Conformal Numbers

Abstract: The conformal compactification is considered in a hierarchy of hypercomplex projective spaces with relevance in physics including Minkowski and Anti-de Sitter space. The geometries are expressed in terms of bicomplex Vahlen matrices and further broken down into their structural components. The relation between two subsequent projective spaces is displayed in terms of the complex unit and three additional hypercomplex numbers.

“…Conformal transformations have been investigated in [31] based on spin representations over the ring of bicomplex numbers. The non-zero commutation relations for these spin matrices are [s µν , p σ ] = g νσ p µ − g µσ p ν , [s µν , q σ ] = g νσ q µ − g µσ q ν ,…”

“…In [31] the Möbius geometry is defined based on translations as the coset representatives of the corresponding homogeneous space. Dilations and rotations represent the commuting Cartan subalgebra of the conformal algebra, which can also be used to represent the Euclidean subgeometry as discussed in Section 9.…”

“…The higher dimensional ambient space R 3,1 appears via the spin angular momentum and Eq. (31), which allows to study aspects of the AdS/CFT correspondence in a simplified geometry.…”

“…Solitons are usually considered in the context of gauge transformations, which relate in a mathematical context to fiber bundles and Cartan geometries [22].With regards to the topics discussed above research in two-dimensional conformal field theories [41,42,43,44,45] has turned out to be important, also because conceptual insights can be obtained more easily in a lower dimensional geometry. Motivation to proceed in this direction is also provided by [31]. In this article the two-dimensional Euclidean plane and the conformal symmetries, which refer to the Laplace equation in R 2 , are fundamental in a sequence of higher dimensional geometries and Clifford algebras.…”

Holographic coordinates

“…Conformal transformations have been investigated in [31] based on spin representations over the ring of bicomplex numbers. The non-zero commutation relations for these spin matrices are [s µν , p σ ] = g νσ p µ − g µσ p ν , [s µν , q σ ] = g νσ q µ − g µσ q ν ,…”

“…In [31] the Möbius geometry is defined based on translations as the coset representatives of the corresponding homogeneous space. Dilations and rotations represent the commuting Cartan subalgebra of the conformal algebra, which can also be used to represent the Euclidean subgeometry as discussed in Section 9.…”

“…The higher dimensional ambient space R 3,1 appears via the spin angular momentum and Eq. (31), which allows to study aspects of the AdS/CFT correspondence in a simplified geometry.…”

“…Solitons are usually considered in the context of gauge transformations, which relate in a mathematical context to fiber bundles and Cartan geometries [22].With regards to the topics discussed above research in two-dimensional conformal field theories [41,42,43,44,45] has turned out to be important, also because conceptual insights can be obtained more easily in a lower dimensional geometry. Motivation to proceed in this direction is also provided by [31]. In this article the two-dimensional Euclidean plane and the conformal symmetries, which refer to the Laplace equation in R 2 , are fundamental in a sequence of higher dimensional geometries and Clifford algebras.…”

Holographic coordinates

“…The only point, [1 : 0], not covered by this embedding is associated with infinity (ideal element) [6;31,Ch. 8;33;45].…”

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