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Statements

Subject Item: n2:RIV%2F00216224%3A14210%2F14%3A00076349%21RIV15-MSM-14210___
rdf:type: skos:Concept n10:Vysledek
dcterms:description: All sorites paradoxes formulated up to present time are formulated in a discrete environment -- i.e., these paradoxes are based on either adding or removing small, yet discrete elements like grains, hairs or millimetres. Mark Colyvan and Zach Weber in their 2010 article ''A Topological Sorites'' propose a few versions of the sorites paradox which are formulated in a cohesive environment. They consider their version, so called topological sorites, to be the most general version of the sorites paradox. In my critical reaction to their paper I will defend two standpoints. First I will provide arguments in favour of a claim that the most general version of the sorites paradox cannot be the topological version, which is loosely based on a mathematical induction, but it is in fact the conditional version. Secondly I will show that while Colyvan and Weber tried to present new versions of the sorites paradox, paradoxes proposed by them cannot be counted as sorites paradoxes. All sorites paradoxes formulated up to present time are formulated in a discrete environment -- i.e., these paradoxes are based on either adding or removing small, yet discrete elements like grains, hairs or millimetres. Mark Colyvan and Zach Weber in their 2010 article ''A Topological Sorites'' propose a few versions of the sorites paradox which are formulated in a cohesive environment. They consider their version, so called topological sorites, to be the most general version of the sorites paradox. In my critical reaction to their paper I will defend two standpoints. First I will provide arguments in favour of a claim that the most general version of the sorites paradox cannot be the topological version, which is loosely based on a mathematical induction, but it is in fact the conditional version. Secondly I will show that while Colyvan and Weber tried to present new versions of the sorites paradox, paradoxes proposed by them cannot be counted as sorites paradoxes.
dcterms:title: Against Continuous and Topological Versions of Sorites Paradoxes (SOPhiA 2014, 4. 9. 2014, Salzburg) Against Continuous and Topological Versions of Sorites Paradoxes (SOPhiA 2014, 4. 9. 2014, Salzburg)
skos:prefLabel: Against Continuous and Topological Versions of Sorites Paradoxes (SOPhiA 2014, 4. 9. 2014, Salzburg) Against Continuous and Topological Versions of Sorites Paradoxes (SOPhiA 2014, 4. 9. 2014, Salzburg)
skos:notation: RIV/00216224:14210/14:00076349!RIV15-MSM-14210___
n3:aktivita: n4:S
n3:aktivity: S
n3:dodaniDat: n11:2015
n3:domaciTvurceVysledku: n6:3168069
n3:druhVysledku: n15:O
n3:duvernostUdaju: n14:S
n3:entitaPredkladatele: n13:predkladatel
n3:idSjednocenehoVysledku: 1817
n3:idVysledku: RIV/00216224:14210/14:00076349
n3:jazykVysledku: n12:eng
n3:klicovaSlova: sorites; vagueness; topological sorites; continuous sorites
n3:klicoveSlovo: n7:vagueness n7:continuous%20sorites n7:sorites n7:topological%20sorites
n3:kontrolniKodProRIV: [4EC1B80B7633]
n3:obor: n16:AA
n3:pocetDomacichTvurcuVysledku: 1
n3:pocetTvurcuVysledku: 1
n3:rokUplatneniVysledku: n11:2014
n3:tvurceVysledku: Štěpánek, Jan
n9:organizacniJednotka: 14210