References

AltamimiEtAl2002

Altamimi, Z., P. Sillard, and C. Boucher (2002), ITRF2000: A new release of the International Terrestrial Reference Frame for earth science applications, J. Geophys. Res., 107(B10), 2214, doi:10.1029/2001JB000561.

Bessel1825

F. W. Bessel, 1825, The calculation of longitude and latitude from geodesic measurements, Astron. Nachr. 331(8), 852–861 (2010), translated by C. F. F. Karney and R. E. Deakin.

CalabrettaGreisen2002

M. Calabretta and E. Greisen, 2002, “Representations of celestial coordinates in FITS”. Astronomy & Astrophysics 395, 3, 1077–1122.

ChanONeil1975

F. Chan and E. M. O’Neill, 1975, “Feasibility Study of a Quadrilateralized Spherical Cube Earth Data Base”, Tech. Rep. EPRF 2-75 (CSC), Environmental Prediction Research Facility.

Danielsen1989

J. Danielsen, 1989, The area under the geodesic, Survey Review 30(232), 61–66.

Deakin2004

R.E. Deakin, 2004, The Standard and Abridged Molodensky Coordinate Transformation Formulae.

EberHewitt1979

L. E. Eber and R.P. Hewitt, 1979, Conversion algorithms for the CalCOFI station grid, California Cooperative Oceanic Fisheries Investigations Reports 20:135-137.

Evenden1995

G. I. Evenden, 1995, Cartograpic Projection Procedures for the UNIX Environment - A User’s Manual.

Evenden2005

G. I. Evenden, 2005, libproj4: A Comprehensive Library of Cartographic Projection Functions (Preliminary Draft).

EversKnudsen2017

K. Evers and T. Knudsen, 2017, Transformation pipelines for PROJ.4, FIG Working Week 2017 Proceedings.

GeodesicBib

A geodesic bibliography.

GeodesicWiki

The wikipedia page, Geodesics on an ellipsoid.

Häkli2016

P. Häkli, M. Lidberg, L. Jivall, et al, 2016, The NKG2008 GPS Campaign - final transformation results and a new common Nordic reference frame, Journal of Geodetic Science, 6(1).

Helmert1880

F. R. Helmert, 1880, Mathematical and Physical Theories of Higher Geodesy, Vol 1, (Teubner, Leipzig), Chaps. 5–7.

Karney2011

C. F. F. Karney, 2011, Geodesics on an ellipsoid of revolution; errata.

Karney2013

C. F. F. Karney, 2013, Algorithms for geodesics, J. Geodesy 87(1) 43–55; addenda.

Komsta2016

L. Komsta, 2016, ATPOL geobotanical grid revisited - a proposal of coordinate conversion algorithms, Annales UMCS Sectio E Agricultura 71(1), 31–37.

LambersKolb2012

M. Lambers and A. Kolb, 2012, “Ellipsoidal Cube Maps for Accurate Rendering of Planetary-Scale Terrain Data”, Proc. Pacific Graphics (Short Papers).

ONeilLaubscher1976

E. M. O’Neill and R. E. Laubscher, 1976, “Extended Studies of a Quadrilateralized Spherical Cube Earth Data Base”, Tech. Rep. NEPRF 3-76 (CSC), Naval Environmental Prediction Research Facility.

Snyder1987

J. P. Snyder, 1987, Map Projections - A Working Manual. U.S. Geological Survey professional paper 1395.

Snyder1993

J. P. Snyder, 1993, Flattening the Earth, Chicago and London, The University of Chicago press.

Steers1970

J. A. Steers, 1970, An introduction to the study of map projections (15th ed.), London Univ. Press, p. 229.

Verey2017

M. Verey, 2017, Theoretical analysis and practical consequences of adopting an ATPOL grid model as a conical projection, defining the conversion of plane coordinates to the WGS-84 ellipsoid, Fragmenta Floristica et Geobotanica Polonica (preprint submitted).

Vincenty1975

T. Vincenty, 1975, Direct and inverse solutions of geodesics on the ellipsoid with application of nested equations, Survey Review 23(176), 88–93.

WeberMoore2013

E. D. Weber and T.J. Moore, 2013, Corrected Conversion Algorithms For The CalCOFI Station Grid And Their Implementation In Several Computer Languages, California Cooperative Oceanic Fisheries Investigations Reports 54.

Zajac1978

A. Zajac, 1978, “Atlas of distribution of vascular plants in Poland (ATPOL)”, Taxon 27(5/6), 481–484.