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# Coons patch

In mathematics, a Coons patch, is a type of manifold parametrization used in computer graphics to smoothly join other surfaces together, and in computational mechanics applications, particularly in finite element method and boundary element method, to mesh problem domains into elements.

Coons patches are named after Steven Anson Coons.

Bilinear blending

Given four space curves *c*_{0}(*s*), *c*_{1}(*s*), *d*_{0}(*t*), *d*_{1}(*t*) which meet at four corners *c*_{0}(0) = *d*_{0}(0), *c*_{0}(1) = *d*_{1}(0), *c*_{1}(0) = *d*_{0}(1), *c*_{1}(1) = *d*_{1}(1); linear interpolation can be used to interpolate between *c*_{0} and *c*_{1}, that is

\( L_c(s,t)=(1-t) c_0(s)+ t c_1(s) \, \)

and between d0, d1

\( L_d(s,t)=(1-s) d_0(t)+ s d_1(t) \,\)

producing two ruled surfaces defined on the unit square.

The bilinear interpolation on the four corner points is another surface

\( B(s,t) = c_0(0) (1-s)(1-t) + c_0(1) s(1-t) + c_1(0) (1-s)t + c_1(1) s t. \,\)

A bilinearly blended Coons patch is the surface

\( L_c(s,t)+L_d(s,t)-B(s,t). \,\)

Bicubic blending

Although the bilinear Coons patch exactly meets its four boundary curves, it does not necessarily have the same tangent plane at those curves as the surfaces to be joined, leading to creases in the joined surface along those curves. To fix this problem, the linear interpolation can be replaced with cubic Hermite splines with the weights chosen to match the partial derivatives at the corners. This forms a bicubically blended Coons patch.

See also

Surface

Atlas (topology)

Interpolation

References

Weiqing Gu. "Surface Construction Schemes". Retrieved 8 April 2012.

Undergraduate Texts in Mathematics

Graduate Studies in Mathematics

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