Bailey, M.J. (1959). A note on the economics of residential zoning and urban renewal. Land Economics, Vol. 35: 288-292.
2.
Crank, J. (1974). Chemical and biological problems. In J. R. Ockendon and E. A. Hodgkins, Moving Boundary Problems in Heat Flow and Diffusion , pp. 62-70. Oxford: Oxford University Press.
3.
Eggleston, P.P. (1974). Astrophysical problems: a moving boundary problem in the study of stellar interiors. In J. R. Ockendon and E. A. Hodgkins, Moving Boundary Problems in Heat Flow and Diffusion, pp. 103-111. Oxford : Oxford University Press.
4.
Hoyt, H. (1939). Structure and Growth of Residential Neighborhoods . Washington, D.C.: Federal Housing Administration.
5.
Loury, G.C. (1978). The minimum border length hypothesis does not explain the shape of black ghettos. Journal of Urban Economics , Vol. 5: 147-153.
6.
Mills, E.S. (1967). An aggregative model of resource allocation in a metropolitan area. American Economic Review, Vol. 57: 197-210.
7.
Rose-Ackerman, S. (1975). Racism and urban structure. Journal of Urban Economics, Vol. 2: 85-103.
8.
Smolensky, E., Becker, S. and Molotch, H. (1968). The prisoner's dilemma and ghetto expansion. Land Economics, Vol. 44: 420.
9.
Stefan, J. (1891). Uber die Theorie der Eisbildung im Polarmeere . Annals of Physics and Chemistrie, 269-281.
10.
Turcotte, D.L. (1974). Geophysical problems with moving phase change boundaries and heat flow. In J. R. Ockendon and E. A. Hodgkins, Moving Boundary Problems in Heat Flow and Diffusion, pp. 91-120. Oxford : Oxford University Press.
11.
Van Moerbeke, P. (1974). An optimal stopping problem with linear reward . Acta Mathematica, Vol. 132, 111-151.
12.
von Thünen, J.H. (1826). Der Isolierte Staat in Bieziehung auf Landwirtschaft und Nationalekonomie. Hamburg: Perthes.
13.
Yinger, J. (1976). A note on the length of the Black-White border . Journal of Urban Economics, Vol. 3: 370-382.
