Thành viên:Phattainguyen23/Rigid transformation

Trong toán học, một phép biến đổi bảo toàn (cũng được gọi là phép biến đổi Euclide hay Euclidean isometry) is a geometric transformation of a Euclidean space that preserves the Euclidean distance between every pair of points.^[1]^[2]^[3]

The rigid transformations include rotations, translations, reflections, or their combination. Sometimes reflections are excluded from the definition of a rigid transformation by imposing that the transformation also preserve the handedness of figures in the Euclidean space (a reflection would not preserve handedness; for instance, it would transform a left hand into a right hand). To avoid ambiguity, this smaller class of transformations is known as proper rigid transformations (informally, also known as roto-translations). In general, any proper rigid transformation can be decomposed as a rotation followed by a translation, while any rigid transformation can be decomposed as an improper rotation followed by a translation (or as a sequence of reflections).

Any object will keep the same shape and size after a proper rigid transformation.

All rigid transformations are examples of affine transformations. The set of all (proper and improper) rigid transformations is a group called the Euclidean group, denoted E(n) for n-dimensional Euclidean spaces. The set of proper rigid transformation is called special Euclidean group, denoted SE(n).

In kinematics, proper rigid transformations in a 3-dimensional Euclidean space, denoted SE(3), are used to represent the linear and angular displacement of rigid bodies. According to Chasles' theorem, every rigid transformation can be expressed as a screw displacement. [[Thể loại:Hàm số và ánh xạ]] [[Thể loại:Chuyển động học]]

^ O. Bottema & B. Roth (1990). Theoretical Kinematics. Dover Publications. tr. reface. ISBN 0-486-66346-9. Đã bỏ qua tham số không rõ |nopp= (trợ giúp)
^ J. M. McCarthy (2013). Introduction to Theoretical Kinematics. MDA Press. tr. reface. Đã bỏ qua tham số không rõ |nopp= (trợ giúp)
^ Galarza, Ana Irene Ramírez; Seade, José (2007), Introduction to classical geometries, Birkhauser

[Bottema-1] O. Bottema & B. Roth (1990). Theoretical Kinematics. Dover Publications. tr. reface. ISBN 0-486-66346-9. Đã bỏ qua tham số không rõ |nopp= (trợ giúp)

[McCarthy-2] J. M. McCarthy (2013). Introduction to Theoretical Kinematics. MDA Press. tr. reface. Đã bỏ qua tham số không rõ |nopp= (trợ giúp)

[3] Galarza, Ana Irene Ramírez; Seade, José (2007), Introduction to classical geometries, Birkhauser

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