This is a very high-level overview, and not too technical, for the first fifteen minutes at least. It's about the relationship between mathematics and physics and development of scientific ideas. At 40:11 he shows how Structure and Interpretation of Classical Mechanics should have been written! See Lasenby, Doran & Gull (1998[2004]) Gravity, Gauge Theories and Geometric Algebra and David Hestenes - New foundations for classical mechanics . Subscribe to Nomen Nominandum . GAME2020 - 1. Dr. Leo Dorst. Get Real! (new audio!) See https://www.jeremyong.com/klein/ in this context SSE stands for Streaming SIMD Extensions . See also https://enkimute.github.io/ganja.js . Subscribe to BiVector .
This was in The Guardian: David Turner obituary , only eight days after I posted David Turner Talking About Sixty Years of Functional Programming History : This talk was given in London in 2017: See Turner, D. A. "Some History of Functional Programming Languages" also John Hughes - Why Functional Programming Matters and David MacQueen's talk at ICFP 2015 in Numberphile - Sophie Maclean on the Catalan Numbers . At 10:30 This whole discussion abut combinator reduction is especially interesting. I didn't know Arthur Norman had tried building hardware for combinator machines. I'll look that up: maybe start here A.C. Norman Faster combinator reduction using stock hardware in LFP '88: Proceedings of the 1988 ACM conference on LISP and functional programming. At 26:25 on the ISWIM virtual machine implemented in the PAL compacting garbage collector?! This work Reynolds and others did was at MIT in Masecheusetts and Argonne National Laboratory Illinois. Did
See Spread Polynomials : 27:48 On factorization of spread-polynomials, see Lewis Carroll - Crocodile Story Subscribe to Norman Wildberger . JPL Orbits & Ephemerides: https://ssd.jpl.nasa.gov/orbits.html See also this very impressive student project, which is a digital orrery that uses the JPL Ephemerides: https://www.robots.ox.ac.uk/~mjc/Papers/3YP_Report.pdf This seems to be the basis for a way to make a space-flight simulator for planets. See Trying to Make a Sci-Fi Movie for the context. See also Laplace Transform : Algebraic construction The Laplace transform can be alternatively defined in a purely algebraic manner by applying a field of fractions construction to the convolution ring of functions on the positive half-line. The resulting space of abstract operators is exactly equivalent to Laplace space, but in this construction the forward and reverse transforms never need to be explicitly defined (avoiding the related difficulties with proving convergence). MikusiĆski
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