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Sorites Paradox and the Need for Many-Valued Logics

ŠTĚPÁNEK, Jan

Basic information

Original name

Sorites Paradox and the Need for Many-Valued Logics

Authors

ŠTĚPÁNEK, Jan (203 Czech Republic, guarantor, belonging to the institution)

Edition

5th World Congress and School on Universal Logic, 25.-30. 6. 2015, Istanbul, 2015

Other information

Language

English

Type of outcome

Prezentace na konferencích

Field of Study

60300 6.3 Philosophy, Ethics and Religion

Country of publisher

Turkey

Confidentiality degree

není předmětem státního či obchodního tajemství

References:

RIV identification code

RIV/00216224:14210/15:00083537

Organization unit

Faculty of Arts

Keywords (in Czech)

sorites paradox; vágnost; logika; vícehodnotové logiky

Keywords in English

sorites paradox; vagueness; logic; many-valued logic

Tags

Tags

International impact
Změněno: 23/2/2016 14:39, Mgr. Marie Skřivanová

Abstract

V originále

Sorites paradoxes are a class of paradoxical arguments which arise as a result of using vague terms such as "heap" or "bald". While precise terms have sharp boundaries of application, vague terms lack such precise boundaries. With vague terms there are objects to which: a) the vague term applies, b) the vague term doesn’t apply, and c) it is uncertain whether vague term applies or not (so called borderline cases). In borderline cases it is uncertain whether the vague term in question applies to them or not. Moreover, this uncertainty cannot be resolved by any enquiry. Since there are three aforementioned classes into which we can divide objects in a range of significance of any vague term, it might be tempting to use three-valued logic to deal with sorites paradoxes. This way we can ascribe exactly one truth value to all sentences of sorites paradox and we needn't resort to either supervaluationism or subvaluationism. Another approach to solving sorites paradoxes is based on an intuition that vagueness is a matter of degree and logic of vagueness should reflect that with different degrees of truth. If A measures 190 cm and B 195 cm then sentence "B is tall" seems to be truer than "A is tall". Fuzzy logic therefore takes advantage of its infinitely many truth values. In my talk I will critically assess many-valued logics and fuzzy logic. My goal is to show that these approaches to sorites paradoxes either have presuppositions that their proponents wouldn’t assent to or that they generate more problems than they claim to resolve.

Links

MUNI/A/1153/2014, interní kód MU
Name: Soudobé problémy a minulé podoby filozofické diskuse
Investor: Masaryk University, Category A