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oapen-20.500.12657-576902022-08-02T03:00:03Z The Material Theory of Induction Norton, John D. inductive inference inductive support deductive inference theory of induction material theory of induction new theory of induction history of science philosophy of science probability chance study of chance study of probability inductive logic deductive logic books about philosophy of science books about science study of science books for scientists bic Book Industry Communication::P Mathematics & science::PD Science: general issues::PDA Philosophy of science bic Book Industry Communication::P Mathematics & science::PD Science: general issues::PDX History of science bic Book Industry Communication::H Humanities::HP Philosophy::HPL Philosophy: logic The fundamental burden of a theory of inductive inference is to determine which are the good inductive inferences or relations of inductive support and why it is that they are so. The traditional approach is modeled on that taken in accounts of deductive inference. It seeks universally applicable schemas or rules or a single formal device, such as the probability calculus. After millennia of halting efforts, none of these approaches has been unequivocally successful and debates between approaches persist. The Material Theory of Induction identifies the source of these enduring problems in the assumption taken at the outset: that inductive inference can be accommodated by a single formal account with universal applicability. Instead, it argues that that there is no single, universally applicable formal account. Rather, each domain has an inductive logic native to it.The content of that logic and where it can be applied are determined by the facts prevailing in that domain. Paying close attention to how inductive inference is conducted in science and copiously illustrated with real-world examples, The Material Theory of Induction will initiate a new tradition in the analysis of inductive inference. 2022-08-01T12:37:12Z 2022-08-01T12:37:12Z 2021 book ONIX_20220801_9781773852546_9 9781773852546 9781773852539 https://library.oapen.org/handle/20.500.12657/57690 eng BSPS Open application/pdf n/a 9781773852546.pdf University of Calgary Press University of Calgary Press 5c7afbd8-3329-4175-a51e-9949eb959527 9781773852546 9781773852539 University of Calgary Press 1 680 Calgary open access
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OAPEN
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DSpace
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English
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The fundamental burden of a theory of inductive inference is to determine which are the good inductive inferences or relations of inductive support and why it is that they are so. The traditional approach is modeled on that taken in accounts of deductive inference. It seeks universally applicable schemas or rules or a single formal device, such as the probability calculus. After millennia of halting efforts, none of these approaches has been unequivocally successful and debates between approaches persist. The Material Theory of Induction identifies the source of these enduring problems in the assumption taken at the outset: that inductive inference can be accommodated by a single formal account with universal applicability. Instead, it argues that that there is no single, universally applicable formal account. Rather, each domain has an inductive logic native to it.The content of that logic and where it can be applied are determined by the facts prevailing in that domain. Paying close attention to how inductive inference is conducted in science and copiously illustrated with real-world examples, The Material Theory of Induction will initiate a new tradition in the analysis of inductive inference.
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9781773852546.pdf
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9781773852546.pdf
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| title_short |
9781773852546.pdf
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9781773852546.pdf
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9781773852546.pdf
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9781773852546.pdf
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9781773852546.pdf
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University of Calgary Press
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2022
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1771297484412289024
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