Talk:Enriques–Kodaira classification

The section on surfaces of Kodaira dimension 1 seems to suggest that an elliptic surface is of Kodaira dimension 1 if and only if the genus of the base curve is at least 2. I think this is false. Also this part of the article could be clearer on the question of existence or nonexistence of sections. (Elliptic curves are genus 1 curves equipped with a point.) Would someone like to try fixing this? FactSpewer (talk) 18:55, 16 January 2009 (UTC)

"Igusa that they may be equal but still exceed the irregularity defined as the dimension of the Picard variety." 198.129.65.227 (talk) 01:47, 24 February 2009 (UTC)

"Enriques surfaces are all algebraic (and therefore Kähler)" confuses me because algebraic does not require projective

and does not imply Kahler.

67.71.1.139 (talk) 03:11, 25 February 2012 (UTC)

: For surfaces, Moishezon implies Kahler (Buchsdahl-Lamari theorem), and algebraic obviously implies Moishezon. Tiphareth (talk) 09:37, 25 February 2012 (UTC)