lie transformation造句

In particular, points are not preserved by general Lie transformations.
Lie sphere geometry is the geometry of the Lie quadric and the Lie transformations which preserve it.
The Lie transformations preserve the contact elements, and act transitively on " Z " 3.
The fact that Lie transformations do not preserve points in general can also be a hindrance to understanding Lie sphere geometry.
The subgroup of Lie transformations preserving the point cycles is essentially the subgroup of orthogonal transformations which preserve the chosen timelike direction.
It's difficult to find lie transformation in a sentence. 用lie transformation造句挺難的

The group of Lie transformations is now O ( n + 1, 2 ) and the Lie transformations preserve incidence of Lie cycles.
The group of Lie transformations is now O ( n + 1, 2 ) and the Lie transformations preserve incidence of Lie cycles.
It can also be characterized as the centralizer of the involution " & rho; ", which is itself a Lie transformation.
This geometry can be difficult to visualize because Lie transformations do not preserve points in general : points can be transformed into circles ( or spheres ).
This identification is not invariant under Lie transformations : in Lie invariant terms, " Z " 2 " n " 1 is the space of ( projective ) lines on the Lie quadric.