Posted by **Underaglassmoon** at Nov. 18, 2017

Cambridge | English | Sep 2017 | ISBN-10: 1107167485 | 682 pages | PDF | 7.97 mb

by J. S. Milne (Author)

Posted by **nebulae** at Sept. 11, 2017

English | ISBN: 1470414945 | 2016 | 100 pages | PDF | 1 MB

Posted by **nebulae** at Sept. 11, 2017

English | ISBN: 147041046X | 2015 | 122 pages | PDF | 1 MB

Posted by **AvaxGenius** at July 23, 2017

English | PDF | 2013 | 125 Pages | ISBN : 9380250460 | 9.24 MB

The theory of algebraic groups has chiefly been developed along two distinct directions: linear (or, equivalently, affine) algebraic groups, and abelian varieties (complete, connected algebraic groups). This is made possible by a fundamental theorem of Chevalley: any con- nected algebraic group over an algebraically closed field is an ex- tension of an abelian variety by a connected linear algebraic group, and these are unique.

Posted by **Rare-1** at Nov. 29, 2016

English | ISBN: 019967616X | 2013 | PDF | 320 pages | 2.18 MB

Posted by **roxul** at July 29, 2016

English | 1988 | ISBN: 0521358094 | 184 pages | PDF | 1,4 MB

Posted by **interes** at Nov. 16, 2014

English | 2014 | ISBN: 1493909371 | 354 pages | PDF | 4,5 MB

This book contains a collection of fifteen articles and is dedicated to the sixtieth birthdays of Lex Renner and Mohan Putcha, the pioneers of the field of algebraic monoids.

Posted by **nebulae** at Dec. 25, 2013

English | 1988 | ISBN: 0521358094 | 184 pages | PDF | 1,4 MB

Posted by **step778** at April 19, 2018

2008 | pages: 194 | ISBN: 0415471842 | PDF | 1,6 mb

Posted by **AvaxGenius** at April 13, 2018

This is a unified treatment of the various algebraic approaches to geometric spaces. The study of algebraic curves in the complex projective plane is the natural link between linear geometry at an undergraduate level and algebraic geometry at a graduate level, and it is also an important topic in geometric applications, such as cryptography.380 years ago, the work of Fermat and Descartes led us to study geometric problems using coordinates and equations. Today, this is the most popular way of handling geometrical problems. Linear algebra provides an efficient tool for studying all the first degree (lines, planes) and second degree (ellipses, hyperboloids) geometric figures, in the affine, the Euclidean, the Hermitian and the projective contexts.