Topic: Philosophy of the Formal Natural and Social Sciences -> Logic and Mathematics
FiltersNEW

Hold ctrl / ⌘ to select more or unselect / Info

Topics

Languages

Traditions

Times (use negative numbers for BCE)

-

Medium:

Recommended use:

Difficulty:


Full text
Edgington, Dorothy. On Conditionals
1995, Mind 104(414): 235-329.

Expand entry

Added by: Emily Paul, Contributed by: Helen De Cruz
Summary: Examines the theory of conditionals and whether it's possible to have a unified theory of them.
Comment: Great core text as there are many important discussion points here, and Edginton uses lots of helpful examples. Could set students the task of coming up with their own conditionals, and analysing these in the would/will sense. This definitely requires a background in beginner's logic.
Read free
Edgington, Dorothy. Indicative Conditionals
2001, In The Stanford Encyclopedia of Philosophy (Fall 2020 Edition), Edward N. Zalta (ed.)
Expand entry
Added by: Franci Mangraviti
Abstract:

The chapter is an introduction to logical treatments of indicative conditionals, comparing truth-functional, non-truth-functional, and suppositional approaches. Some of the topics discussed are truth conditions, conditional belief, assertability, and issues with compounds of conditionals.

Comment: This page can be used in a course focused on the philosophy of conditionals, as an introduction/overview of the basic logical issues; or in any logic course wishing to spend more time on this particular notion.
Read freeBlue print
Eichler, Lauren. Sacred Truths, Fables, and Falsehoods: Intersections between Feminist and Native American Logics
2018, APA Newsletter on Native American and Indigenous Philosophy, 18(1).
Expand entry
Added by: Franci Mangraviti
Abstract:

From the newsletter's introduction: "Lauren Eichler [...] examines the resonances between feminist and Native American analyses of classical logic. After considering the range of responses, from overly monolithic rejection to more nuanced appreciation, Eichler argues for a careful, pluralist understanding of logic as she articulates her suggestion that feminists and Native American philosophers could build fruitful alliances around this topic."

Comment: available in this Blueprint
Full text
Erickson, Evelyn. More Limits of Abductivism About Logic
2025, Studia Logica, 113: 503–322.

Expand entry

Added by: Viviane Fairbank
Abstract:
Logical abductivism is the method which purports to use Inference to the Best Explantion (IBE) to determine the best logical theory. The present essay argues that this is not the case, since the method fails to meet the criteria requisite for the fruitful application of IBE. This occurs due to an intrinsic difficulty in choosing the appropriate evidence and theoretical virtues which guide theory revision in logic: one’s previous conception of logic influences both these choices. Logical abductivism fails, moreover, to select the best logical theory, exactly because a lack of agreement on theory and virtues for Logic. Rather than direct comparison between two options, a more suitable approach to theory revision in logic is piecemeal, because this method neither assumes nor needs a neutral ground from which to start revising theories.
Comment: This is an accessible introduction to the contemporary debate regarding "abductivism about logic" (not to be confused with "abductive logic"). It might be included in any course on the epistemology of logic, particularly for anyone interested in so-called anti-exceptionalism about logic.
Full text
Felappi, Giulia. ‘There is no reason for the necessity of the ultimate principles of deduction.’ Margaret Macdonald on logical necessity
2025, The Philosophical Quarterly, pqaf052

