Fractal approach to two-dimensional and three-dimensional surface roughness

Fractal approach to two-dimensional and three-dimensional surface roughness

Our aim is to show that a fractal number D can be associated with any profile or cartography. Its interest lies in the fact that it conveys in a most concise form all the basic information otherwise provided by numerous parameters or criteria. Our approach, based on Mandelbrot's work, consists...

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Veröffentlicht in:Wear 1986-05, Vol.109 (1), p.119-126
Hauptverfasser: Gagnepain, J.J., Roques-Carmes, C.
Format: Artikel
Sprache:eng
Schlagworte:
Analysing. Testing. Standards
Applied sciences
Cross-disciplinary physics: materials science
rheology
Exact sciences and technology
Industrial metrology. Testing
Materials science
Measurement of surface state
Mechanical engineering. Machine design
Metals, semimetals and alloys
Metals. Metallurgy
metrology
Nondestructive testing
Physics
Specific materials
surface measurement
surface roughness
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Beschreibung
Zusammenfassung:Our aim is to show that a fractal number D can be associated with any profile or cartography. Its interest lies in the fact that it conveys in a most concise form all the basic information otherwise provided by numerous parameters or criteria. Our approach, based on Mandelbrot's work, consists in processing a z( x) profile as would be done with a random motion x( t). An original approach, the “reticular cell counting” method, has been successfully applied to simulated or sampled surfaces.
ISSN:0043-1648
1873-2577
DOI:10.1016/0043-1648(86)90257-7