Fragmentation and logical omniscience

IF 1.8 1区 哲学 0 PHILOSOPHY
NOUS Pub Date : 2021-06-12 DOI:10.1111/NOUS.12381
A. Elga, A. Rayo
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On the resulting theory, rationality requires ordinary agents to be logically competent and to often engage in trains of thought that increase the unification of their states of mind. But rationality does not require ordinary agents to be logically omniscient. ∗Forthcoming in Noûs. Both authors contributed equally to this work. Thanks to Diego Arana Segura, Sara Aronowitz, Alejandro Pérez Carballo, Ross Cameron, David Chalmers, Jonathan Cohen, Keith DeRose, Sinan Dogramaci, Cian Dorr, Kenny Easwaran, Hartry Field, Branden Fitelson, Peter Fritz, Jeremy Goodman, Daniel Hoek, Frank Jackson, Shivaram Lingamneni, Christopher Meacham, Patrick Miller, Molly O’Rourke-Friel, Michael Rescorla, Ted Sider, Mattias Skipper, Robert Stalnaker, Jason Stanley, Bruno Whittle, Robbie Williams, an anonymous Noûs referee; participants in the Corridor reading group (on three occasions), a graduate seminar session at Rutgers University, a Fall 2011 joint MIT/Princeton graduate seminar, and a Spring 2016 MIT/Princeton/Rutgers graduate seminar taught jointly with Andy Egan; audiences at several APA division meetings (2017 Eastern and Pacific, 2021 Eastern) the 2008 Arizona Ontology Conference, Brown University, Catholic University of Peru, CUNY, National Autonomous University of Mexico, Ohio State University, Syracuse, University, University of Bologna, UC Berkeley, UC Riverside, UC Santa Cruz, University of Connecticut at Storrs, University of Graz, University of Leeds, University of Paris (IHPST), University of Oslo (on two occasions), University of Texas at Austin, Yale University, MIT, and Rutgers University. The initial direction of this paper was enormously influenced by conversations with Andy Egan. Elga gratefully acknowledges support from a 2014-15 Deutsche Bank Membership at the Princeton Institute for Advanced Study. 1 Standard decision theory is incomplete Professor Moriarty has given John Watson a difficult logic problem and credibly threatened to explode a bomb unless Watson gives the correct answer by noon. Watson has never thought about that problem before, and even experienced logicians take hours to solve it. It is seconds before noon. Watson is then informed that Moriarity has accidentally left the answer to the problem on an easily accessible note. Watson’s options are to look at the note (which requires a tiny bit of extra effort) or to give an answer of his choice without looking at the note. Is it rationally permissible for Watson to look at the note? The answer is elementary: it is rationally permissible. Someone might object that only a logically omniscient agent could be fully rational, and therefore that Watson is required to be certain of the correct answer to the logic puzzle (and to give that answer). Even so, we hope the objector would agree that there is a sense in which, given Watson’s limited cognitive abilities, it is rational, reasonable, or smart for Watson look at the note.1,2 Unfortunately, standard Bayesian decision theory (as it is usually applied) fails to deliver any sense in which it is rationally permissible for Watson to look at the note. For it represents the degrees of belief of an agent as a probability function satisfying the standard probability axioms. And on the usual way of applying these axioms to a case like Watson’s, they entail that Watson assigns probability 1 to every logical truth, including the solution to Moriarity’s logic problem.3 But if Watson is certain of the solution from the 1The Watson case is structurally similar to the “bet my house” case from Christensen (2007, 8–9). For arguments that seek to differentiate between “ordinary standards of rationality” (according to which logical omniscience is not required) and “ideal standards” (according to which it is), see Smithies (2015). 