A Note on Fractal Channel Networks

This paper studies the relation between the structure of river networks and the features of their geomorphologic hydrologic response. A mathematical formulation of connectivity of a drainage network is proposed to relate contributing areas and the network geometry. In view of the connectivity conjecture, Horton's bifurcation ratio R(B) tends, for high values of Strahler's order OMEGA of the basin, to the area ratio R(A), and Horton's length ratio R(L) equals, in the limit, the single-order contributing area ratio R(a). The relevance of these arguments is examined by reference to data from real basins. Well-known empirical results from the geomorphological literature (Melton's law, Hack's relation, Moon's conjecture) are viewed as a consequence of connectivity. It is found that in Hortonian networks the time evolution of contributing areas exhibits a multifractal behavior generated by a multiplicative process of parameter 1/R(B). The application of the method of the most probable distribution in view of connectivity contributes new inroads toward a general formulation of the geomorphologic unit hydrograph, in particular generalizing its width function formulation. A quantitative example of multifractal hydrologic response of idealized networks based on Peano's construct (for which R(B) = R(A) = 4, R(L) = 2) closes the paper.

[1]  D. Gray,et al.  Interrelationships of watershed characteristics , 1961 .

[2]  Michael R. Karlinger,et al.  Unit hydrograph approximations assuming linear flow through topologically random channel networks , 1985 .

[3]  I. Rodríguez‐Iturbe,et al.  Comment on “On the fractal dimension of stream networks” by Paolo La Barbera and Renzo Rosso , 1990 .

[4]  Michael R. Karlinger,et al.  On the expected width function for topologically random channel networks , 1984 .

[5]  J. Lienhard A statistical mechanical prediction of the dimensionless unit hydrograph , 1964 .

[6]  Edward C. Waymire On the main channel length‐magnitude formula for random networks: A solution to Moon's conjecture , 1989 .

[7]  I. Rodríguez‐Iturbe,et al.  The fractal nature of river networks , 1988 .

[8]  R. Rosso,et al.  On the fractal dimension of stream networks , 1989 .

[9]  A. Roy,et al.  On the fractal interpretation of the mainstream length‐drainage area relationship , 1990 .

[10]  Alessandro Marani,et al.  On Mass Response Functions , 1989 .

[11]  J. T. Hack Studies of longitudinal stream profiles in Virginia and Maryland , 1957 .

[12]  R. Rosso Nash Model Relation to Horton Order Ratios , 1984 .

[13]  V. Gupta,et al.  On the formulation of an analytical approach to hydrologic response and similarity at the basin scale , 1983 .

[14]  David G. Tarboton,et al.  Comment on "On the fractal dimension of stream networks" , 1990 .

[15]  R. L. Shreve Statistical Law of Stream Numbers , 1966, The Journal of Geology.

[16]  Mj Boyd,et al.  A Storage-Routing Model Relating Drainage Basin Hydrology and Geomorphology , 1978 .

[17]  A. D. Abrahams Channel Networks: A Geomorphological Perspective , 1984 .

[18]  Tamás F. Móri,et al.  A note on the background of several Bonferroni−Galambos-type inequalities , 1985 .

[19]  C. T. Wang,et al.  A representation of an instantaneous unit hydrograph from geomorphology , 1980 .

[20]  Jerry E. Mueller Re-evaluation of the Relationship of Master Streams and Drainage Basins , 1972 .

[21]  Ignacio Rodriguez-Iturbe,et al.  On Scales, Gravity and Network Structure in Basin Runoff , 1986 .

[22]  I. Rodríguez‐Iturbe,et al.  The geomorphologic structure of hydrologic response , 1979 .

[23]  Oscar J. Mesa,et al.  On the main channel length‐area relationship for channel networks , 1987 .

[24]  Allen T. Hjelmfelt,et al.  FRACTALS AND THE RIVER-LENGTH CATCHMENT-AREA RATIO , 1988 .

[25]  Keith Beven,et al.  Catchment geomorphology and the dynamics of runoff contributing areas , 1983 .

[26]  Reply [to “Comment on ‘On the fractal dimension of stream networks’ by Paolo La Barbera and Renzo Rosso”] , 1990 .

[27]  John H. Lienhard,et al.  A physical basis for the generalized gamma distribution , 1967 .

[28]  Oscar J. Mesa,et al.  Runoff generation and hydrologic response via channel network geomorphology — Recent progress and open problems , 1988 .

[29]  Ignacio Rodriguez-Iturbe,et al.  Geomorphoclimatic estimation of extreme flow probabilities , 1983 .

[30]  Renzo Rosso,et al.  Fractal relation of mainstream length to catchment area in river networks , 1991 .

[31]  W. Langbein,et al.  Topographic characteristics of drainage basins , 1947 .