pt. I. Introductory material -- 1. Chow varieties, the Euler-Chow series and the total coordinating ring / E. Javier Elizondo -- 2. Introduction to Lawson homology / Chris Peters and Siegmund Kosarew -- pt. II. Lawson (co)homology -- 3. Topological properties of the algebraic cycles functor / Paulo Limo-Filho -- pt. III. Motives and motivic cohomology -- 4. Lectures on motives / Jacob P. Murre -- 5. A short introduction to higher Chow groups / Philippe Elbaz-Vincent -- pt. IV. Hodge theoretic invariants of cycles -- 6. Three lectures on the Hodge conjecture / James D. Lewis -- 7. Lectures on Nori's connectivity theorem / J. Nagel -- 8. Beilinson's Hodge and Tate conjectures / Shuji Saito
Summary
Lecture notes for graduates or researchers wishing to enter this modern field of research
Notes
Title from publishers bibliographic system (viewed 22 Dec 2011)