Pencils of Cubics and Algebraic Curves in the Real Projective Plane
Author | : Séverine Fiedler - Le Touzé |
Publisher | : CRC Press |
Total Pages | : 257 |
Release | : 2018-12-07 |
ISBN-10 | : 9780429838255 |
ISBN-13 | : 0429838255 |
Rating | : 4/5 (255 Downloads) |
Download or read book Pencils of Cubics and Algebraic Curves in the Real Projective Plane written by Séverine Fiedler - Le Touzé and published by CRC Press. This book was released on 2018-12-07 with total page 257 pages. Available in PDF, EPUB and Kindle. Book excerpt: Pencils of Cubics and Algebraic Curves in the Real Projective Plane thoroughly examines the combinatorial configurations of n generic points in RP2. Especially how it is the data describing the mutual position of each point with respect to lines and conics passing through others. The first section in this book answers questions such as, can one count the combinatorial configurations up to the action of the symmetric group? How are they pairwise connected via almost generic configurations? These questions are addressed using rational cubics and pencils of cubics for n = 6 and 7. The book’s second section deals with configurations of eight points in the convex position. Both the combinatorial configurations and combinatorial pencils are classified up to the action of the dihedral group D8. Finally, the third section contains plentiful applications and results around Hilbert’s sixteenth problem. The author meticulously wrote this book based upon years of research devoted to the topic. The book is particularly useful for researchers and graduate students interested in topology, algebraic geometry and combinatorics. Features: Examines how the shape of pencils depends on the corresponding configurations of points Includes topology of real algebraic curves Contains numerous applications and results around Hilbert’s sixteenth problem About the Author: Séverine Fiedler-le Touzé has published several papers on this topic and has been invited to present at many conferences. She holds a Ph.D. from University Rennes1 and was a post-doc at the Mathematical Sciences Research Institute in Berkeley, California.