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[Texts]## 11H: Geometry of numbers |

- 11H06: Lattices and convex bodies [See also 11P21, 52C05, 52C07]
- 11H16: Nonconvex bodies
- 11H31: Lattice packing and covering [See also 05B40, 52C15, 52C17]
- 11H46: Products of linear forms
- 11H50: Minima of forms
- 11H55: Quadratic forms (reduction theory, extreme forms, etc.)
- 11H56: Automorphism groups of lattices
- 11H60: Mean value and transfer theorems
- 11H71: Relations with coding theory [new in 2000]
- 11H99: None of the above, but in this section

Parent field: 11: Number Theory

Browse all (old) classifications for this area at the AMS.

Hlawka, Edmund; Schoissengeier, Johannes; Taschner, Rudolf: "Geometric and analytic number theory", Springer-Verlag, Berlin, 1991. 238 pp. ISBN 3-540-52016-3

- Best statement about semiaxes of an ellipse to guarantee that it contains a lattice point?
- If there are disks of radius r at the lattice points in the plane, how far can you see from the origin?

Last modified 2000/01/14 by Dave Rusin. Mail: