. . "The Impact of Using Multi-Dimensional and Combinatory Vague Terms on the Possibility of Formulating Sorites Paradoxes"@en . "1"^^ . "14210" . . . "1"^^ . . "combinatory vagueness; linear vagueness; multi-dimensional vagueness; paradox; Paradox of the Heap; sorites; vagueness"@en . . . "20763" . "RIV/00216224:14210/14:00076453!RIV15-MSM-14210___" . "We cannot definitely determine precise boundaries of application of vague terms like %22tall%22. Since it is only a height of a person that determines whether that person is tall or not, we can count %22tall%22 as an example of a linear vague term. That means that all objects in a range of significance of %22tall%22 can be linearly ordered. Linear vague terms can be used to formulate three basic versions of the sorites paradox \u2013 the conditional sorites, the mathematical induction sorites, and the line-drawing sorites. In this paper I would like to explore a possibility of formulating sorites paradoxes with so called multi-dimensional and combinatory vague terms \u2013 terms for which it is impossible to create a linear ordering of all objects in their range of significance. Therefore, I will show which adjustments must be made and which simplifications we must accede to in order to formulate any version of the sorites paradox with multi-dimensional or combinatory vague terms." . "S" . "The Impact of Using Multi-Dimensional and Combinatory Vague Terms on the Possibility of Formulating Sorites Paradoxes" . . "The Impact of Using Multi-Dimensional and Combinatory Vague Terms on the Possibility of Formulating Sorites Paradoxes" . . . . "SK - Slovensk\u00E1 republika" . "Organon F : international journal of analytic philosophy" . "000344579400013" . "The Impact of Using Multi-Dimensional and Combinatory Vague Terms on the Possibility of Formulating Sorites Paradoxes"@en . . "Supplementary Issue 1" . "14"^^ . . "We cannot definitely determine precise boundaries of application of vague terms like %22tall%22. Since it is only a height of a person that determines whether that person is tall or not, we can count %22tall%22 as an example of a linear vague term. That means that all objects in a range of significance of %22tall%22 can be linearly ordered. Linear vague terms can be used to formulate three basic versions of the sorites paradox \u2013 the conditional sorites, the mathematical induction sorites, and the line-drawing sorites. In this paper I would like to explore a possibility of formulating sorites paradoxes with so called multi-dimensional and combinatory vague terms \u2013 terms for which it is impossible to create a linear ordering of all objects in their range of significance. Therefore, I will show which adjustments must be made and which simplifications we must accede to in order to formulate any version of the sorites paradox with multi-dimensional or combinatory vague terms."@en . . . "1335-0668" . "\u0160t\u011Bp\u00E1nek, Jan" . . "RIV/00216224:14210/14:00076453" . . . "[C341193792BF]" . "21" .