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    The transformation law of 3-acceleration is linear and in... — Carmelics
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    Home/Modality & Possibility
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    Supports→There does not exist a unique standard of zero 3-acceleration that is intrinsic to the differential topological structure of spacetime.

    The transformation law of 3-acceleration is linear and inhomogeneous in the 3-acceleration variable.

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    Related propositions within the same area of thought.
    An inhomogeneous transformation law means no frame-independent zero value exists...The same reasoning that requires geometric fields for 4-acceleration applies ana...There does not exist a unique standard of zero 3-acceleration that is intrinsic ...

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    The transformation law for 4-acceleration is inhomogeneous, as shown b...89%The transformation law of the projective structure has the same inhomo...87%A 4-acceleration that is zero with respect to one coordinate system is...82%The same reasoning that requires geometric fields for 4-acceleration a...79%

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    SEP: weyl
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    The above argument for the necessity of geometric fields also holds for 3-velocity and 3-acceleration, denoted respectively by \(\xi^{\alpha}_{1}\) and \(\xi^{\alpha}_{2}\). The transformation law for the 3-acceleration is much more complicated than that of the 4-acceleration. However, analogous to the case of 4-acceleration, the transformation law of 3-acceleration is linear and is inhomogeneous in the 3-acceleration variable \(\xi^{\alpha}_{2}\). Consequently, there does not exist a unique s

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