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Does anyone know a good book about lattices (as subgroups of a vector space $V$)?

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    In what context and for what purpose?2012-06-30
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    substantially an introduction to this interesting argument.2012-06-30
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    To what interesting argument?2012-06-30
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    The interesting argument is "Lattices" (I'm sorry for my unclear and stupid comment). I know that lattices are closely related to "solid geometry" and I'm courious.2012-06-30

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These notes of mine on geometry of numbers begin with a section on lattices in Euclidean space. However they are a work in progress and certainly not yet fully satisfactory. Of the references I myself have been consulting for this material, the one I have found most helpful with regard to basic material on lattices is C.L. Siegel's Lectures on the Geometry of Numbers.

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Check the following:

Roman,Steven: "Lattices and Ordered Sets", Springer

Blyth, T.S.: "Lattices and Ordered Algebraic Structures" , Springer

Roggenkamp, Klaus - Huber-Dyson, Verena : "Lattices over Orders" , Springer

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    these are books about lattices in this sense: http://en.wikipedia.org/wiki/Lattice_(order) . I need a book about: http://en.wikipedia.org/wiki/Lattice_(group)2012-07-04
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    DonAntonio, perhaps you could move your answer to [this question](http://math.stackexchange.com/questions/180578/introductory-text-for-lattice-theory), which is about this kind of lattices.2012-08-09