arXiv:1305.2482 Abstract | arXiv Analytics

arXiv:1305.2482 [math.AG]Abstract References Reviews Resources

On the genus of birational maps between 3-folds

Published 2013-05-11, updated 2013-12-20Version 2

In this note we present two equivalent definitions for the genus of a birational map X --> Y between smooth complex projective 3-folds. The first one is the definition introduced in 1973 by M. A. Frumkin, the second one was recently suggested to me by S. Cantat. By focusing first on proving that these two definitions are equivalent, one can obtain all the results of the paper of Frumkin in a much shorter way. In particular, the genus of an automorphism of $\mathbb{C}^3$, view as a birational self-map of the projective space, will easily be proved to be 0.

Comments: A few minor corrections

Categories: math.AG

Keywords: birational map, birational self-map, equivalent definitions, shorter way, smooth complex projective

Related articles: Most relevant | Search more

arXiv:math/9904135 [math.AG] (Published 1999-04-23, updated 2000-05-31)

Torification and Factorization of Birational Maps

Dan Abramovich, Kalle Karu, Kenji Matsuki, Jarosław Włodarczyk

arXiv:1109.6810 [math.AG] (Published 2011-09-30, updated 2012-06-07)

Degree growth of birational maps of the plane

Jérémy Blanc, Julie Déserti

arXiv:2403.10074 [math.AG] (Published 2024-03-15)

Birational maps to Grassmannians, representations and poset polytopes