Titlebook: Differential Geometry and Lie Groups; A Second Course Jean Gallier,Jocelyn Quaintance Textbook 2020 Springer Nature Switzerland AG 2020 Dif

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Ein Ausflug in unser Immunsystemction of the unit complex numbers .(1) on . and the action of the unit quaternions .(2) on . (., the action is defined in terms of multiplication in a larger algebra containing both the group .(.) and .). The group .(.), called a ., is defined as a certain subgroup of units of an algebra Cl., the .

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Geometry and Computinghttp://image.papertrans.cn/d/image/278753.jpg

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https://doi.org/10.1007/978-3-030-46047-1Differential geometry for computing; Differential geometry for geometry processing; Differential geome

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978-3-030-46049-5Springer Nature Switzerland AG 2020

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https://doi.org/10.1007/3-7985-1570-0that each of ..(..) and . contains a countable family of very nice finite-dimensional subspaces . (and .), where . is the space of (real) . on .., that is, the restrictions of the harmonic homogeneous polynomials of degree . (in .?+?1 real variables) to .. (and similarly for .); these polynomials sa

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Spherical Harmonics and Linear Representations of Lie Groups,that each of ..(..) and . contains a countable family of very nice finite-dimensional subspaces . (and .), where . is the space of (real) . on .., that is, the restrictions of the harmonic homogeneous polynomials of degree . (in .?+?1 real variables) to .. (and similarly for .); these polynomials sa

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