Hack’s law is reviewed, emphasizing its implications for the elongation of river basins as well as its connections with their fractal characteristics. The relation between Hack’s law and the internal structure of river basins is investigated experimentally through digital elevation models. It is found that Hack’s exponent, elongation, and some relevant fractal characters are closely related. The self-affine character of basin boundaries is shown to be connected to the power law decay of the probability of total contributing areas at any link and to Hack’s law. An explanation for Hack’s law is derived from scaling arguments. From the results we suggest that a statistical framework referring to the scaling invariance of the entire basin struc...
Two distinct models for self-similar and self-affine river basins are numerically investigated. They...
Prepared under the support of the National Science Foundation ECE-8513556. Prepared under the suppor...
The upper Cheat River network departs from scaling laws describing a large number of river networks...
Hack’s law is reviewed, emphasizing its implications for the elongation of river basins as well as i...
Seemingly unrelated empirical hydrologic laws and several experimental facts related to the fractal ...
Seemingly unrelated empirical hydrologic laws and several experimental facts related to the fractal ...
International audienceSince the 1950s river networks have been intensely researched in geosciences a...
Hack's law was originally derived from basin statistics for varied spatial scales and regions. The e...
Percolation theory can be used to find water flow paths of least resistance. Application of percolat...
The existence of solutions describing the turbulent flow in rivers is proven. The existence of an a...
This article is the rst in a series of three papers investigating the detailed geometry of river net...
This work examines patterns of regularity and scale in landform and channel networks. Digital elevat...
It has long been recognized that catchment geomorphology relationships can be used as predictors of ...
This article is the first in a series of three papers investigating the detailed geometry of river n...
Two distinct models for self-similar and self-affine river basins are numerically investigated. They...
Two distinct models for self-similar and self-affine river basins are numerically investigated. They...
Prepared under the support of the National Science Foundation ECE-8513556. Prepared under the suppor...
The upper Cheat River network departs from scaling laws describing a large number of river networks...
Hack’s law is reviewed, emphasizing its implications for the elongation of river basins as well as i...
Seemingly unrelated empirical hydrologic laws and several experimental facts related to the fractal ...
Seemingly unrelated empirical hydrologic laws and several experimental facts related to the fractal ...
International audienceSince the 1950s river networks have been intensely researched in geosciences a...
Hack's law was originally derived from basin statistics for varied spatial scales and regions. The e...
Percolation theory can be used to find water flow paths of least resistance. Application of percolat...
The existence of solutions describing the turbulent flow in rivers is proven. The existence of an a...
This article is the rst in a series of three papers investigating the detailed geometry of river net...
This work examines patterns of regularity and scale in landform and channel networks. Digital elevat...
It has long been recognized that catchment geomorphology relationships can be used as predictors of ...
This article is the first in a series of three papers investigating the detailed geometry of river n...
Two distinct models for self-similar and self-affine river basins are numerically investigated. They...
Two distinct models for self-similar and self-affine river basins are numerically investigated. They...
Prepared under the support of the National Science Foundation ECE-8513556. Prepared under the suppor...
The upper Cheat River network departs from scaling laws describing a large number of river networks...