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Sisällön tarjoaa Ludwig-Maximilians-Universität München and MCMP Team. Ludwig-Maximilians-Universität München and MCMP Team tai sen podcast-alustan kumppani lataa ja toimittaa kaiken podcast-sisällön, mukaan lukien jaksot, grafiikat ja podcast-kuvaukset. Jos uskot jonkun käyttävän tekijänoikeudella suojattua teostasi ilman lupaasi, voit seurata tässä https://fi.player.fm/legal kuvattua prosessia.
Samanlainen kuin MCMP – Philosophy of Mathematics
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Haecceities and Mathematical Structuralism
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Sisällön tarjoaa Ludwig-Maximilians-Universität München and MCMP Team. Ludwig-Maximilians-Universität München and MCMP Team tai sen podcast-alustan kumppani lataa ja toimittaa kaiken podcast-sisällön, mukaan lukien jaksot, grafiikat ja podcast-kuvaukset. Jos uskot jonkun käyttävän tekijänoikeudella suojattua teostasi ilman lupaasi, voit seurata tässä https://fi.player.fm/legal kuvattua prosessia.
Christopher Menzel (Texas A&M University) gives a talk at the MCMP Colloquium (18 June, 2014) titled "Haecceities and Mathematical Structuralism". Abstract: It is well-known that some earlier versions of mathematical structuralism (notably from Resnik and Shapiro) appeared to be committed to a rather strong form of the Identity of Indiscernibles (II) that is falsified by the existence of structures like the complex field that admit of non-trivial automorphisms, or symmetries. In light of more recent work (notably, by MacBride, Ketland, Shapiro, Ladyman, and Leitgeb and Ladyman), it is widely accepted that the mathematical structuralist is not committed to II and that, in fact, the principle can be rejected outright on robustly structuralist grounds. I accept a qualified form of this view but I don't think the issue is as cut and dried as it might appear. In a 2007 Analysis article, José Bermúdez suggests that a strong version of II is still in play for the structuralist that can meet the challenge of non-trivial symmetries. The key to the proposal (as I will interpret it) lies in allowing identity properties, or haecceities, like being identical to c (for an arbitrary complex number c, say) to count as structural properties. Typically, structuralists dismiss such properties as obviously non-structural. I will argue to the contrary that haecceities can be viewed as properly structural and, in some circumstances, can serve as legitimate properties for discerning otherwise indiscernible “positions” in structures. Drawing on the model theoretic concept of an expansion, I base my argument on a notion of discernibility rooted intuitively in “underlying structure”. This notion turns out to be equivalent to a notion of discernibility identified in some previous studies but proves useful in focusing when haecceities can legitimately be invoked and why Bermúdez's proposed version of II falls short of a fully satisfactory structuralist principle.
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22 jaksoa
Jaa
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Manage episode 293117470 series 2929680
Sisällön tarjoaa Ludwig-Maximilians-Universität München and MCMP Team. Ludwig-Maximilians-Universität München and MCMP Team tai sen podcast-alustan kumppani lataa ja toimittaa kaiken podcast-sisällön, mukaan lukien jaksot, grafiikat ja podcast-kuvaukset. Jos uskot jonkun käyttävän tekijänoikeudella suojattua teostasi ilman lupaasi, voit seurata tässä https://fi.player.fm/legal kuvattua prosessia.
Christopher Menzel (Texas A&M University) gives a talk at the MCMP Colloquium (18 June, 2014) titled "Haecceities and Mathematical Structuralism". Abstract: It is well-known that some earlier versions of mathematical structuralism (notably from Resnik and Shapiro) appeared to be committed to a rather strong form of the Identity of Indiscernibles (II) that is falsified by the existence of structures like the complex field that admit of non-trivial automorphisms, or symmetries. In light of more recent work (notably, by MacBride, Ketland, Shapiro, Ladyman, and Leitgeb and Ladyman), it is widely accepted that the mathematical structuralist is not committed to II and that, in fact, the principle can be rejected outright on robustly structuralist grounds. I accept a qualified form of this view but I don't think the issue is as cut and dried as it might appear. In a 2007 Analysis article, José Bermúdez suggests that a strong version of II is still in play for the structuralist that can meet the challenge of non-trivial symmetries. The key to the proposal (as I will interpret it) lies in allowing identity properties, or haecceities, like being identical to c (for an arbitrary complex number c, say) to count as structural properties. Typically, structuralists dismiss such properties as obviously non-structural. I will argue to the contrary that haecceities can be viewed as properly structural and, in some circumstances, can serve as legitimate properties for discerning otherwise indiscernible “positions” in structures. Drawing on the model theoretic concept of an expansion, I base my argument on a notion of discernibility rooted intuitively in “underlying structure”. This notion turns out to be equivalent to a notion of discernibility identified in some previous studies but proves useful in focusing when haecceities can legitimately be invoked and why Bermúdez's proposed version of II falls short of a fully satisfactory structuralist principle.
…
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22 jaksoa
Kaikki jaksot
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Samanlainen kuin MCMP – Philosophy of Mathematics
Get in-depth coverage of current and future trends in technology, and how they are shaping business, entertainment, communications, science, politics, and society.
…
continue reading
Artificial Intelligence has suddenly gone from the fringes of science to being everywhere. So how did we get here? And where's this all heading? In this new series of Science Friction, we're finding out.
…
continue reading
PT Inquest is an online journal club. Hosted by Jason Tuori, Megan Graham, and Chris Juneau, the show looks at an article every week and discusses how it applies to current physical therapy practice.
…
continue reading
Unseeable forces control human behavior and shape our ideas, beliefs, and assumptions. Invisibilia—Latin for invisible things—fuses narrative storytelling with science that will make you see your own life differently.
…
continue reading
Flash Forward is a show about possible (and not so possible) future scenarios. What would the warranty on a sex robot look like? How would diplomacy work if we couldn’t lie? Could there ever be a fecal transplant black market? (Complicated, it wouldn’t, and yes, respectively, in case you’re curious.) Hosted and produced by award winning science journalist Rose Eveleth, each episode combines audio drama and journalism to go deep on potential tomorrows, and uncovers what those futures might re ...
…
continue reading
Learn Hindi with Free Podcasts Whether you are student or a seasoned speaker, our lessons offer something for everyone. We incorporate culture and current issues into each episode to give the most informative, both linguistically and culturally, podcasts possible. For those of you with just the plane ride to prepare, check our survival phrase series at HindiPod101.com. One of these phrases just might turn your trip into the best one ever!
…
continue reading
Podcast by Cox n' Crendor Show
…
continue reading
Science sleuths Dr Adam Rutherford and Dr Hannah Fry investigate everyday mysteries sent by listeners.
…
continue reading
Catholic podcasts dedicated to those on the spiritual journey! Offering the best teachings from the rich Catholic Spiritual/Discernment tradition.
…
continue reading
Every episode we blast anyone who gets in our way. We bring critical thinking, skepticism, and irreverence to any topic that makes the news, makes it big, or makes us mad. It’s skeptical, it’s political and there is no welcome mat.
…
continue reading
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