . . . . "15"^^ . . "Perfect language in Baroque Scholasticism: Poinsot's concept of logical analysis"@en . "P(EE2.3.20.0138)" . . "Dokonal\u00FD jazyk v barokn\u00ED scholastice: Poinsot\u016Fv pojem logick\u00E9 anal\u00FDzy" . . "1"^^ . . . "Dokonal\u00FD jazyk v barokn\u00ED scholastice: Poinsot\u016Fv pojem logick\u00E9 anal\u00FDzy"@cs . "Perfect language in Baroque Scholasticism: Poinsot's concept of logical analysis"@en . . "Dokonal\u00FD jazyk v barokn\u00ED scholastice: Poinsot\u016Fv pojem logick\u00E9 anal\u00FDzy"@cs . . "1"^^ . "RIV/49777513:23330/13:43919813!RIV14-MSM-23330___" . "V tomto \u010Dl\u00E1nku je prov\u00E1d\u011Bna rekonstrukce pojet\u00ED logiky Jana Poinsota obsa\u017Een\u00E9 v jeho kompendiu Cursus philosophicus thomisticus z hlediska jeho pojmu logick\u00E9 anal\u00FDzy (resolutio). V\u00FDchoz\u00EDm p\u0159edpokladem v\u00FDzkumu je, \u017Ee logick\u00E1 anal\u00FDza je \u00FAst\u0159edn\u00EDm \u00FAkolem Poinsotovy logiky, kter\u00E1 d\u00EDky tomu poskytuje technick\u00E9 prost\u0159edky k vytvo\u0159en\u00ED dokonale transparentn\u00EDho jazyka. V Cursus philosophicus jsou pou\u017Eity t\u0159i z\u00E1kladn\u00ED pojmy logick\u00E9 anal\u00FDzy: 1. syntaktick\u00FD pojem anal\u00FDzy: resolutio jako\u017Eto explikace slo\u017Een\u00FDch v\u00FDraz\u016F; 2. s\u00E9mantick\u00FD pojem anal\u00FDzy: resolutio jako\u017Eto redukce obecn\u00FDch tvrzen\u00ED na tvrzen\u00ED singul\u00E1rn\u00ED, resp. jako explikace podm\u00EDnek pravdivosti a tvrditelnosti; 3. epistemologick\u00FD pojem anal\u00FDzy: resolutio jako axiomatizace na z\u00E1klad\u011B dedukce v\u0161ech dokazateln\u00FDch v\u011Bt ze z\u00E1kladn\u00EDch princip\u016F dan\u00E9 logick\u00E9 teorie. Teorie definice, %22exponibili\u00ED%22, %22supozie%22, deduktivn\u00ED platnosti a pozn\u00E1n\u00ED na z\u00E1klad\u011B d\u016Fkazu budou interpretov\u00E1ny jako techniky logick\u00E9 anal\u00FDzy, kter\u00E9 p\u0159isp\u00EDvaj\u00ED k syntaktick\u00E9, s\u00E9mantick\u00E9, logick\u00E9 a a epistemick\u00E9 transparenci dokonal\u00E9ho jazyka." . . "RIV/49777513:23330/13:43919813" . "CZ - \u010Cesk\u00E1 republika" . . . . "Dokonal\u00FD jazyk v barokn\u00ED scholastice: Poinsot\u016Fv pojem logick\u00E9 anal\u00FDzy" . "Hanke, Miroslav" . "89-90" . "V tomto \u010Dl\u00E1nku je prov\u00E1d\u011Bna rekonstrukce pojet\u00ED logiky Jana Poinsota obsa\u017Een\u00E9 v jeho kompendiu Cursus philosophicus thomisticus z hlediska jeho pojmu logick\u00E9 anal\u00FDzy (resolutio). V\u00FDchoz\u00EDm p\u0159edpokladem v\u00FDzkumu je, \u017Ee logick\u00E1 anal\u00FDza je \u00FAst\u0159edn\u00EDm \u00FAkolem Poinsotovy logiky, kter\u00E1 d\u00EDky tomu poskytuje technick\u00E9 prost\u0159edky k vytvo\u0159en\u00ED dokonale transparentn\u00EDho jazyka. V Cursus philosophicus jsou pou\u017Eity t\u0159i z\u00E1kladn\u00ED pojmy logick\u00E9 anal\u00FDzy: 1. syntaktick\u00FD pojem anal\u00FDzy: resolutio jako\u017Eto explikace slo\u017Een\u00FDch v\u00FDraz\u016F; 2. s\u00E9mantick\u00FD pojem anal\u00FDzy: resolutio jako\u017Eto redukce obecn\u00FDch tvrzen\u00ED na tvrzen\u00ED singul\u00E1rn\u00ED, resp. jako explikace podm\u00EDnek pravdivosti a tvrditelnosti; 3. epistemologick\u00FD pojem anal\u00FDzy: resolutio jako axiomatizace na z\u00E1klad\u011B dedukce v\u0161ech dokazateln\u00FDch v\u011Bt ze z\u00E1kladn\u00EDch princip\u016F dan\u00E9 logick\u00E9 teorie. Teorie definice, %22exponibili\u00ED%22, %22supozie%22, deduktivn\u00ED platnosti a pozn\u00E1n\u00ED na z\u00E1klad\u011B d\u016Fkazu budou interpretov\u00E1ny jako techniky logick\u00E9 anal\u00FDzy, kter\u00E9 p\u0159isp\u00EDvaj\u00ED k syntaktick\u00E9, s\u00E9mantick\u00E9, logick\u00E9 a a epistemick\u00E9 transparenci dokonal\u00E9ho jazyka."@cs . . "[32F876C4255A]" . "John Poinsot; scholastic logic; logical analysis; perfect language; Baroque scholasticism"@en . "John Poinsot's concept of logic from his compendium Cursus philosophicus thomisticus will be reconstructed in terms of his concept of logical analysis (resolutio) in the present paper. The fundamental perspective of the research will assume that logical analysis is the central issue of Poinsot's logic which thereby offers a technique of contriving a perfectly transparent language. Three basic concepts of logical analysis are endorsed in Cursus philosophicus: 1. the syntactic concept of analysis: resolutio as explication of compound expressions; 2. the semantic concept of analysis: resolutio as reduction of general statements to singular statements or as making their truth and assertability conditions explicit; 3. the epistemological concept of analysis: resolutio as axiomatisation through deducing all provable sentences from fundamental principles of the respective scientific theory. The theories of definition, exponibilia, suppositio, deductive validity, and demonstrative knowledge will be construed as techniques of logical analysis, contributing to syntactic, semantic, logical, and epistemic transparency of perfect languages."@en .