2Compare: even an objective Bayesian who counts some prior probability functions as irrational might have use for a decision theory that says what decisions are rational, given a particular (perhaps irrational) prior. 3For important early discussions of how the assumption that logical truths gets probability 1 makes trouble for decision theory, see Savage (1967, 308) and Hacking (1967). 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引用次数: 8

Abstract

It would be good to have a Bayesian decision theory that assesses our decisions and thinking according to everyday standards of rationality— standards that do not require logical omniscience (Garber 1983, Hacking 1967). To that end we develop a “fragmented” decision theory in which a single state of mind is represented by a family of credence functions, each associated with a distinct choice condition (Lewis 1982, Stalnaker 1984). The theory imposes a local coherence assumption guaranteeing that as an agent’s attention shifts, successive batches of “obvious” logical information become available to her. A rule of expected utility maximization can then be applied to the decision of what to attend to next during a train of thought. On the resulting theory, rationality requires ordinary agents to be logically competent and to often engage in trains of thought that increase the unification of their states of mind. But rationality does not require ordinary agents to be logically omniscient. ∗Forthcoming in Noûs. Both authors contributed equally to this work. Thanks to Diego Arana Segura, Sara Aronowitz, Alejandro Pérez Carballo, Ross Cameron, David Chalmers, Jonathan Cohen, Keith DeRose, Sinan Dogramaci, Cian Dorr, Kenny Easwaran, Hartry Field, Branden Fitelson, Peter Fritz, Jeremy Goodman, Daniel Hoek, Frank Jackson, Shivaram Lingamneni, Christopher Meacham, Patrick Miller, Molly O’Rourke-Friel, Michael Rescorla, Ted Sider, Mattias Skipper, Robert Stalnaker, Jason Stanley, Bruno Whittle, Robbie Williams, an anonymous Noûs referee; participants in the Corridor reading group (on three occasions), a graduate seminar session at Rutgers University, a Fall 2011 joint MIT/Princeton graduate seminar, and a Spring 2016 MIT/Princeton/Rutgers graduate seminar taught jointly with Andy Egan; audiences at several APA division meetings (2017 Eastern and Pacific, 2021 Eastern) the 2008 Arizona Ontology Conference, Brown University, Catholic University of Peru, CUNY, National Autonomous University of Mexico, Ohio State University, Syracuse, University, University of Bologna, UC Berkeley, UC Riverside, UC Santa Cruz, University of Connecticut at Storrs, University of Graz, University of Leeds, University of Paris (IHPST), University of Oslo (on two occasions), University of Texas at Austin, Yale University, MIT, and Rutgers University. The initial direction of this paper was enormously influenced by conversations with Andy Egan. Elga gratefully acknowledges support from a 2014-15 Deutsche Bank Membership at the Princeton Institute for Advanced Study. 1 Standard decision theory is incomplete Professor Moriarty has given John Watson a difficult logic problem and credibly threatened to explode a bomb unless Watson gives the correct answer by noon. Watson has never thought about that problem before, and even experienced logicians take hours to solve it. It is seconds before noon. Watson is then informed that Moriarity has accidentally left the answer to the problem on an easily accessible note. Watson’s options are to look at the note (which requires a tiny bit of extra effort) or to give an answer of his choice without looking at the note. Is it rationally permissible for Watson to look at the note? The answer is