Justifying the norms of inductive inference
Bayesian inference is limited in scope because it cannot be applied in idealized contexts where none of the hypotheses under consideration is true and because it is committed to always using the likelihood as a measure of evidential favouring, even when that is inappropriate. The purpose of this art...
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sg-ntu-dr.10356-1599932022-07-07T05:15:32Z Justifying the norms of inductive inference Vassend, Olav B. School of Humanities Humanities::Philosophy Inductive Inference Bayesian Bayesian inference is limited in scope because it cannot be applied in idealized contexts where none of the hypotheses under consideration is true and because it is committed to always using the likelihood as a measure of evidential favouring, even when that is inappropriate. The purpose of this article is to study inductive inference in a very general setting where finding the truth is not necessarily the goal and where the measure of evidential favouring is not necessarily the likelihood. I use an accuracy argument to argue for probabilism and I develop a new kind of argument to argue for two general updating rules, both of which are reasonable in different contexts. One of the updating rules has standard Bayesian updating, Bissiri et al.’s ([2016]) general Bayesian updating, Douven’s ([2016]) IBE-based updating, and my (Vassend ([forthcoming]) quasi-Bayesian updating as special cases. The other updating rule is novel. 2022-07-07T05:15:32Z 2022-07-07T05:15:32Z 2022 Journal Article Vassend, O. B. (2022). Justifying the norms of inductive inference. The British Journal for the Philosophy of Science, 73(1), 135-160. https://dx.doi.org/10.1093/bjps/axz041 0007-0882 https://hdl.handle.net/10356/159993 10.1093/bjps/axz041 2-s2.0-85128391334 1 73 135 160 en The British Journal for the Philosophy of Science © 2022 The Authors. All rights reserved. |
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Humanities::Philosophy Inductive Inference Bayesian |
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Humanities::Philosophy Inductive Inference Bayesian Vassend, Olav B. Justifying the norms of inductive inference |
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Bayesian inference is limited in scope because it cannot be applied in idealized contexts where none of the hypotheses under consideration is true and because it is committed to always using the likelihood as a measure of evidential favouring, even when that is inappropriate. The purpose of this article is to study inductive inference in a very general setting where finding the truth is not necessarily the goal and where the measure of evidential favouring is not necessarily the likelihood. I use an accuracy argument to argue for probabilism and I develop a new kind of argument to argue for two general updating rules, both of which are reasonable in different contexts. One of the updating rules has standard Bayesian updating, Bissiri et al.’s ([2016]) general Bayesian updating, Douven’s ([2016]) IBE-based updating, and my (Vassend ([forthcoming]) quasi-Bayesian updating as special cases. The other updating rule is novel. |
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School of Humanities |
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School of Humanities Vassend, Olav B. |
| format |
Article |
| author |
Vassend, Olav B. |
| author_sort |
Vassend, Olav B. |
| title |
Justifying the norms of inductive inference |
| title_short |
Justifying the norms of inductive inference |
| title_full |
Justifying the norms of inductive inference |
| title_fullStr |
Justifying the norms of inductive inference |
| title_full_unstemmed |
Justifying the norms of inductive inference |
| title_sort |
justifying the norms of inductive inference |
| publishDate |
2022 |
| url |
https://hdl.handle.net/10356/159993 |
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1738844887898390528 |