We propose a new account of indicative conditionals, giving acceptability and logical closure conditions for them. We start from Adams’ Thesis: the claim that the acceptability of a simple indicative equals the corresponding conditional probability. The Thesis is widely endorsed, but arguably false and refuted by empirical research. To fix it, we submit, we need a relevance constraint: we accept a simple conditional φ→ψ to the extent that (i) the conditional probability p(ψ|φ) is high, provided that (ii) φ is relevant for ψ. How (i) should work is well-understood. It is (ii) that holds the key to improve our understanding of conditionals. Our account has (i) a probabilistic component, using Popper functions; (ii) a relevance component, give...
More than a decade of research has found strong evidence for P(if A, then C) = P(C|A) (“the Equation...
Conditionals—sentences of the form ‘If A, B’—are ubiquitous in human discourse and reasoning, and ye...
Adams’ Thesis has much evidence in its favour, but DavidLewis famously showed that it cannot be true...
We propose a new account of indicative conditionals, giving acceptability and logical closure condit...
We propose a new account of indicative conditionals, giving acceptability and logical closure condit...
Once upon a time, some thought that indicative conditionals could be effectively analyzed as materia...
Although there are a large number of approaches to conditionals, no consensus has yet been reached o...
According to what is now commonly referred to as the Equation in the literature on indicative condit...
Abstract The so-called ‘Adams ’ Thesis ’ is often understood as the claim that the assertibility of ...
In this paper, new evidence is presented for the assumption that the reason-relation\ud reading of i...
The aim is to theoretically motivate a relevance approach to (indicative) conditionals in a comparat...
According to Adams (Inquiry 8:166–197, 1965), the acceptability of an indicative conditional goes wi...
Many modern theories of indicative conditionals treat them as restricted epistemic necessity modals....
This paper discusses the issue of categorical acceptability of indicative and concessive conditional...
The literature on indicative conditionals contains two appealing views. The first is the selectional...
More than a decade of research has found strong evidence for P(if A, then C) = P(C|A) (“the Equation...
Conditionals—sentences of the form ‘If A, B’—are ubiquitous in human discourse and reasoning, and ye...
Adams’ Thesis has much evidence in its favour, but DavidLewis famously showed that it cannot be true...
We propose a new account of indicative conditionals, giving acceptability and logical closure condit...
We propose a new account of indicative conditionals, giving acceptability and logical closure condit...
Once upon a time, some thought that indicative conditionals could be effectively analyzed as materia...
Although there are a large number of approaches to conditionals, no consensus has yet been reached o...
According to what is now commonly referred to as the Equation in the literature on indicative condit...
Abstract The so-called ‘Adams ’ Thesis ’ is often understood as the claim that the assertibility of ...
In this paper, new evidence is presented for the assumption that the reason-relation\ud reading of i...
The aim is to theoretically motivate a relevance approach to (indicative) conditionals in a comparat...
According to Adams (Inquiry 8:166–197, 1965), the acceptability of an indicative conditional goes wi...
Many modern theories of indicative conditionals treat them as restricted epistemic necessity modals....
This paper discusses the issue of categorical acceptability of indicative and concessive conditional...
The literature on indicative conditionals contains two appealing views. The first is the selectional...
More than a decade of research has found strong evidence for P(if A, then C) = P(C|A) (“the Equation...
Conditionals—sentences of the form ‘If A, B’—are ubiquitous in human discourse and reasoning, and ye...
Adams’ Thesis has much evidence in its favour, but DavidLewis famously showed that it cannot be true...