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Date: 2014-04-24 23:01:07 Philosophy of mathematics Leonhard Euler Ring Mathematical analysis Diophantus Geometry of numbers Convex geometry Mathematics Number theorists Number theory		This is page 268 Printer: Opaque this Add to Reading List Source URL: www.math.nmsu.edu Download Document from Source Website File Size: 122,00 KB Share Document on Facebook

	A proof of Minkowski’s second theorem Matthew Tointon Minkowski’s second theorem is a fundamental result from the geometry of numbers with important applications in additive combinatorics (see, for example, its appli DocID: 1xVE5 - View Document
	REVIEW OF ANALYTIC GEOMETRY The points in a plane can be identified with ordered pairs of real numbers. We start by drawing two perpendicular coordinate lines that intersect at the origin O on each line. Usually one line DocID: 1tNPq - View Document
	REVIEW OF ANALYTIC GEOMETRY The points in a plane can be identified with ordered pairs of real numbers. We start by drawing two perpendicular coordinate lines that intersect at the origin O on each line. Usually one line DocID: 1tMz2 - View Document
	REVIEW OF ANALYTIC GEOMETRY The points in a plane can be identified with ordered pairs of real numbers. We start by drawing two perpendicular coordinate lines that intersect at the origin O on each line. Usually one line DocID: 1tLoX - View Document
	REVIEW OF ANALYTIC GEOMETRY The points in a plane can be identified with ordered pairs of real numbers. We start by drawing two perpendicular coordinate lines that intersect at the origin O on each line. Usually one line DocID: 1tL7F - View Document