LEADER 05188nam 2200649Ia 450 001 9910876697703321 005 20200520144314.0 010 $a1-281-75882-5 010 $a9786611758820 010 $a3-527-61599-7 010 $a3-527-61598-9 035 $a(CKB)1000000000377535 035 $a(EBL)482102 035 $a(OCoLC)654228497 035 $a(SSID)ssj0000232548 035 $a(PQKBManifestationID)11220666 035 $a(PQKBTitleCode)TC0000232548 035 $a(PQKBWorkID)10213994 035 $a(PQKB)11606100 035 $a(MiAaPQ)EBC482102 035 $a(PPN)140369775 035 $a(EXLCZ)991000000000377535 100 $a19940315d1994 uy 0 101 0 $aeng 135 $aur|n|---||||| 181 $ctxt 182 $cc 183 $acr 200 12$aA random walk through fractal dimensions /$fBrian H. Kaye 205 $a2nd ed. 210 $aNew York $cVCH$d1994 215 $a1 online resource (455 p.) 300 $aDescription based upon print version of record. 311 $a3-527-29078-8 320 $aIncludes bibliographical references (p. [411]-415) and indexes. 327 $aA Random Walk Through Fractal Dimensions; Contents; Word Finder; Coloured Plates; 1 A Starting Point for the Randomwalk; References; 2 Fractal Description of Fineparticle Boundaries; 2.1 The Fractal Dimensions of a Famous Carbonblack Profile; 2.2 The Dangerous Art of Extrapolation for Predicting Physical Phenomena; 2.3 Discovering Texture Fractals; 2.4 Experimental Methods for Characterizing Fineparticle Boundaries; References; 3 What Use are Fractals?; 3.1 Elegance and Utility of Fractal Dimensions; 3.2 Fractal Description of Powder Metal Grains and Special Metal Crystals 327 $a3.3 Fractals and the Flow of Dry Powders3.4 Fractals in the Mining Industry; 3.5 Fractal Structure of Cosmic Fineparticles; 3.6 Fractal Structure of Some Types of Sand Grains; 3.7 Fractal Structure of Some Respirable Dusts; 3.7.1 What is the Technical Meaning of Respirable Dust?; 3.7.2 Is Fumed Silica a Respirable Hazard?; 3.7.3 Dust from Nuclear Reactor Systems; 3.7.4 Fuse Fumes and Welding Dust; 3.7.5 Characteristics of Dust Generated by Explosions; 3.7.6 Diesel Soot and Fumed Pigments; 3.7.7 Fractal Specimens of Flyash; 3.8 Polymer Grains and Rubber Crumbs; 3.9 Fineparticle Look-Alikes 327 $aReferences4 Delinquent Coins and Staggering Drunks; 4.1 A Capricious Selection of Terms that Describe Random Events; 4.2 Chance, Probability and Error; 4.3 Monte Carlo Technique for Studying Stochastic Processes; 4.4 Randomwalks in One-Dimensional Space; 4.5 Delinquent Coins and Cantorian Dusts; 4.6 The Devil's Staircase and Crystal Structure; 4.7 Pin-ball Machines and Some Random Thoughts on the Philosophical Significance of Fractal Dimensions; 4.8 Plumes with Fractal Boundaries; 4.9 Gaussian Graph Paper, Fractal Distributions and Elephants in the Face Powder; References 327 $a5 Fractal Systems Generated by Randomwalks in Two-Dimensional Space5.1 Randomwalks on a Rectangular Lattice in Two-Dimensional Space; 5.2 The Use of Polar Co-ordinates to Describe Random Progress in Two-Dimensional Space; 5.3 Randomwalk Modelling of Fractal Deposits in Two-Dimensional Space; 5.4 Pigmented Coatings and Percolating Systems; 5.5 Mathematical Description of Fractal Clusters; 5.6 Percolating Pathways and Scaling Properties; 5.7 The Fractal Structure of Clusters Generated by Diffusion-Limited Aggregation (DLA); References 327 $a6 Vanishing Carpets, Fractal Felts and Dendritic Capture Trees6.1 Sierpinski Carpets and Swiss Cheese; 6.2 A Fractal Description of the Deposition Efficiency of Simulated Pesticide Spray Systems; 6.3 Sierpinski Fractal Description of Real Dispersed Systems; 6.4 Exploring the Fractal Structures of Filters; 6.5 Dendritic Capture Trees in Filter Systems; 6.6 Cantor on the Rocks; References; 7 An Exploration of the Physical Significance of Fractal Structures in Three-Dimensional Space; 7. I Randomwalk Theory of Powder Mixing in Three- and Four-Dimensional Space 327 $a7.2 Fractal Geometry and Aerosol Physics 330 $aFractal geometry is revolutionizing the descriptive mathematics of applied materials systems. Rather than presenting a mathematical treatise, Brian Kaye demonstrates the power of fractal geometry in describing materials ranging from Swiss cheese to pyrolytic graphite. Written from a practical point of view, the author assiduously avoids the use of equations while introducing the reader to numerous interesting and challenging problems in subject areas ranging from geography to fine particle science. The second edition of this successful book provides up-to-date literature coverage of the use of 606 $aFractals 606 $aGeometry, Algebraic 615 0$aFractals. 615 0$aGeometry, Algebraic. 676 $a514.74 676 $a515.73 676 $a516 700 $aKaye$b Brian H$g(Brian Howard),$f1932-$0295344 801 0$bMiAaPQ 801 1$bMiAaPQ 801 2$bMiAaPQ 906 $aBOOK 912 $a9910876697703321 996 $aA random walk through fractal dimensions$92171217 997 $aUNINA