Yeah I think we’re on the same page there, I was just pointing out a limitation of the thought experiment that draws attention to the fact that infinity only allows what’s improbable possible and doesn’t make the impossible possible. But yeah it doesn’t undermine the idea that introducing infinities gives unintuitive results.
I agree, and I think it’s an absolutely fascinating area to study, because it does touch on some very important questions about our universe. We still don’t know if on the most fundamental levels, if our universe is constrained in some way, or if given enough time everything can change including those constants. I think about this a lot, but there are a surprising number of people who can’t grasp the ideas and problems, so apologies if I came on strong, I just want to make sure we’re all talking about the same things.
Yeah I think the recentness of formalizing infinities into math with Newton’s and Leibnez’s calculus (infinite series, limits approaching infinity) in the 1600s and Cantor’s sets (cardinality of infinite sets) in the late 1800s speaks to the difficulty of even conceptualizing the problems they introduce and the rigor needed to handle them
Yeah I think we’re on the same page there, I was just pointing out a limitation of the thought experiment that draws attention to the fact that infinity only allows what’s improbable possible and doesn’t make the impossible possible. But yeah it doesn’t undermine the idea that introducing infinities gives unintuitive results.
I agree, and I think it’s an absolutely fascinating area to study, because it does touch on some very important questions about our universe. We still don’t know if on the most fundamental levels, if our universe is constrained in some way, or if given enough time everything can change including those constants. I think about this a lot, but there are a surprising number of people who can’t grasp the ideas and problems, so apologies if I came on strong, I just want to make sure we’re all talking about the same things.
Yeah I think the recentness of formalizing infinities into math with Newton’s and Leibnez’s calculus (infinite series, limits approaching infinity) in the 1600s and Cantor’s sets (cardinality of infinite sets) in the late 1800s speaks to the difficulty of even conceptualizing the problems they introduce and the rigor needed to handle them