Reputation
Next privilege 200 Rep.
See reduced ads
Badges
6
Newest
 Curious
Impact
~1k people reached

  • 0 posts edited
  • 0 helpful flags
  • 3 votes cast
Dec
2
comment Can the $(n-1)$ power of the hermitian form on a compact complex $n$-fold be $\partial {\bar{\partial}}$-exact?
Thank you, again.
Dec
2
awarded  Curious
Dec
1
accepted Can the $(n-1)$ power of the hermitian form on a compact complex $n$-fold be $\partial {\bar{\partial}}$-exact?
Dec
1
revised Can the $(n-1)$ power of the hermitian form on a compact complex $n$-fold be $\partial {\bar{\partial}}$-exact?
edited title
Dec
1
revised Can the $(n-1)$ power of the hermitian form on a compact complex $n$-fold be $\partial {\bar{\partial}}$-exact?
edited title
Dec
1
asked Can the $(n-1)$ power of the hermitian form on a compact complex $n$-fold be $\partial {\bar{\partial}}$-exact?
Oct
12
comment Is there an integrable complex structure on SU(3)?
As always, thank you.
Oct
7
awarded  Nice Question
Oct
7
accepted Is there an integrable complex structure on SU(3)?
Oct
6
asked Is there an integrable complex structure on SU(3)?
Nov
16
accepted ${\bar{\partial}}$-geometrically formal ?
Apr
5
accepted What are the known examples of compact complex $n$-folds that do not have a strongly Gauduchon metric for $n >2$?
Mar
30
revised What are the known examples of compact complex $n$-folds that do not have a strongly Gauduchon metric for $n >2$?
deleted 2 characters in body; edited title
Mar
30
asked What are the known examples of compact complex $n$-folds that do not have a strongly Gauduchon metric for $n >2$?
Feb
5
revised ${\bar{\partial}}$-geometrically formal ?
edited tags
Feb
5
revised ${\bar{\partial}}$-geometrically formal ?
added 11 characters in body
Feb
5
asked ${\bar{\partial}}$-geometrically formal ?
Dec
26
awarded  Supporter
Dec
25
comment Compact Complex n-folds with Betti numbers $b_1=b_2=b_n=0$ for $n >3$
@Dmitri, Yes, this answers my question. Thank you!
Dec
25
awarded  Scholar