Expand entry

Added by: Viviane Fairbank, Contributed by: Viviane Fairbank
Abstract:
This paper aims at contributing to the recent enterprise of rediscovering Margaret Macdonald’s views, by focusing on her reflections on the necessity of logic, a theme that runs through many of her papers and reviews. We will see both Macdonald’s negative views about what the necessity of logic is not (Section I), and her positive view about what it is and how it supports her claim that it is in fact irrational to ask for a reason for the necessity of the ultimate principles of deduction, such as the Principle of Contradiction (Section II). To show how her view on the necessity of logic is different from others, such as David Lewis’s, we will then consider what she would reply to current rejectors of the Principle of Contradiction (Section III).
Comment: This article provides a useful introduction to Margaret MacDonald's work in the mid-twentieth century on the topic of logical necessity. It goes over several possible accounts of the grounds of logical necessity and clearly articulates MacDonald's objections to them, as well as her own positive view on the matter; the final section places MacDonald's view in a contemporary context. As such, it might relevantly be included in any intermediate/advanced course on the epistemology and metaphysics of logic.
Full text
Ficara, Elena. The Form of Truth: Hegel’s Philosophical Logic
2020, De Gruyter
Expand entry
Added by: Franci Mangraviti
Publisher’s Note:

This book is a consideration of Hegel’s view on logic and basic logical concepts such as truth, form, validity, and contradiction, and aims to assess this view’s relevance for contemporary philosophical logic. The literature on Hegel’s logic is fairly rich. The attention to contemporary philosophical logic places the present research closer to those works interested in the link between Hegel’s thought and analytical philosophy, Koch 2014, Brandom 2014, 1-15, Pippin 2016, Moyar 2017, Quante & Mooren 2018 among others). In this context, one particularity of this book consists in focusing on something that has been generally underrated in the literature: the idea that, for Hegel as well as for Aristotle and many other authors, logic is the study of the forms of truth, i.e. the forms that our thought can assume in searching for truth. In this light, Hegel’s thinking about logic is a fundamental reference point for anyone interested in a philosophical foundation of logic.

Comment: The book could be used in any course on Hegel's logic, either as a main textbook (if focusing on the author's overall interpretation) or as further reading. The latter approach is facilitated by the structure of the book, since each part is focused on a distinct logical notion (logic, logical form, truth, validity, contradiction). Given the author's thesis that Hegel can be considered as a genuine interlocutor of philosophical logic as it is understood today, one might even try discussing some chapters in a course focusing on a particular logical notion.
Full textRead free
Finn, Suki. Limiting Logical Pluralism
2019, Synthese (198): 4905–4923

Expand entry

Added by: Viviane Fairbank
Abstract:
In this paper I argue that pluralism at the level of logical systems requires a certain monism at the meta-logical level, and so, in a sense, there cannot be pluralism all the way down. The adequate alternative logical systems bottom out in a shared basic meta-logic, and as such, logical pluralism is limited. I argue that the content of this basic meta-logic must include the analogue of logical rules Modus Ponens and Universal Instantiation. I show this through a detailed analysis of the ‘adoption problem’, which manifests something special about MP and UI. It appears that MP and UI underwrite the very nature of a logical rule of inference, due to all rules of inference being conditional and universal in their structure. As such, all logical rules presuppose MP and UI, making MP and UI self-governing, basic, unadoptable, and required in the meta-logic for the adequacy of any logical system.
Comment: This is an accessible discussion to logical pluralism and its relation to foundational issues in the epistemology of logic—notably the Adoption Problem. As such it can be included in any syllabus focused on special topics in the philosophy of logic. It does not require much background knowledge of logic or formal systems.
Full text
Fisher, Jennifer. On the Philosophy of Logic
2007, Cengage Learning.

Expand entry

Added by: Berta Grimau, Contributed by: Matt Clemens
Publisher's Note: Jennifer Fisher's On the Philosophy of Logic explores questions about logic often overlooked by philosophers. Which of the many different logics available to us is right? How would we know? What makes a logic right in the first place? Is logic really a good guide to human reasoning? An ideal companion text for any course in symbolic logic, this lively and accessible book explains important logical concepts, introduces classical logic and its problems and alternatives, and reveals the rich and interesting philosophical issues that arise in exploring the fundamentals of logic.
Comment: This book provides an introduction to some traditional questions within philosophy of logic. Moreover, it presents some non-classical logics. It includes an introduction to formal classical logic, so no previous technical knowledge is required. Adequate for a first course on philosophy of logic, either as main or further reading.
Full textRead freeBlue print
Francois, Karen, Vandendriessche, Eric. Reassembling Mathematical Practices: a Philosophical-Anthropological Approach
2016, Revista Latinoamericana de Etnomatemática Perspectivas Socioculturales de la Educación Matemática, 9(2): 144-167.

