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Theory of Symmetric Lattices [Paperback]

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  • Category: Books (Mathematics)
  • Author:  Maeda, Fumitomo, Maeda, Shuichiro
  • Author:  Maeda, Fumitomo, Maeda, Shuichiro
  • ISBN-10:  3642462502
  • ISBN-10:  3642462502
  • ISBN-13:  9783642462504
  • ISBN-13:  9783642462504
  • Publisher:  Springer
  • Publisher:  Springer
  • Binding:  Paperback
  • Binding:  Paperback
  • Pub Date:  01-Feb-2012
  • Pub Date:  01-Feb-2012
  • SKU:  3642462502-11-SPRI
  • SKU:  3642462502-11-SPRI
  • Item ID: 100925712
  • List Price: $54.99
  • Seller: ShopSpell
  • Ships in: 5 business days
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  • Delivery by: Jul 14 to Jul 16
  • Notes: Brand New Book. Order Now.
Of central importance in this book is the concept of modularity in lattices. A lattice is said to be modular if every pair of its elements is a modular pair. The properties of modular lattices have been carefully investigated by numerous mathematicians, including 1. von Neumann who introduced the important study of continuous geometry. Continu? ous geometry is a generalization of projective geometry; the latter is atomistic and discrete dimensional while the former may include a continuous dimensional part. Meanwhile there are many non-modular lattices. Among these there exist some lattices wherein modularity is symmetric, that is, if a pair (a,b) is modular then so is (b,a). These lattices are said to be M-sym? metric, and their study forms an extension of the theory of modular lattices. An important example of an M-symmetric lattice arises from affine geometry. Here the lattice of affine sets is upper continuous, atomistic, and has the covering property. Such a lattice, called a matroid lattice, can be shown to be M-symmetric. We have a deep theory of parallelism in an affine matroid lattice, a special kind of matroid lattice. Further? more we can show that this lattice has a modular extension.Of central importance in this book is the concept of modularity in lattices. A lattice is said to be modular if every pair of its elements is a modular pair. The properties of modular lattices have been carefully investigated by numerous mathematicians, including 1. von Neumann who introduced the important study of continuous geometry. Continu? ous geometry is a generalization of projective geometry; the latter is atomistic and discrete dimensional while the former may include a continuous dimensional part. Meanwhile there are many non-modular lattices. Among these there exist some lattices wherein modularity is symmetric, that is, if a pair (a,b) is modular then so is (b,a). These lattices are said to be M-sym? metric, and their study forms an extension of the theory of modlsC
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