Kinematic mappings for Cayley–Klein geometries via Clifford algebras

Abstract: Abstract. This paper unifies the concept of kinematic mappings by using geometric algebras. We present a method for constructing kinematic mappings for certain Cayley-Klein geometries. These geometries are described in an algebraic setting by the homogeneous Clifford algebra model. Displacements correspond to Spin group elements. After that Spin group elements are mapped to a kinematic image space. Especially for the group of planar Euclidean displacements SE(2) the result is the kinematic mapping of Blaschke … Show more

“…The latter set can be made into a group in a natural way and as such it acts on the initial projective metric space P(V , Q). In Theorems 5.4, 5.5 and 5.6 we carry out a detailed study of this group action and its kernel, thereby extending previous work of Gunn [19,20], Jurk [32], Klawitter and Hagemann [36], Klawitter [35], Schröder [49] and others. Since the details are somewhat involved, an alternative point of view is adopted in Tables 1, 2 and 3.…”

“…Under the restrictions of Table 3 we still have a kind of "kinematic mapping", but here one element of PO (V , Q) is represented by an unordered pair of points from G(V Q). Some of the examples in [35, 3.4] and [36,Sect. 6] fit into the above concepts.…”

Projective Metric Geometry and Clifford Algebras

“…The latter set can be made into a group in a natural way and as such it acts on the initial projective metric space P(V , Q). In Theorems 5.4, 5.5 and 5.6 we carry out a detailed study of this group action and its kernel, thereby extending previous work of Gunn [19,20], Jurk [32], Klawitter and Hagemann [36], Klawitter [35], Schröder [49] and others. Since the details are somewhat involved, an alternative point of view is adopted in Tables 1, 2 and 3.…”

“…Under the restrictions of Table 3 we still have a kind of "kinematic mapping", but here one element of PO (V , Q) is represented by an unordered pair of points from G(V Q). Some of the examples in [35, 3.4] and [36,Sect. 6] fit into the above concepts.…”

Projective Metric Geometry and Clifford Algebras

“…The latter set can be made into a group in a natural way and as such it acts on the initial projective metric space P(V, Q). In Theorems 5.4, 5.5 and 5.6 we carry out a detailed study of this group action and its kernel, thereby extending previous work of C. Gunn [19], [20], R. Jurk [32], M. Hagemann and D. Klawitter [36], [35], E. M. Schröder [49] and others. Since the details are somewhat involved, an alternative point of view is adopted in Tables 1-3.…”

“…(c) The twisted adjoint representations of the quotient groups Lip × (V, Q)/F × and Lip × ( Ṽ, Q)/F × are equivalent by virtue of the isomorphism (36) and the given similarity ψ : V → Ṽ.…”

Projective metric geometry and Clifford algebras

“…The line, τ x = τ y = ∆ = 0, doesn't meet the quadric of rigid-body displacements -unless we change the ground field to C. See [1,Ch. 11] and also [7] for more details.…”

Points in the plane, lines in space