rotation group so造句
例句與造句
- The rotation group SO ( 3 ) is three-dimensional.
- For this is the rotation group SO ( 3 ).
- For = 3 this is the rotation group SO ( 3 ).
- The most important special case is that of the rotation group SO ( 3 ).
- They can be found in Rotation group SO ( 3 ) # A note on Lie algebra.
- It's difficult to find rotation group so in a sentence. 用rotation group so造句挺難的
- This brings the structure constants into line with those of the rotation group SO ( 3 ).
- The set of all rotations forms a Lie subgroup isomorphic to the ordinary rotation group SO ( 3 ).
- The rotation group SO ( 3 ) has a stabilizer of a point is isomorphic to the circle group.
- Quaternion versors, which inhabit this 3-sphere, provide a representation of the rotation group SO ( 3 ).
- The set of all appropriate matrices together with the operation of matrix multiplication is the rotation group SO ( 3 ).
- The 5D rotation group SO ( 5 ) and all higher rotation groups contain subgroups isomorphic to O ( 4 ).
- For example, in the rotation group SO ( 3 ) the maximal tori are given by rotations about a fixed axis.
- In norm quaternions, is also simply connected, so it is the covering group of the rotation group SO ( 3 ).
- The rotation group SO ( 3 ) can be described as a subgroup of direct isometries of Euclidean "'R "'3.
- Where A belongs to the compact special orthogonal group SO ( " n " ) ( generalizing the rotation group SO ( 3 ) for ).
更多例句: 下一頁