elementary: it is rationally permissible. Someone might object that only a logically omniscient agent could be fully rational, and therefore that Watson is required to be certain of the correct answer to the logic puzzle (and to give that answer). Even so, we hope the objector would agree that there is a sense in which, given Watson’s limited cognitive abilities, it is rational, reasonable, or smart for Watson look at the note.1,2 Unfortunately, standard Bayesian decision theory (as it is usually applied) fails to deliver any sense in which it is rationally permissible for Watson to look at the note. For it represents the degrees of belief of an agent as a probability function satisfying the standard probability axioms. And on the usual way of applying these axioms to a case like Watson’s, they entail that Watson assigns probability 1 to every logical truth, including the solution to Moriarity’s logic problem.3 But if Watson is certain of the solution from the 1The Watson case is structurally similar to the “bet my house” case from Christensen (2007, 8–9). For arguments that seek to differentiate between “ordinary standards of rationality” (according to which logical omniscience is not required) and “ideal standards” (according to which it is), see Smithies (2015). 2Compare: even an objective Bayesian who counts some prior probability functions as irrational might have use for a decision theory that says what decisions are rational, given a particular (perhaps irrational) prior. 3For important early discussions of how the assumption that logical truths gets probability 1 makes trouble for decision theory, see Savage (1967, 308) and Hacking (1967). For
碎片化和逻辑无所不知
如果有一个贝叶斯决策理论,根据理性的日常标准来评估我们的决策和思考,这将是件好事——这些标准不需要逻辑上的无所不知(Garber 1983, Hacking 1967)。为此,我们发展了一个“碎片化”的决策理论,在这个理论中,一个单一的心理状态由一组信任函数表示,每个信任函数都与一个不同的选择条件相关联(Lewis 1982, Stalnaker 1984)。该理论施加了一个局部一致性假设,保证当一个主体的注意力转移时,连续批次的“明显”逻辑信息对她来说是可用的。期望效用最大化规则可以应用于在思考过程中决定下一步要做什么。根据由此产生的理论,理性要求普通的代理人具有逻辑能力,并且经常参与增加其精神状态统一的思维序列。但是理性并不要求普通的代理人在逻辑上是无所不知的。*即将在挪威出版。两位作者对这项工作的贡献相同。感谢迭戈·阿拉娜·塞古拉、萨拉·阿罗诺维茨、亚历山德罗·帕萨雷兹·卡巴略、罗斯·卡梅伦、大卫·查默斯、乔纳森·科恩、基思·德罗斯、希南·道格拉马奇、西恩·多尔、肯尼·伊斯瓦兰、哈里·菲尔德、布兰登·菲特尔森、彼得·弗里茨、杰里米·古德曼、丹尼尔·霍克、弗兰克·杰克逊、希瓦拉姆·林加内尼、克里斯托弗·米查姆、帕特里克·米勒、莫莉·奥洛克·弗里埃尔、迈克尔·雷斯科拉、泰德·西德、马蒂亚斯·斯基普、罗伯特·斯托纳克、杰森·斯坦利、布鲁诺·惠特尔、罗比·威廉姆斯,一位匿名的no裁判;参加走廊阅读小组(三次)、罗格斯大学研究生研讨会、2011年秋季麻省理工学院/普林斯顿大学联合研究生研讨会、2016年春季麻省理工学院/普林斯顿大学/罗格斯大学与安迪·伊根联合教授的研究生研讨会;2008年亚利桑那本体会议、布朗大学、秘鲁天主教大学、纽约市立大学、墨西哥国立自治大学、俄亥俄州立大学、锡拉丘兹大学、博洛尼亚大学、加州大学伯克利分校、加州大学里弗赛德分校、加州大学圣克鲁斯分校、康涅狄格大学斯托尔斯分校、格拉茨大学、利兹大学、巴黎大学(IHPST)、奥斯陆大学(两次)、德克萨斯大学奥斯汀分校、耶鲁大学、麻省理工学院和罗格斯大学。这篇论文最初的方向很大程度上受到了与安迪·伊根谈话的影响。1标准决策理论不完整莫里亚蒂教授给了约翰·沃森一个困难的逻辑问题,并可信地威胁说,除非沃森在中午之前给出正确答案,否则他将引爆一颗炸弹。沃森以前从未想过这个问题,即使是经验丰富的逻辑学家也要花几个小时才能解决。现在离中午还有几秒。华生被告知Moriarity不小心把问题的答案留在了一张容易拿到的纸条上。沃森的选择是看着纸条(这需要一点额外的努力),或者在不看纸条的情况下给出他选择的答案。理性上允许华生看那张便条吗?答案很简单:这在理性上是允许的。有人可能会反对说,只有逻辑上无所不知的智能体才可能是完全理性的,因此要求沃森确定逻辑难题的正确答案(并给出那个答案)。即便如此,我们希望反对者会同意,在某种意义上,鉴于沃森有限的认知能力,让沃森看纸条是理性的、合理的或聪明的。不幸的是,标准的贝叶斯决策理论(通常被应用)无法提供任何理性允许沃森查看笔记的意义。因为它将智能体的置信程度表示为满足标准概率公理的概率函数。在将这些公理应用于像沃森这样的案例的通常方式上,它们意味着沃森将概率赋给每一个逻辑真理,包括Moriarity逻辑问题的解但是,如果沃森对1的解决方案是确定的,那么沃森案例在结构上类似于克里斯滕森(2007,8-9)的“赌我的房子”案例。对于那些试图区分“普通理性标准”(根据这种标准,逻辑无所不知是不需要的)和“理想标准”(根据这种标准,逻辑无所不知)的论点,请参见史密斯(2015)。比较一下:即使是一个客观的贝叶斯,他认为一些先验概率函数是非理性的,也可能对一个决策理论有帮助,这个决策理论告诉我们,给定一个特定的(可能是非理性的)先验,什么决策是理性的。关于逻辑真理获得概率1的假设如何给决策理论带来麻烦的早期重要讨论,见Savage(1967, 308)和Hacking(1967)。为
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来源期刊
NOUS
NOUS PHILOSOPHY-
CiteScore
5.10
自引率
4.80%
发文量
34
期刊介绍: Noûs, a premier philosophy journal, publishes articles that address the whole range of topics at the center of philosophical debate, as well as long critical studies of important books. Subscribers to Noûs also receive two prestigious annual publications at no additional cost: Philosophical Issues and Philosophical Perspectives.
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