Laws of Nature and Tooley's Cases / As leis da natureza e os casos de Tooley

Manuscrito 36 (1):67-101 (2013)
  Copy   BIBTEX

Abstract

The purposes of this paper are: (1) to present four theories of the nature of natural laws, (2) to show that only one of them is capable of adequately answering to Tooley's Cases, and (3) indicate why these cases are relevant for our ontology. These purposes are important since the concept of "natural law" is used in many (if not all) realms of natural science and in many branches of philosophy; if Tooley's cases are possible, they represent situations that must be adequately described. If there is only one theory that can adequately describe such cases, there are strong reasons to prefer this theory over the other ones.

Other Versions

reprint Cid, Rodrigo (2013) "The laws of nature and Tooley's cases / As leis da natureza e os casos de Tooley". Manuscrito: Revista Internacional de Filosofía 36():67-101

Similar books and articles

Tooley's Theory of Laws of Nature.Stephen C. Hetherington - 1983 - Canadian Journal of Philosophy 13 (1):101 - 106.
The Modal Status of Natural Laws.Erik Andrew Anderson - 1997 - Dissertation, University of Colorado at Boulder
Causation: A Realist Approach. [REVIEW]John Bishop - 1991 - Review of Metaphysics 45 (2):431-432.
Can Primitive Laws Explain?Tyler Hildebrand - 2013 - Philosophers' Imprint 13:1-15.
Tooley's solution to the inference problem.Theodore R. Sider - 1992 - Philosophical Studies 67 (3):261 - 275.

Analytics

Added to PP
2013-12-01

Downloads
315 (#75,511)

6 months
81 (#84,103)

Historical graph of downloads
How can I increase my downloads?

Author's Profile

Rodrigo Cid
Universidade Federal Do Amapá

Citations of this work

Uma visão de mundo filosófica.Rodrigo Reis Lastra Cid - 2023 - Trans/Form/Ação 46 (spe1):571-596.

Add more citations

References found in this work

The nature of laws.Michael Tooley - 1977 - Canadian Journal of Philosophy 7 (4):667-98.
Necessarily, salt dissolves in water.Alexander Bird - 2001 - Analysis 61 (4):267-274.
The regularity theory.Bernard Berofsky - 1968 - Noûs 2 (4):315-340.

View all 6 references / Add more references