Abstract: Confucius frequently employs the term xin 信 in the Analects. The frequency of his usage suggests that xin has a significant place within his ethics. The main aim of this article is to offer an account of the roles played by xin within Confucius’ ethics. To have a clear understanding of these roles, however, one needs first to understand what Confucius encompasses within his notion of xin. The article begins by delineating the Confucian conception of xin, as presented in the Analects. The notion of xin is often taken to be isomorphic with the notion of trust. I argue that Confucius’ notion of xin does not quite map onto the notion of trust as usually understood in contemporary Western contexts. To understand better what Confucian xin amounts to, I compare and contrast the Confucian conception of xin with contemporary Western accounts of trust by Baier, McLeod, and Mullin. This comparison helps elucidate what xin is as well as how xin relates to morality. With this in hand, the roles that Confucius ascribes to xin in social and political contexts are then delineated.
Why There are No Ready-Made Phenomena: What Philosophers of Science Should Learn From Kant
Abstract: The debate on scientific realism has raged among philosophers of science for decades. The scientific realist’s claim that science aims to give us a literally true description of the way things are, has come under severe scrutiny and attack by Bas van Fraassen’s constructive empiricism. All science aims at is to save the observable phenomena, according to van Fraassen. Scientific realists have faced since a main sceptical challenge: the burden is on them to prove that the entities postulated by our scientific theories are real and that science is still in the ‘truth’ business.
The Concept of Zhen 真 in the Zhuangzi
Abstract: The term zhen in the Zhuangzi is commonly associated with the zhen ren or the “true person,” who is described, for example, as capable of going through fire and water unharmed. Some scholars take this as typifying a mystical element in the Zhuangzi. This essay investigates the various meanings and uses of zhen in the Zhuangzi and reaches a broader understanding of the zhen ren in various contexts.
Classical Chinese Logic
Abstract: The present article provides an introduction to classical Chinese logic, a term which refers to ancient discourses that were developed before the arrival of significant external influences and which flourished in China until the first unification of China, during the Qin Dynasty. Taking as its premise that logic implies both universal and culturally conditioned elements, the author describes the historical background of Chinese logic, the main schools of Chinese logical thought, the current state of research in this area and the crucial concepts and methods applied in classical Chinese logic. The close link between Chinese logic and the Chinese language is also stressed
Logical knowledge and ordinary reasoning
Abstract: This paper argues that the prominent accounts of logical knowledge have the consequence that they conflict with ordinary reasoning. On these accounts knowing a logical principle, for instance, is having a disposition to infer according to it. These accounts in particular conflict with so-called ‘reasoned change in view’, where someone does not infer according to a logical principle but revise their views instead. The paper also outlines a propositional account of logical knowledge which does not conflict with ordinary reasoning.
What distinguishes data from models?
Abstract: I propose a framework that explicates and distinguishes the epistemic roles of data and models within empirical inquiry through consideration of their use in scientific practice. After arguing that Suppes’ characterization of data models falls short in this respect, I discuss a case of data processing within exploratory research in plant phenotyping and use it to highlight the difference between practices aimed to make data usable as evidence and practices aimed to use data to represent a specific phenomenon. I then argue that whether a set of objects functions as data or models does not depend on intrinsic differences in their physical properties, level of abstraction or the degree of human intervention involved in generating them, but rather on their distinctive roles towards identifying and characterizing the targets of investigation. The paper thus proposes a characterization of data models that builds on Suppes’ attention to data practices, without however needing to posit a fixed hierarchy of data and models or a highly exclusionary definition of data models as statistical constructs.
Logical Self Reference, Set Theoretical Paradoxes and the Measurement Problem in Quantum Mechanics
Introduction: From a logical point of view the measurement problem of quantum mechanics, can be described as a characteristic question of ‘semantical closure’ of a theory: to what extent can a consistent theory (in this case 2R) be closed with respect to the objects and the concepfs which are described and expressed in its metatheory?
Primitive Ontology in a Nutshell
Abstract: The aim of this paper is to summarize a particular approach of doing metaphysics through physics – the primitive ontology approach. The idea is that any fundamental physical theory has a well-defined architecture, to the foundation of which there is the primitive ontology, which represents matter. According to the framework provided by this approach when applied to quantum mechanics, the wave function is not suitable to represent matter. Rather, the wave function has a nomological character, given that its role in the theory is to implement the law of evolution for the primitive ontology.
Platonism and Anti-Platonism: Why Worry?
Abstract: This paper argues that it is scientific realists who should be most concerned about the issue of Platonism and anti-Platonism in mathematics. If one is merely interested in accounting for the practice of pure mathematics, it is unlikely that a story about the ontology of mathematical theories will be essential to such an account. The question of mathematical ontology comes to the fore, however, once one considers our scientific theories. Given that those theories include amongst their laws assertions that imply the existence of mathematical objects, scientific realism, when construed as a claim about the truth or approximate truth of our scientific theories, implies mathematical Platonism. However, a standard argument for scientific realism, the ‘no miracles’ argument, falls short of establishing mathematical Platonism. As a result, this argument cannot establish scientific realism as it is usually defined, but only some weaker position. Scientific ‘realists’ should therefore either redefine their position as a claim about the existence of unobservable physical objects, or alternatively look for an argument for their position that does establish mathematical Platonism.
Epistemicism about vagueness and meta-linguistic safety
Abstract: The paper challenges Williamson’s safety based explanation for why we cannot know the cut-off point of vague expressions. We assume throughout (most of) the paper that Williamson is correct in saying that vague expressions have sharp cut-off points, but we argue that Williamson’s explanation for why we do not and cannot know these cut-off points is unsatisfactory. In sect 2 we present Williamson’s position in some detail. In particular, we note that Williamson’s explanation relies on taking a particular safety principle (‘Meta-linguistic belief safety’ or ‘MBS’) as a necessary condition on knowledge. In section 3, we show that even if MBS were a necessary condition on knowledge, that would not be sufficient to show that we cannot know the cut-off points of vague expressions. In section 4, we present our main case against Williamson’s explanation: we argue that MBS is not a necessary condition on knowledge, by presenting a series of cases where one’s belief violates MBS but nevertheless constitutes knowledge. In section 5, we present and respond to an objection to our view. And in section 6, we briefly discuss the possible directions a theory of vagueness can take, if our objection to Williamson’s theory is taken on board.