van der Grinten Projection

van der Grinten Projection

$\begin{figure}\begin{center}\BoxedEPSF{maps/vdgr.epsf scaled 500}\end{center}\end{figure}$

A Map Projection given by the transformation

$\displaystyle x$	$\textstyle =$	$\displaystyle \mathop{\rm sgn}\nolimits (\lambda-\lambda_0){\pi[A(G-P^2)+\sqrt{A^2(G-P^2)^2-(P^2+A^2)(G^2-P^2)}\,]\over P^2+A^2}$	(1)
$\displaystyle y$	$\textstyle =$	$\displaystyle \mathop{\rm sgn}\nolimits (\phi){\pi\vert PQ-A\sqrt{(A^2+1)(P^2+A^2)-Q^2}\over P^2+A^2},$	(2)

where

$\displaystyle A$	$\textstyle =$	$\displaystyle {1\over 2}\left\vert{{\pi\over\lambda-\lambda_0}-{\lambda-\lambda_0\over\pi}}\right\vert$	(3)
$\displaystyle G$	$\textstyle =$	$\displaystyle {\cos\theta\over\sin\theta+\cos\theta-1}$	(4)
$\displaystyle P$	$\textstyle =$	$\displaystyle G\left({{2\over\sin\theta}-1}\right)$	(5)
$\displaystyle \theta$	$\textstyle =$	$\displaystyle \sin^{-1}\left\vert{2\phi\over\pi}\right\vert$	(6)
$\displaystyle Q$	$\textstyle =$	$\displaystyle A^2+G.$	(7)

The inverse Formulas are

$\displaystyle \phi$	$\textstyle =$	$\displaystyle \mathop{\rm sgn}\nolimits (y)\pi\left[{-m_1\cos(\theta_1+{\textstyle{1\over 3}}\pi)-{c_2\over 3c_3}}\right]$	(8)
$\displaystyle \lambda$	$\textstyle =$	$\displaystyle {\pi\vert X^2+Y^2-1+\sqrt{1+2(X^2-Y^2)+(X^2+Y^2)^2}\vert\over 2X}+\lambda_0,$
			(9)

where

$\displaystyle X$	$\textstyle =$	$\displaystyle {x\over\pi}$	(10)
$\displaystyle Y$	$\textstyle =$	$\displaystyle {y\over\pi}$	(11)
$\displaystyle c_1$	$\textstyle =$	$\displaystyle -\vert Y\vert(1+X^2+Y^2)$	(12)
$\displaystyle c_2$	$\textstyle =$	$\displaystyle c_1-2Y^2+X^2$	(13)
$\displaystyle c_3$	$\textstyle =$	$\displaystyle -2c_1+1+2Y^2+(X^2+Y^2)^2$	(14)
$\displaystyle d$	$\textstyle =$	$\displaystyle {Y^2\over c_3}+{1\over 27}\left({{2{c_2}^3\over {c_3}^3}-{9c_1c_2\over{c_3}^2}}\right)$	(15)
$\displaystyle a_1$	$\textstyle =$	$\displaystyle {1\over c_3}\left({c_1-{{c_2}^2\over 3c_3}}\right)$	(16)
$\displaystyle m_1$	$\textstyle =$	$\displaystyle 2\sqrt{-{\textstyle{1\over 3}}a_1}$	(17)
$\displaystyle \theta_1$	$\textstyle =$	$\displaystyle {\textstyle{1\over 3}} \cos^{-1}\left({3d\over a_1m_1}\right).$	(18)

References

Snyder, J. P. Map Projections--A Working Manual. U. S. Geological Survey Professional Paper 1395. Washington, DC: U. S. Government Printing Office, pp. 239-242, 1987.

© 1996-9 Eric W. Weisstein
1999-05-26