Expand entry

Added by: Fenner Stanley Tanswell
Abstract:
In this paper we first explore how Wittgenstein’s philosophy provides a conceptual tools to discuss the possibility of the simultaneous existence of culturally different mathematical practices. We will argue that Wittgenstein’s later work will be a fruitful framework to serve as a philosophical background to investigate ethnomathematics (Wittgenstein 1973). We will give an overview of Wittgenstein’s later work which is referred to by many researchers in the field of ethnomathematics. The central philosophical investigation concerns Wittgenstein’s shift to abandoning the essentialist concept of language and therefore denying the existence of a universal language. Languages—or ‘language games’ as Wittgenstein calls them—are immersed in a form of life, in a cultural or social formation and are embedded in the totality of communal activities. This gives rise to the idea of rationality as an invention or as a construct that emerges in specific local contexts. In the second part of the paper we introduce, analyse and compare the mathematical aspects of two activities known as string figure-making and sand drawing, to illustrate Wittgenstein’s ideas. Based on an ethnomathematical comparative analysis, we will argue that there is evidence of invariant and distinguishing features of a mathematical rationality, as expressed in both string figure-making and sand drawing practices, from one society to another. Finally, we suggest that a philosophical-anthropological approach to mathematical practices may allow us to better understand the interrelations between mathematics and cultures. Philosophical investigations may help the reflection on the possibility of culturally determined ethnomathematics, while an anthropological approach, using ethnographical methods, may afford new materials for the analysis of ethnomathematics and its links to the cultural context. This combined approach will help us to better characterize mathematical practices in both sociological and epistemological terms.
Comment (from this Blueprint): Francois and Vandendriessche here present a later Wittgensteinian approach to “ethnomathematics”: mathematics practiced outside of mainstream Western contexts, often focused on indigenous or tribal groups. They focus on two case studies, string-figure making and sand-drawing, in different geographic and cultural contexts, looking at how these practices are mathematical.
Full text
Friend, Michele. Introducing Philosophy of Mathematics
2007, Acumen; reprinted by Routledge (2014).

Expand entry

Added by: Berta Grimau, Contributed by: Matt Clemens
Publisher's Note: What is mathematics about? Does the subject-matter of mathematics exist independently of the mind or are they mental constructions? How do we know mathematics? Is mathematical knowledge logical knowledge? And how is mathematics applied to the material world? In this introduction to the philosophy of mathematics, Michele Friend examines these and other ontological and epistemological problems raised by the content and practice of mathematics. Aimed at a readership with limited proficiency in mathematics but with some experience of formal logic it seeks to strike a balance between conceptual accessibility and correct representation of the issues. Friend examines the standard theories of mathematics - Platonism, realism, logicism, formalism, constructivism and structuralism - as well as some less standard theories such as psychologism, fictionalism and Meinongian philosophy of mathematics. In each case Friend explains what characterises the position and where the divisions between them lie, including some of the arguments in favour and against each. This book also explores particular questions that occupy present-day philosophers and mathematicians such as the problem of infinity, mathematical intuition and the relationship, if any, between the philosophy of mathematics and the practice of mathematics. Taking in the canonical ideas of Aristotle, Kant, Frege and Whitehead and Russell as well as the challenging and innovative work of recent philosophers like Benacerraf, Hellman, Maddy and Shapiro, Friend provides a balanced and accessible introduction suitable for upper-level undergraduate courses and the non-specialist.
Comment: This book provides an introduction to the philosophy of mathematics. No previous mathematical skills/knowledge required. Suitable for undergraduate courses on philosophy of mathematics.
Can’t find it?
Contribute the texts you think should be here and we’ll add them soon!