. . . . . . "In this volume very simplified models are introduced to understand the random sequential packing models mathematically. The 1-dimensional model is sometimes called the Parking Problem, which is known by the pioneering works by Flory (1939), Renyi (1958), Dvoretzky and Robbins (1962). To obtain a 1-dimensional packing density, distribution of the minimum of gaps, etc., the classical analysis has to be studied. The packing density of the general multi-dimensional random sequential packing of cubes (hypercubes) makes a well-known unsolved problem. The experimental analysis is usually applied to ..."@en . . . . . . . . . . . . . . . . . "Random sequential packing of cubes" . "Random sequential packing of cubes"@en . . "Electronic books" . "Electronic books"@en . . . . . "In this volume very simplified models are introduced to understand the random sequential packing models mathematically. The 1-dimensional model is sometimes called the Parking Problem, which is known by the pioneering works by Flory (1939), Renyi (1958), Dvoretzky and Robbins (1962). To obtain a 1-dimensional packing density, distribution of the minimum of gaps, etc., the classical analysis has to be studied. The packing density of the general multi-dimensional random sequential packing of cubes (hypercubes) makes a well-known unsolved problem. The experimental analysis is usually applied to the problem. This book introduces simplified multi-dimensional models of cubes and torus, which keep the character of the original general model, and introduces a combinatorial analysis for combinatorial modelings."@en . . . . . . . "Livres électroniques" . . . . . . . . . . "Packung." . . "Pakking (natuurwetenschappen)" . . "Parkeren." . . . . "Algebraïsche topologie." . . "MATHEMATICS Combinatorics." . . "Bol." . . "Würfel." . . "Mathematics." . . "Empilements de sphères." . . "Anàlisi combinatòria." . . "Random variabelen." . . "Sequentiële analyse (statistiek)" . . "Packungsproblem." . . "Kubische vormen." . . "Sequentielle Optimierung." . .