Abstract
We study the degree growth of iterates of meromorphic self-maps of compact Kähler surfaces. Using cohomology classes on the Riemann-Zariski space, we show that the degrees grow similarly to those of mappings that are algebraically stable on some bimeromorphic model
Citation
Sébastien Boucksom. Charles Favre. Mattias Jonsson. "Degree growth of meromorphic surface maps." Duke Math. J. 141 (3) 519 - 538, 15 February 2008. https://doi.org/10.1215/00127094-2007-004
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