All listings for this product
About this product
- DescriptionThe theory of motives was created by Grothendieck in the 1960s as he searched for a universal cohomology theory for algebraic varieties. The theory of pure motives is well established as far as the construction is concerned. Pure motives are expected to have a number of additional properties predicted by Grothendieck's standard conjectures, but these conjectures remain wide open. The theory for mixed motives is still incomplete. This book deals primarily with the theory of pure motives. The exposition begins with the fundamentals: Grothendieck's construction of the category of pure motives and examples. Next, the standard conjectures and the famous theorem of Jannsen on the category of the numerical motives are discussed. Following this, the important theory of finite dimensionality is covered. The concept of Chow-Kunneth decomposition is introduced, with discussion of the kwn results and the related conjectures, in particular the conjectures of Bloch-Beilinson type. We finish with a chapter on relative motives and a chapter giving a short introduction to Voevodsky's theory of mixed motives.
- Author BiographyJacob P. Murre, Universiteit Leiden, The Netherlands Jan Nagel, Universite de Bourgogne, Dijon Cedex, France Chris A. M. Peters, Universite Grenoble I, St. Martin d'Heres, France
- Author(s)Chris A. M. Peters,Jacob P Murre,Jacob P. Murre,Jan Nagel
- PublisherAmerican Mathematical Society
- Date of Publication30/05/2013
- Series TitleUniversity Lecture Series
- Series Part/Volume Number61
- Place of PublicationProvidence
- Country of PublicationUnited States
- ImprintAmerican Mathematical Society
- Content NoteIllustrations
Best-selling in Textbooks
Save on Textbooks
- AU $72.90Trending at AU $74.37
- AU $35.06Trending at AU $40.71
- AU $74.90Trending at AU $79.35
- AU $18.96Trending at AU $24.44
- AU $30.00Trending at AU $49.03
- AU $16.98Trending at AU $18.30
- AU $51.96Trending at AU $53.08
This item doesn't belong on this page.
Thanks, we'll look into this.