Geography Reference
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Bibliography
1. Abramowitz, M., Stegun, J.A.: Handbook of Mathematical Functions. Applied Mathemat-
ical Series, vol. 55. National Bureau of Standards, New York (1965)
2. Abramowitz, M., Stegun, J.A.: Jacobian elliptic functions and theta functions, Chap. 16. In:
Handbook of Mathematical Functions with Formulas, Graphs, and Mathematical Tables,
9th printing, pp. 567-581. Dover, New York (1972)
3. Adams, O.S.: Latitude developments connected with geodesy and cartography with tables,
including a table for Lambert Equal-Area Meridional projection: U.S Coast and Geodetic
Survey Spec. Pub. 67 (1921)
4. Airy, G.B.: Explanation of a projection by balance of errors for maps applying to a very
large extent of the Earth's surface: comparison of this projection with other projections.
Philos. Mag.
22
, 409-442 (1861)
5. Almansi, E.: Sulle deformazioni finite di solidi elastici isotropi, Note I. Atti Accad. naz.
Lincei Re. Serie Quinta
201
, 705-714 (1911)
6. Amalvict, M., Livieratos, E.: Surface mapping of a rotational reference ellipsoid onto a
triaxial counterpart through strain parameters. Manuscripta Geodaetica
13
, 133-138 (1988)
7. Awange, J., Grafarend, E.: Solving Algebraic Computational Problems in Geodesy and
Goeinformatics. Springer, Berlin (2005)
8. Ayoub, R.: The lemniscate and Fagnano's contributions to elliptic integrals. Arch. Hist.
Exact Sci.
29
, 131-149 (1984)
9. Baarda, W.: Statistical Concepts in Geodesy. Netherlands Geodetic Commission, Publica-
tions on Geodesy, New Series, vol. 2 (1967a)
10. Baarda, W.: A generalization of the concept strength of the figure. Publ. Geodesy, New
Series Vol.2, No.4, Delft (1967b)
11. Bartelme, N., Meissl, P.: Ein einfaches, rasches und numerisch stabiles Verfahren zur Bes-
timmung des kurzesten Abstandes eines Punktes von einem spharoidischen Rotationsellip-
soid. Allgemeine Vermessungsnachrichten
82
, 436-439 (1975)
12. Barut, A.O.: Theory of the conformally invariant mass. Ann. Phys.
71
, 519-541 (1972)
13. Bass, H., Connell, E.H., Wright, D.: The Jacobian conjecture: reduction of degree and
formal expansion of the inverse. Bull. Am. Math. Soc.
7
, 287-329 (1982)
14. Bateman, H.: The transformation of the electrodynamical equations. Proc. Lond. Math.
Soc.
8
, 223-264, 469-488 (1910)
15. Bayen, F.: Conformal invariance in physics. In: Cahen, C., Flato, M. (eds) Differential
Geometry and Relativity, pp. 171-195. Reidel, Dordrecht (1976)
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