Jared A. Millson scite author profile

Like other epistemic activities, inquiry seems to be governed by norms. Some have argued that one such norm forbids us from believing the answer to a question and inquiring into it at the same time. But another, hither-to neglected norm seems to permit just this sort of cognitive arrangement when we seek to confirm what we currently believe. In this paper, I suggest that both norms are plausible and that the conflict between them constitutes a puzzle. Drawing on the felicity conditions of confirmation requests and the biased interrogatives used to perform them, I argue that the puzzle is genuine. I conclude by considering a response to the puzzle that has implications for the debate regarding the relationship between credences and beliefs.

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A Cut-Free Sequent Calculus for Defeasible Erotetic Inferences

Millson

2018

Stud Logica

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In recent years, the effort to formalize erotetic inferences-i.e., inferences to and from questions-has become a central concern for those working in erotetic logic. However, few have sought to formulate a proof theory for these inferences. To fill this lacuna, we construct a calculus for (classes of) sequents that are sound and complete for two species of erotetic inferences studied by Inferential Erotetic Logic (IEL): erotetic evocation and erotetic implication. While an effort has been made to axiomatize the former in a sequent system, there is currently no proof theory for the latter. Moreover, the extant axiomatization of erotetic evocation fails to capture its defeasible character and provides no rules for introducing or eliminating question-forming operators. In contrast, our calculus encodes defeasibility conditions on sequents and provides rules governing the introduction and elimination of erotetic formulas. We demonstrate that an elimination theorem holds for a version of the cut rule that applies to both declarative and erotetic formulas and that the rules for the axiomatic account of question evocation in IEL are admissible in our system.

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Inference, explanation, and asymmetry

2018

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Perspectives, Questions, and Epistemic Value

Khalifa

Millson

2019

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Many epistemologists endorse true-belief monism, the thesis that only true beliefs are of fundamental epistemic value. However, this view faces formidable counterexamples. In response to these challenges, we alter the letter, but not the spirit, of true-belief monism. We dub the resulting view "inquisitive truth monism", which holds that only true answers to relevant questions are of fundamental epistemic value. Which questions are relevant is a function of an inquirer's perspective, which is characterized by his/her interests, social role, and background assumptions. Using examples of several different scientific practices, we argue that inquisitive truth monism outperforms true-belief monism.

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Jared A. Millson

Counterfactuals and Explanatory Pluralism

Seeking confirmation: A puzzle for norms of inquiry

A Cut-Free Sequent Calculus for Defeasible Erotetic Inferences

Inference, explanation, and asymmetry

Perspectives, Questions, and Epistemic Value

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