Skip to main content
MathOverflow

Return to Question

Notice removed Draw attention by user164740
Bounty Ended with Dmitri Panov's answer chosen by CommunityBot
Notice added Draw attention by user164740
Bounty Started worth 350 reputation by CommunityBot
Notice removed Draw attention by CommunityBot
Bounty Ended with no winning answer by CommunityBot
Notice added Draw attention by user164740
Bounty Started worth 100 reputation by CommunityBot
edited tags
Link
user164740
user164740
added 62 characters in body; edited title
Source Link
user164740
user164740

fdspaof343rfg4to34-3 Non-4ot[lpgdsalgebraic Kähler threefolds with abelian $\pi_1$ of arbitrarily large rank

fadsopfpoir94lkfmklmfls=-raslr3Do there exist non-algebraic Kähler threefolds with abelian $\pi_1$ of arbitrarily large rank?

fdspaof343rfg4to34-3-4ot[lpgds

fadsopfpoir94lkfmklmfls=-raslr3-

Non-algebraic Kähler threefolds with abelian $\pi_1$ of arbitrarily large rank

Do there exist non-algebraic Kähler threefolds with abelian $\pi_1$ of arbitrarily large rank?

Post Undeleted by user164740
Post Deleted by user164740
Post Undeleted by user164740
Post Deleted by user164740
deleted 47 characters in body
Source Link
user164740
user164740

Complex surfaces with abelian $\pi_1$ of arbitrarily large rank fdspaof343rfg4to34-3-4ot[lpgds

Do there exist complex surfaces with abelian $\pi_1$ of arbitrarily large rank?fadsopfpoir94lkfmklmfls=-raslr3-

Complex surfaces with abelian $\pi_1$ of arbitrarily large rank

Do there exist complex surfaces with abelian $\pi_1$ of arbitrarily large rank?

fdspaof343rfg4to34-3-4ot[lpgds

fadsopfpoir94lkfmklmfls=-raslr3-

Post Undeleted by user164740
Post Deleted by user164740
Source Link
user164740
user164740