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Equal-area polyhedral map projection
Snyder equal-area projection
is a
polyhedral map projection
used in the
ISEA
(Icosahedral Snyder Equal Area)
discrete global grids
. It is named for John P. Snyder, who developed the projection in the 1990s.
[1]
It is a modified
Lambert azimuthal equal-area projection
, most often applied to a
polyhedral globe
consisting of an
icosahedron
.
[2]
[3]
With the
dual
tiling system
is possible to transform the big triangular faces (gray) into small centered-hexagons (red), and
vice versa
.
Use in the ISEA model
[
edit
]
As stated by Carr at al.,
[3]
page 32:
- The S in ISEA refers to John P. Snyder. He came out of retirement specifically to address projection problems with the original EMAP grid (see Snyder, 1992). He developed the equal area projection that underlies the gridding system.
- ISEA grids are simple in concept. Begin with a Snyder Equal Area projection to a regular icosahedron (...) inscribed in a sphere. In each of the 20 equilateral triangle faces of the icosahedron inscribe a hexagon by dividing each triangle edge into thirds (...). Then project the hexagon back onto the sphere using the Inverse Snyder Icosahedral equal area projection. This yields a coarse-resolution equal area grid called the resolution 1 grid. It consists of 20 hexagons on the surface of the sphere and 12 pentagons centered on the 12 vertices of the icosahedron.
References
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edit
]
