Directory of Map Projections
Cylindric- БСАМ
- Карченко-Шабанова
- Урмаева III
- цилиндрическая Павлова
- Braun cylindric
- BSAM
- Cassini
- Cassini-Soldner
- central cylindric
- cylindric equal-area
- Balthasart
- Behrmann equal-area
- Craster rectangular equal-area
- cylindric equal-area
- Gall orthographic
- Gall-Peters
- Hobo-Dyer
- Lambert equal-area cylindric
- Peters
- Smyth equal-surface
- Tobler world in a square
- Trystan Edwards
- equidistant cylindric
- equirectangular
- Gall isographic
- Gall stereographic
- geographic projection
- Karchenko-Shabanova
- la carte parallélogrammatique
- lat⁄lon
- Marinus
- Mercator
- complex latitude plane
- ellipsoidal Mercator
- ellipsoidal oblique Mercator
- ellipsoidal transverse Mercator
- Gauss conformal
- Gauss Hannover
- Gauss-Krüger
- Gauss-Schreiber
- Hotine
- Mercator
- oblique cylindric orthomorphic
- rectified skew orthomorphic
- Thompson transverse Mercator
- transverse cylindric orthomorphic
- Universal Transverse Mercator
- UTM
- Wallis 1 transverse Mercator
- Wallis 2 transverse Mercator
- Web maps Mercator
- Wright
- Miller cylindric
- Patterson
- Pavlov cylindric
- perspective cylindric
- plane chart
- plate carrée
- rectangular
- simple cylindric
- simple perspective cylindric
- transverse plate carrée
- Urmayev III
Pseudocylindric- Apian II
- Apianus II
- Atlantis
- Babinet
- Boggs eumorphic
- Bomford modified Gall
- Bromley
- Cabot
- Collignon
- Craster parabolic
- Eckert
- elliptical
- Equal Earth
- equal-area polynomial
- Foucaut
- Fournier II
- Gall-Bomford
- Goode homolosine
- Hölzel
- Hatano asymmetric
- HEALPix
- homalographic
- homolographic
- homolosine
- Hufnagel I
- Hufnagel
- Hufnagel
- Hufnagel II
- Hufnagel III
- Hufnagel IV
- Hufnagel IX
- Hufnagel V
- Hufnagel VII
- Hufnagel X
- Hufnagel XI
- Hufnagel XII
- hyperelliptical
- Kavrayskiy
- loximuthal
- McBryde S3
- McBryde-Thomas
- III
- IV
- McBryde-Thomas flat-pole parabolic
- McBryde-Thomas flat-pole quartic
- McBryde-Thomas flat-pole sinusoidal
- McBryde-Thomas I
- McBryde-Thomas II
- V
- Mercator equal-area
- Mollweide
- Natural Earth
- Nell
- Nell-Hammer
- orthophanic
- Philbrick Sinu-Mollweide
- Putniṇš P4
- Putniṇš
- Putniṇš P1
- Putniṇš P1´
- Putniṇš P2
- Putniṇš P3
- Putniṇš P3´
- Putniṇš P4´
- Putniṇš P5
- Putniṇš P5´
- Putniṇš P6
- Putniṇš P6´
- quartic authalic
- Robinson
- Sanson-Flamsteed
- simple equal-area homotopy
- sinucyli
- sinusoidal
- Snyder minimum-error
- The Times
- Tobler-Mercator
- trapezoidal
- Urmayev
- Wagner
- Winkel
Conic- Albers equal-area conic
- Albers-Bonne homotopy
- Albers-Lambert homotopy
- American polyconic
- amulet
- bipolar oblique conic conformal
- Bonne
- Boole
- Bottomley
- Braun stereographic conic
- conical orthomorphic
- dépôt de la guerre
- ellipsoidal Lambert conformal conic
- equal-area pseudoconic
- equidistant conic
- Gauss conformal conic
- globe gores
- Harding
- heart
- Herschel conformal conic
- isoperimetric cordiform
- Lambert conformal conic
- Lambert equal-area conic
- modified Flamsteed
- optimized Albers
- ordinary polyconic
- périgonale equal-area conic
- perspective conic
- polyconic
- Ptolemy
- rectangular polyconic
- shield
- simple conic
- Stab-Werner
- Tissot equal-area conic
- War Office
- Werner
Azimuthal- Airy
- azimuthal equidistant
- azimuthal extruded globe
- Berghaus star
- Breusing
- Canters EU
- Chamberlin trimetric
- Close
- doubly azimuthal
- doubly equidistant
- fisheye
- Immler
- isoperimetric pseudoazimuthal
- Lambert azimuthal equal-area
- Lorgna
- McCaw
- Miller oblated stereographic
- orthodromic
- perspective
- AMS lunar
- analemma
- central
- Clarke twilight
- far-side perspective
- Fischer far-side perspective
- gnomic
- gnomonic
- Gretschel
- horologium
- James far-side perspective
- Lowry
- orthographic
- planisphærium
- stereographic
- tilted perspective
- vertical perspective
- Postel
- quasiazimuthal equal-area apple
- quasiazimuthal equal-area polygon
