Formalizing Kant's rules: a logic of conditional imperatives and permissives
Formalizing Kant's rules: a logic of conditional imperatives and permissives
This paper formalizes part of the cognitive architecture that Kant develops in the Critique of Pure Reason. The central Kantian notion that we formalize is the rule. As we interpret Kant, a rule is not a declarative conditional stating what would be true if such and such conditions hold. Rather, a Kantian rule is a general procedure, represented by a conditional imperative or permissive, indicating which acts must or may be performed, given certain acts that are already being performed. These acts are not propositions; they do not have truth-values. Our formalization is related to the input/output logics, a family of logics designed to capture relations between elements that need not have truth-values. In this paper, we introduce KL3 as a formalization of Kant’s conception of rules as conditional imperatives and permissives. We explain how it differs from standard input/output logics, geometric logic, and first-order logic, as well as how it translates natural language sentences not well captured by first-order logic. Finally, we show how the various distinctions in Kant’s much-maligned Table of Judgements emerge as the most natural way of dividing up the various types and sub-types of rule in KL3. Our analysis sheds new light on the way in which normative notions play a fundamental role in the conception of logic at the heart of Kant’s theoretical philosophy.
Kant, Logic, normativity, modality, Philosophy of Mind
Stephenson, Andrew
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Sergot, Marek
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Evans, Richard
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Stephenson, Andrew
b8c80516-d835-4479-bee0-869d771af0cf
Sergot, Marek
ff3c83ad-a553-4f1e-b252-98ebb9c1033e
Evans, Richard
ed320594-cde3-48ef-b222-b98d3dd83719
Stephenson, Andrew, Sergot, Marek and Evans, Richard
(2019)
Formalizing Kant's rules: a logic of conditional imperatives and permissives.
Journal of Philosophical Logic, 49.
(doi:10.1007/s10992-019-09531-x).
Abstract
This paper formalizes part of the cognitive architecture that Kant develops in the Critique of Pure Reason. The central Kantian notion that we formalize is the rule. As we interpret Kant, a rule is not a declarative conditional stating what would be true if such and such conditions hold. Rather, a Kantian rule is a general procedure, represented by a conditional imperative or permissive, indicating which acts must or may be performed, given certain acts that are already being performed. These acts are not propositions; they do not have truth-values. Our formalization is related to the input/output logics, a family of logics designed to capture relations between elements that need not have truth-values. In this paper, we introduce KL3 as a formalization of Kant’s conception of rules as conditional imperatives and permissives. We explain how it differs from standard input/output logics, geometric logic, and first-order logic, as well as how it translates natural language sentences not well captured by first-order logic. Finally, we show how the various distinctions in Kant’s much-maligned Table of Judgements emerge as the most natural way of dividing up the various types and sub-types of rule in KL3. Our analysis sheds new light on the way in which normative notions play a fundamental role in the conception of logic at the heart of Kant’s theoretical philosophy.
Text
Evans_Sergot_Stephenson_JPL_Kant_Rulez
- Accepted Manuscript
More information
Accepted/In Press date: 10 July 2019
e-pub ahead of print date: 25 November 2019
Keywords:
Kant, Logic, normativity, modality, Philosophy of Mind
Identifiers
Local EPrints ID: 432344
URI: http://eprints.soton.ac.uk/id/eprint/432344
ISSN: 0022-3611
PURE UUID: 6485111b-bc80-4d5e-8f06-e343910f6ea7
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Date deposited: 11 Jul 2019 16:30
Last modified: 16 Mar 2024 08:01
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Author:
Marek Sergot
Author:
Richard Evans
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