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Le 14/08/2024 à 04:24, Ross Finlayson a écrit :What happens is that beneath the Planckian regime, thereOn 07/30/2024 01:59 PM, Ross Finlayson wrote:>On 07/23/2024 01:03 PM, Ross Finlayson wrote:>On 07/17/2024 05:06 PM, Ross Finlayson wrote:>On 07/17/2024 02:01 PM, Jim Burns wrote:>On 7/17/2024 3:47 PM, Ross Finlayson wrote:>
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>Moment and Motion: theory overall>
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https://www.youtube.com/watch?v=BEpS_C7Yl2A
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Movement and change, quantification, universals, induction and
limits of induction, Feynman lectures, mathematical physics,
infinity and complements and reversals, law(s) of large numbers,
natural deduction, quantum mechanics, teleological principles,
thorough theory, comfort with canon, least action and ubiquitous
levers, sum-of-histories sum-of-potentials, time and distance,
distance and travel, gravity and perceived force, gravity and
orbits,
gravity and shadow gravity, flux and book-keeping, real potentials,
time scales, cosmological theories, length scales, atomic scale,
normalization after quantization, continuum mechanics, four-field
theory, parallax and peripheral parallax, optical non-linearity,
photons
and electron and wavelength, Angstrom and Planck scale, atomic
theory,
the terrestrial setting, probability, limit theorem(s), law(s) of
chance
and uncertainty, uniformization, Bernoulli trials and Cantor spaces,
superclassical flow, question words, Heisenberg and sampling and
measurement and observer effects, experimental and fundamental
theory, mathematics with infinity, monist dualism, "A Theory",
Zeno's
swath, the stacks.
Your sentence no verb.
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Did you (RF) have something you wanted to say ABOUT
movement and change, ..., the stacks?
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https://www.youtube.com/@rossfinlayson
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Looks I've volunteered a hundred or two hours, of it.
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This is in the context where there is line-continuity,
in the line, field continuity, on the line, and the
signal-continuity ABOUT the line.
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What I've arrived at about motion and changes in motion
and the infinitely-many higher derivatives of displacement,
with respect to time, that is any change in motion,
is "Zeno's swath", a thought experiment where not only
does the arrow reach its target, it starts and ends
at rest.
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Of course there's my tens of thousands of posts to
sci.math, sci.logic, and sci.physics.relativity.
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All one theory, ..., "A Theory".
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Moment and Motion: hybercube distance
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https://www.youtube.com/watch?v=Y8nxBU-WVQI
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Zeno's swath integral, orders of acceleration, motion
as rest to rest, length and distance, velocity and speed,
arbitrary boxes, hypercubes, block hypermatrices, path
integral, corners of the hypercube and the main diagonal,
symmetry and reflection, zero and the trivial, hat-style
analysis, hat-style as a complement to Fourier-style,
sawtooth and the sigmoid, frame-spaces and space-frames,
general relativity and conformal mapping, methods and
means in analysis, projective and perspective, thinking
over time, color, visible light, vision, parallax and peripheral
parallax, light as geometric and optical, four optical responses,
pigments' function, quantum theory, paleoclassical superclassical
theory, atomic theory and electron physics, the model of electron
orbitals, molecular chemistry and resonance theory, four
conserved quantities, flux and flow, asymptotic freedom,
quantum theories, light speed and free information,
particle mechanics and quantum amplitudes, particles and rays,
particles and beams, electrons and photons, reciprocals and
addition formulae, the fluid model and liquid and electrical
current, supermodels of wave theory, the phenomenological
and observables, object sense and deductive infinity,
multiplicity theory, zero as a sum, Zeno's bowstring and
hat analysis, standard analysis.
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Moment and Motion: theory typing
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https://www.youtube.com/watch?v=EZ88Qvxvc3M
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Hypercube unit distance, dimensions and units, infinitely-many
higher orders, underdefinition in classical mechanics, finite element
analysis, paleo-classical super-classical, vis-viva and vis-motrix,
Zeno's theories, hypercubic and hyperbolic, hypercube and hypocube,
moments and motions, object/subject distinction, maturation of theory,
linear inductive curriculum, mathematical rigor and formalism,
constancy in definition, theory for itself, natural philosophy,
definition and formalism, extensionality and abstraction, qualia,
higher geometry, analysis and definitions of analysis, complex analysis,
analysis situs, anaphora and cataphora, analytical bases and analytical
bridges, instruction and curriculum, the acquisition of object sense,
complex analysis and polar coordinates, hypercube distance and
modeling change, classical and linear theories, coordinates and
geometry,
axiomless natural deduction and axiomless geometry, unit hybercube
distance.
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Moment and Motion: elementary singularity
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https://www.youtube.com/watch?v=UiaXlMkre_g
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Time and differentiation, vision and the phi phenomenon,
theory of mechanics and dynamics, parameterized and parametrized,
hypercube distance, turns and angles, mathematics, the infinitary and
super-standard, infinitary wholes, laws of convergence and large numbers,
continuity and definition, numerical resources, not-a-real-function's
with real analytical character, finite element analysis, the stacks,
numerical methods, Funes, unification in field theory, symmetry-breaking,
super-symmetry, the potential fields as the real fields, high and low
energy
and configuration, higher geometry, Kodaira, Kodaira's approach, Stone,
Hodge, de Rham, analyticity, Kodaira's elementary approach under Hilbert
space and the Eulerian-Gaussian, identity dimension, harmonics and
potential theory, harmonic integrals of the second and third kind,
reading, optics, Laurent series and Riemann-Roch, classical
generalization
of potential theory, Weyl, Zariski, holomorphy, determinantal analysis
and cumulants and orthogonants, singular integrals, adjoints and
adjuncts, holomorphic functions and algebraic varieties, Riemann-Roch
theorem.
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School's in, you truants.
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In the paradigm of quantum kinematics, the fluxional displacement of an
inertial tensor manifests as a symbiotic relationship between entropic
harmonics and relativistic gravitons. When evaluating the antimatter
oscillations within a superluminal framework, the baryonic pressure
gradients inversely correlate with the squared velocities of photonic
quarks. Consequently, applying Newtonian mechanics to a multidimensional
string lattice results in the decoherence of transient muons, thereby
quantizing the frictionless spinor fields. This culminates in a paradox
where the centrifugal anomalies exceed the Planck constant, rendering
the conservation of angular momentum asymptotically negligible.
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In the realm of differential topology, the infinitesimal calculus of
hyperdimensional manifolds reveals that the integration of a non-
Euclidean epsilon-delta limit induces a fractal divergence within the
parametric zeta functions. When differentiating a transcendental series
along a complex vector field, the resulting partial derivatives exhibit
an intrinsic discontinuity at the asymptotic singularity. This
necessitates the application of stochastic integral calculus, where the
Laplace transformation of a chaotic system yields a non-convergent
integral over an imaginary axis. The derivative of a hyperbolic tangent
function, when expanded into an infinite Taylor series, paradoxically
converges to an irrational number, thus invalidating the fundamental
theorem of calculus within the confines of a topological knot.
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