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An Introduction to Cellular Automata. Benenson/Torrens (2004) Chapter 4 GEOG 220 / 2-7-2005 Philipp Schneider. Why CA?. Because they are great tea pot warmers…. Overview. History of CA Formal definition of CA Related ideas Complex System Theory and CA Dynamics Urban CA Modeling.
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An Introduction to Cellular Automata Benenson/Torrens (2004) Chapter 4 GEOG 220 / 2-7-2005 Philipp Schneider
Why CA? Because they are great tea pot warmers…
Overview • History of CA • Formal definition of CA • Related ideas • Complex System Theory and CA Dynamics • Urban CA Modeling
History of Urban CA models • Based on two ideas • Raster conceptualization of space (late 1950s) • Regional modeling of flows of population, goods, jobs etc. (1960s and 1970s) • CA paradigm needed departure from ideas of “comprehensive modeling” a la Forrester • In late 1980s, geographers began to introduce CA ideas in urban modeling • Nowadays, CA seem to have a bad reputation in mathematics, physics etc. (“Do not mention CA in your CV!”)
Invention of CA • Invented by John von Neumann and Stanislaw Ulam at Los Alamos National Lab (early 1950s) • Based on work by Alan Turing • Most basic research on CA in the 1950s and 60s • Three major events in CA research • John von Neumann’s self-reproducing automaton • John Conway’s Game of Life • Stephen Wolfram’s classification of cellular automata
CA Definition • General • “A system made up of many discrete cells, each of which may be in one of a finite number of states. A cell or automaton may change state only at fixed, regular intervals, and only in accordance with fixed rules that depend on cells own values and the values of neighbors within a certain proximity. “ • Formal definition • CA = one- or two-dimensional grid of identical automata cells • Each cell processes information and proceeds in its actions depending on its neighbors • Each cell (automaton) A defined by • Set of States S = {S1, S2, S3, …, SN} • Transition Rules T • Therefore A ~ (S,T,R) (R: neighboring automata) • T: (St, It) St+1
Neighborhood configurations • In classic Cellular Automata theory there are three types of neighborhoods • Differ in shape and size • Other configurations have been proposed but were not accepted
Markov Processes/Fields • From deterministic to stochastic • Each cellular automaton can be considered as a stochastic system • Transition rules based on probabilities • Similar to CA but transition rules are substituted by a matrix of transition probabilities P
CA and Complex System Theory • Game of life • Developed by John H. Conway in 1970 • Simple rules complex behavior • Rules • Survival: 2 or 3 live neighbors • Birth: exactly 3 live neighbors • Death: all other cases http://www.math.com/students/wonders/life/life.html
CA Dynamics • Wolfram’s Classification of 1-D CA behavior • Spatially stable • Sequence of stable or periodic structures • Chaotic aperiodic behavior • Complicated localized structures • Wolframs classification most popular • Problem: Class membership of a given rule is undecidable
Variations of Classic CA • Grid geometry & Neighborhood • Hexagonal, triangular and irregular grids • Larger or more complicated neighborhoods • generally do not introduce any significant effect • Synchronous and asynchronous CA • Sequential update • Parallel update • In general, asynchronously updated CA produce simpler results • Combination of CA with differential equations (classical modeling)
Urban Cellular Automata • There were a few publications about CA in geography in the 1970s but they were mainly disregarded • CA matured as a research tool toward the end of the 1980s • Transition began with raster models that did not account for neighborhood relationships
Raster but not CA • Raster models possess all characteristics features • Use of cellular space • Cells characterized by state • Models are dynamic • BUT: They lack dependence of cell state on states of neighboring cells • Examples • Simulation of urban development in Greensboro, North Carolina • Buffalo metropolitan area • Harvard School of Design’s Boston model
Beginning of Urban CA • Waldo Tobler (1979) took the last step from raster models to urban CA simulation by introducing a linear transition function • Was not accepted by geographic community at first • Helen Couclelis (1985) recalled Tobler’s work • CA modeling got accepted by the geographic research community at the end of the 1980s many conceptual papers
Constrained CA • Extension of original CA idea • Introduced in 1993 by White and Engelen (“Constrained CA model of land-use dynamics”) • Mainstream CA application in geography during the 1990s • Expansion of the standard neighborhoods to 113 cells • Uses the potential of transition • Three steps • Potentials of transition estimated for each cell • Obtained potential sorted decreasingly for each cell • Externally defined amount of land distributed over cells with highest potential
Fuzzy CA models • Integration of fuzzy set theory • Based on continuous class membership functions • Transition rules describe laws for updating characteristics based on membership functions
Conclusions • CA have been around since 1950 • Geography was hesitant to adopt CA as an urban modeling technique (didn’t happen before the mid-1980s • Since then, many extensions of CA have been proposed, some effective, others not • Nowadays CA are a valuable tool for spatially distributed modeling with many applications (urban growth, wildfire spread, transportation)
