References, Further Reading, and Related Materials - Spatial Mathematics: Theory and Practice through Mapping

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References, Further

Reading, and Related

Materials

These materials are in addition to materials at the end of each chapter; those

focus on documents created by the authors of this work.

Abbot, E. A. 1884. Flatland: A Romance of Many Dimensions . United Kingdom: Seely & Co.

Adam, J. A. 2012. X and the City: Modeling Aspects of Urban Life . Princeton: Princeton

University Press.

Aitchison, A. 2011. The Google Maps / Bing Maps Spherical Mercator Projection http://alastaira.

wordpress.com/2011/01/23/the-google-maps-bing-maps-spherical-mercator-projection/

Albrecht, J. 2005. Maps projections. Hunter College: Introduction to Mapping Sciences.

http://www.geo.hunter.cuny.edu/~jochen/gtech201/lectures/lec6concepts/map%20

coordinate%20systems/how%20to%20choose%20a%20projection.htm

Alexandroff Extension. 2011. http://en.wikipedia.org/wiki/Alexandroff_extension

Anderson, J. R., E. E. Hardy, J. T. Roach, and R. E. Witmer. 1976. A Land Use and Land

Cover Classification System for Use with Remote Sensor Data. US Geological Survey

Professional Paper 964, 41 pages.

Appel, K. and W. Haken. 1976. A proof of the 4-color theorem. Discrete Mathematics , 16,

no. 2, 179-180.

Arlinghaus, S. L. 2007. Geometry/Geography—Visual Unity. Solstice: An Electronic Journal of

Geography and Mathematics . Volume XVIII, No. 2. Ann Arbor: Institute of Mathematical

Geography. http://www-personal.umich.edu/~copyrght/image/solstice/win07/hyper

bolicgeometry.html

Arlinghaus, S. L. et al. 1994. Practical Handbook of Curve Fitting . Boca Raton: CRC Press.

Arlinghaus, S. L. 1993. Central Place Fractals. Chapter 10 in Fractals in Geography , edited by

N. Lam and L. DeCola. New Jersey: Prentice-Hall.

Arlinghaus, S. L. 1993. Electronic Geometry. The Geographical Review April, Vol. 83, No. 2,

160-169.

Arlinghaus, S. L. 1985. Fractals take a central place. Geografiska Annaler , Journal of the

Stockholm School of Economics, 67B, 83-88.

Arlinghaus, S. L. and W. C. Arlinghaus. 1989. The fractal theory of central place hierar-

chies: A Diophantine analysis of fractal generators for arbitrary Löschian numbers.

Geographical Analysis: An International Journal of Theoretical Geography . Ohio State

University Press. Vol. 21, No. 2, April, pp. 103-121.

Arlinghaus, S. L., W. C. Arlinghaus, and J. D. Nystuen. 1990. The Hedetniemi Matrix Sum: An

Algorithm for Shortest Path and Shortest Distance, Geographical Analysis , Vol. 22, No.

4, 351-360.

Arlinghaus, W. E. 2011. Personal communication.

Arnol d, D. N. and J. Rogers. 2007. Möbius Transformations Revealed. http://www.youtube.

com/watch?v=JX3VmDgiFnY

Barbaree, D. Watsons Go To Birmingham with AGXO. Complexity level: 2, 3. http://

edcommunity.esri.com/arclessons/lesson.cfm?id=643

Bender, B. 1999. Subverting the Western gaze: Mapping alternative worlds. In P.J. Ucko and

R. Layton. The Archaeology and Anthropology of Landscape: Shaping your landscape .

One World Archaeology. 30. London: Routledge.

Spatial Mathematics: Theory and Practice through Mapping

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