An alternative approach to Freiman’s theorem in p-groups Matthew C. H. Tointon∗ Department of Pure Mathematics and Mathematical Statistics, Centre for Mathematical Sciences, University of Cambridge, Wilberforce Road,

First Page		Document Content
Date: 2017-05-18 16:55:58 Lie groups Mathematics Algebra Abstract algebra Nilpotent group Approximate group Lie algebra Exponential map BakerCampbellHausdorff formula Quotient group		An alternative approach to Freiman’s theorem in p-groups Matthew C. H. Tointon∗ Department of Pure Mathematics and Mathematical Statistics, Centre for Mathematical Sciences, University of Cambridge, Wilberforce Road, Add to Reading List Source URL: tointon.neocities.org Download Document from Source Website File Size: 317,16 KB Share Document on Facebook

	(Running time 1hr+) all times are approximate. It may be appropriate for your group to spread this plan over a couple of lessons/ spend longer on items/ set a task as homework etc Appropriate for Primary YearS DocID: 1vmg2 - View Document
	(Running time 1hr+) all times are approximate. It may be appropriate for your group to spread this plan over a couple of lessons/ spend longer on items/ set a task as homework etc Appropriate for Upper Primary/ Year 5 DocID: 1ue8K - View Document
	(Running time 1hr+) all times are approximate. It may be appropriate for your group to spread this plan over a couple of lessons/ spend longer on items/ set a task as homework etc Appropriate for Secondary Years 7-11 DocID: 1ub6w - View Document
	SEMINAR NOTES on Hrushovski’s Stable group theory and approximate subgroups [3] Fall 2009, by Lou van den Dries, University of Illinois at Urbana-Champaign. For motivational background we first read two other papers: E DocID: 1tcJm - View Document
	1. Metrically approximate subgroups Let G be a group with a metric d invariant under left and right translations. A (K, r)-approximate subgroup is a subset X of G containing 1, such that the product set XX is covered by DocID: 1rBtK - View Document

	(Running time 1hr+) all times are approximate. It may be appropriate for your group to spread this plan over a couple of lessons/ spend longer on items/ set a task as homework etc Appropriate for Primary YearS DocID: 1vmg2 - View Document
	(Running time 1hr+) all times are approximate. It may be appropriate for your group to spread this plan over a couple of lessons/ spend longer on items/ set a task as homework etc Appropriate for Upper Primary/ Year 5 DocID: 1ue8K - View Document
	(Running time 1hr+) all times are approximate. It may be appropriate for your group to spread this plan over a couple of lessons/ spend longer on items/ set a task as homework etc Appropriate for Secondary Years 7-11 DocID: 1ub6w - View Document
	SEMINAR NOTES on Hrushovski’s Stable group theory and approximate subgroups [3] Fall 2009, by Lou van den Dries, University of Illinois at Urbana-Champaign. For motivational background we first read two other papers: E DocID: 1tcJm - View Document
	1. Metrically approximate subgroups Let G be a group with a metric d invariant under left and right translations. A (K, r)-approximate subgroup is a subset X of G containing 1, such that the product set XX is covered by DocID: 1rBtK - View Document