11,831 research outputs found
Fractal dimension evolution and spatial replacement dynamics of urban growth
This paper presents a new perspective of looking at the relation between
fractals and chaos by means of cities. Especially, a principle of space filling
and spatial replacement is proposed to explain the fractal dimension of urban
form. The fractal dimension evolution of urban growth can be empirically
modeled with Boltzmann's equation. For the normalized data, Boltzmann's
equation is equivalent to the logistic function. The logistic equation can be
transformed into the well-known 1-dimensional logistic map, which is based on a
2-dimensional map suggesting spatial replacement dynamics of city development.
The 2-dimensional recurrence relations can be employed to generate the
nonlinear dynamical behaviors such as bifurcation and chaos. A discovery is
made that, for the fractal dimension growth following the logistic curve, the
normalized dimension value is the ratio of space filling. If the rate of
spatial replacement (urban growth) is too high, the periodic oscillations and
chaos will arise, and the city system will fall into disorder. The spatial
replacement dynamics can be extended to general replacement dynamics, and
bifurcation and chaos seem to be related with some kind of replacement process.Comment: 17 pages, 5 figures, 2 table
The classification of traveling wave solutions and superposition of multi-solutions to Camassa-Holm equation with dispersion
Under the traveling wave transformation, Camassa-Holm equation with
dispersion is reduced to an integrable ODE whose general solution can be
obtained using the trick of one-parameter group. Furthermore combining complete
discrimination system for polynomial, the classifications of all single
traveling wave solutions to the Camassa-Holm equation with dispersion is
obtained. In particular, an affine subspace structure in the set of the
solutions of the reduced ODE is obtained. More general, an implicit linear
structure in Camassa-Holm equation with dispersion is found. According to the
linear structure, we obtain the superposition of multi-solutions to
Camassa-Holm equation with dispersion
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