Shear
An affine transformation in the plane under which each point is displaced in the direction of the -axis by a distance proportional to its ordinate. In a Cartesian coordinate system a shear is defined by the relations
Area and orientation are preserved under a shear.
A shear in space in the direction of the -axis is defined by the relations
Volume and orientation are preserved under a shear in space.
Comments
For shears in an arbitrary direction in a linear space, see Transvection. From a projective point of view these are (projective) transvections (central collineations with incident centre and axis) with centre at infinity and an affine hyperplane as axis.
The terminology "shear" (instead of transvection) is especially used in continuum mechanics (deformation of an elastic body e.g.). If the deformation is given by , , , the coefficient is called the shearing strain. This is a simple shear.
References
[a1] | M.E. Gurtin, "An introduction to continuum mechanics" , Acad. Press (1981) pp. Chapt. IX, §26 |
Shear. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Shear&oldid=30671