Tag Archives: Type Theory

C.S. Peirce and Category Theory • 6

Posted on June 30, 2021 by Jon Awbrey

Re: Category Theory • Henry Story HS: I’d love it of course if all of Peirce’s graphs could be mapped to CT. That would help me integrate that work a lot faster. Or alternatively, if one could work out exactly … Continue reading →

Posted in Abstraction, Aristotle, C.S. Peirce, Category Theory, Logic, Logic of Relatives, Mathematics, Peirce, Peirce's Categories, Phenomenology, Pragmatic Maxim, Relation Theory, Semiotics, Triadic Relations, Triadicity, Type Theory | Tagged Abstraction, Aristotle, C.S. Peirce, Category Theory, Logic, Logic of Relatives, Mathematics, Peirce, Peirce's Categories, Phenomenology, Pragmatic Maxim, Relation Theory, Semiotics, Triadic Relations, Triadicity, Type Theory | Leave a comment

C.S. Peirce and Category Theory • 5

Posted on June 29, 2021 by Jon Awbrey

Re: C.S. Peirce and Category Theory • 2 Re: Category Theory • Henry Story • Avi Craimer • Henry Story Dear Avi, Henry, Diagrams are a mixed bag, a complex and polymorphic species, in Peircean semiotics. All diagrams in common use, … Continue reading →

C.S. Peirce and Category Theory • 4

Posted on June 28, 2021 by Jon Awbrey

Re: C.S. Peirce and Category Theory • 3 Re: Category Theory • Kyle Rivelli Dear Kyle, My Inquiry Into Inquiry blog has a Survey page where I collect blog and wiki resources on all the longer-running topics I write and … Continue reading →

C.S. Peirce and Category Theory • 3

Posted on June 27, 2021 by Jon Awbrey

Re: Category Theory • Kyle Rivelli KR: I really enjoyed the Diagrammatic Immanence book. Gangle has another book that goes into more depth with Peirce: Gianluca Caterina and Rocco Gangle (2016), Iconicity and Abduction. Thanks, Kyle, I’ve been looking at … Continue reading →

C.S. Peirce and Category Theory • 2

Posted on June 24, 2021 by Jon Awbrey

Re: Category Theory • Henry Story HS: This book Diagrammatic Immanence [preview] has a whole chapter on Peirce and Category Theory. There’s a two‑culture tension in the reception of Peirce these days. Maybe it’s always been that way but it … Continue reading →

C.S. Peirce and Category Theory • 1

Posted on June 23, 2021 by Jon Awbrey

Cf: Category Theory • Jon Awbrey I will use this space to post what comes to mind by way of Peirce and Category Theory. Just to get the ball rolling (in good Sisyphean style) here’s my blog of mostly Peirce-related … Continue reading →

Precursors Of Category Theory • Discussion 3

Posted on September 25, 2020 by Jon Awbrey

Take your place on The Great Mandala As it moves through your brief moment of time. Win or lose now you must choose now And if you lose you’re only losing your life. Peter Yarrow Re: Ontolog Forum • Alex … Continue reading →

Posted in Abstraction, Ackermann, Aristotle, C.S. Peirce, Carnap, Category Theory, Hilbert, Kant, Logic, Logic of Relatives, Mathematics, Peirce, Peirce's Categories, Relation Theory, Saunders Mac Lane, Sign Relations, Type Theory | Tagged Abstraction, Ackermann, Aristotle, C.S. Peirce, Carnap, Category Theory, Hilbert, Kant, Logic, Logic of Relatives, Mathematics, Peirce, Peirce's Categories, Relation Theory, Saunders Mac Lane, Sign Relations, Type Theory | 2 Comments

Precursors Of Category Theory • Discussion 2

Posted on September 21, 2020 by Jon Awbrey

Re: Ontolog Forum • Alex Shkotin AS: Looking at “categories, or types” in Precursors Of Category Theory • Hilbert and Ackermann what do you think of to say “Precursors Of Type Theory” as Category Theory is a math discipline? … Continue reading →

Survey of Precursors Of Category Theory • 2

Posted on September 20, 2020 by Jon Awbrey

A few years ago I began a sketch on the “Precursors of Category Theory”, tracing the continuities of the category concept from Aristotle, to Kant and Peirce, through Hilbert and Ackermann, to contemporary mathematical practice. A Survey of resources on … Continue reading →

Posted in Abstraction, Ackermann, Analogy, Aristotle, C.S. Peirce, Carnap, Category Theory, Diagrams, Foundations of Mathematics, Functional Logic, Hilbert, History of Mathematics, Hypostatic Abstraction, Kant, Logic, Mathematics, Peirce, Propositions As Types Analogy, Relation Theory, Saunders Mac Lane, Semiotics, Type Theory, Universals | Tagged Abstraction, Ackermann, Analogy, Aristotle, C.S. Peirce, Carnap, Category Theory, Diagrams, Foundations of Mathematics, Functional Logic, Hilbert, History of Mathematics, Hypostatic Abstraction, Kant, Logic, Mathematics, Peirce, Propositions As Types Analogy, Relation Theory, Saunders Mac Lane, Semiotics, Type Theory, Universals | 7 Comments

Precursors Of Category Theory • Discussion 1

Posted on September 13, 2020 by Jon Awbrey

Re: FB | Medieval Logic • EB • JA • JA • EB • JA • EB • JA • JA • EB JA: In the logic of Aristotle categories are adjuncts to reasoning designed to resolve ambiguities and thus … Continue reading →

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