- regular star
- retroazimuthal
- Craig retroazimuthal
- Hammer retroazimuthal back hemisphere
- Hammer retroazimuthal front hemisphere
- Littrow
- Mecca
- Weir azimuthal
- two-point azimuthal
- two-point equidistant
- Wiechel
- zenithal equal-area
- zenithal equidistant
- zenithal equivalent
Lenticular- A4
- Aitoff
- Briesemeister
- Dietrich-Hammer homotopy
- Dietrich-Kitada
- Eckert-Greifendorff
- Ginzburg
- Gott equal-area elliptical
- Gott-Mugnolo equal-area elliptical
- Hammer
- Hammer-Aitoff
- hamusoidal
- kiss
- Strebe
- Strebe 1995
- Strebe asymmetric
- Strebe equal-areas
- cartouche
- Strebe-Hammer
- Strebe-Kavrayskiy V
- Strebe-Mollweide
- Strebe-sinusoidal
- Strebe-Snyder flat-pole
- Strebe-Snyder pointed-pole
- Wagner
- Winkel tripel
Miscellaneous- ЦНИИГАиК
- ابوریحان بیرونی
- Adams
- Adams hemisphere in a square
- Adams world in a hexagon
- Adams world in a square I
- Adams world in a square II
- Al-Bīrūnī
- Apian globular I
- Apian globular II
- Apianus globular I
- Apianus globular II
- armadillo
- Arrowsmith globular
- August
- August epicycloidal
- Bacon globular
- Cahill conformal butterfly
- Cahill-Concialdi bat
- chaise lounge conformal
- conformal world in an ellipse
- Cox world in a triangle
- Denoyer semi-elliptical
- dymaxion-like conformal
- Eisenlohr
- Fournier globular I
- Gilbert two-world perspective
- Ginzburg VIII
- Glareanus globular
- great circle equal-area tetrahedron
- GS50
- Guyou
- Lagrange
- Larrivée
- lateral equidistant
- Loritz globular
- masque
- Nicolosi globular
- oblated Lagrange
- Ortelius oval
- Peirce quincuncial
- polyhedron conformal face
- pseudorthographic
- quincuncial
- Raisz
- small circle equal-area tetrahedron
- Snyder equal-area tetrahedron
- tri-optimal
- TsNIIGAiK
- van der Grinten
- apple shaped
- van der Grinten
- van der Grinten I
- van der Grinten II
- van der Grinten III
- van der Grinten IV
- van Leeuwen
Mollweide
homolographic
homalographic
Babinet
elliptical
Hufnagel I
Classifications
pseudocylindric
equal-area
Graticule
Meridians: Central meridian is a straight line half as long as the equator. Meridians 90°E and W. Of the central meridian form a circle. Others are equally spaced semiellipses intersecting at the poles and concave toward the central meridian.
Parallels: Unequally spaced straight parallel lines, farthest apart near the equator; spacing changes gradually. Perpendicular to the central meridian.
Poles: Points.
Symmetry: About the central meridian or the equator.
Aspects
For educational purposes, it has been shown in various aspects as examples of normal, transverse, and oblique aspects of almost any pseudocylindric projection. The transverse aspect has also been used by John Bartholomew in The Times Atlas in England in 1958.
Scale
True along latitudes 40°44′N and S.
Constant along any given latitude; same for the latitude of opposite sign.
Distortion
Severe near outer meridians at high latitudes but can be substantially reduced if interrupted with several central meridians. Free of distortion only at latitudes 40°44′N and S. On the central meridian.
Usage
Occasional world maps, especially thematic maps. Combined with sinusoidal projection to develop other projections such as the Goode Homolosine and the Boggs.
Similar projections
Goode Homolosine (Mollweide merged with sinusoidal).
Boggs eumorphic (Mollweide averaged with sinusoidal).
Bromley, by Robert H. Bromley in 1965 (Mollweide compressed from north to south with east-west expansion to achieve no distortion along the equator).
Hyperelliptical, by Waldo R. Tobler in 1973 (equal-area pseudocylindric having “hyperelliptical” meridians that lie between the Mollweide ellipses and a circumscribed rectangle).
Origin
Presented by Carl B. Mollweide (1774-1825) of Germany in 1805.
Description adapted from J.P. Snyder and P.M. Voxland, An Album of Map Projections, U.S. Geological Survey Professional Paper 1453. United States Government Printing Office: 1989.
