Aitoff with Tissot's Indicatrices of Distortion

The Aitoff projection is a modified azimuthal map projection proposed by

David A. Aitoff David (; , "beloved one") (traditional spelling), , ''Dāwūd''; grc-koi, Δαυΐδ, Dauíd; la, Davidus, David; gez , ዳዊት, ''Dawit''; xcl, Դաւիթ, ''Dawitʿ''; cu, Давíдъ, ''Davidŭ''; possibly meaning "beloved one". w ...

in 1889. Based on the equatorial form of the azimuthal equidistant projection, Aitoff first halves longitudes, then projects according to the azimuthal equidistant, and then stretches the result horizontally into a 2:1 ellipse to compensate for having halved the longitudes. Expressed simply: :

x = 2 \operatorname_x\left(\frac, \varphi\right), \qquad
y = \operatorname_y \left(\frac\lambda 2, \varphi \right)

where azeq and azeq are the ''x'' and ''y'' components of the equatorial azimuthal equidistant projection. Written out explicitly, the projection is: :

x = \frac, \qquad
y = \frac

where :

\alpha = \arccos\left(\cos\varphi\cos\frac\right)\,

and sinc ''α'' is the unnormalized

sinc function In mathematics, physics and engineering, the sinc function, denoted by , has two forms, normalized and unnormalized.. In mathematics, the historical unnormalized sinc function is defined for by \operatornamex = \frac. Alternatively, the u ...

with the discontinuity removed. In all of these formulas, ''λ'' is the longitude from the central meridian and ''φ'' is the latitude. Three years later, Ernst Hermann Heinrich Hammer suggested the use of the Lambert azimuthal equal-area projection in the same manner as Aitoff, producing the Hammer projection. While Hammer was careful to cite Aitoff, some authors have mistakenly referred to the Hammer projection as the Aitoff projection.''Flattening the Earth: Two Thousand Years of Map Projections'', John P. Snyder, 1993, pp.130-133, .

References

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Table of common projections

{{Authority control Map projections

See also

References

External links