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Singularities in algebraic/complex/differential geometry and analysis of ODEs/PDEs. Singular spaces, vector fields, etc.
2
votes
Accepted
Lefschetz hyperplane section theorem for intersection homology
So, the answer is positive and follows from the "usual" Weak Lefschetz Theorem if you have transversality (and it suffices to assume that $Y$ is smooth). On the other hand, if $Y$ is singular then you …
1
vote
0
answers
195
views
Is a variety a local complete intersection if it is locally a complement of to a smooth $N$-...
If an equidimensional variety $V$ of dimension $m$ is locally a set-theoretic complete intersection (i.e., it can be covered by open subvarieties of certain intersections of $N-n$ hypersurfaces in $P^ …
9
votes
2
answers
2k
views
Which weighted projective spaces (and their finite quotients) are local complete intersections?
Let $G$ be a finite subgroup of $\textrm{Gl}_{n+1}(k)$ (where $k$ is an algebraically closed field). My question is: do there exist examples of $G$ such that the corresponding quotient $P$ of $\mathbb …
1
vote
0
answers
105
views
How would you call a variety that is locally a complete intersection up to defect c?
Let $X$ be an equidimensional variety of dimension $n$ over a field that can be covered by open subvarieties of certain intersections of $N-n$ hypersurfaces in $P^N$ (for a large enough $N$; we consid …
1
vote
1
answer
239
views
How can one bound 'the lower perverse degree' for a constant sheaf on a variety that is smoo...
Let $V$ be a variety (or a Whitney stratified space); $C$ is a constant etale ('topological') sheaf on it. Let $t$ denote the middle perverse t-structure for the corresponding derived category (of she …
4
votes
1
answer
817
views
When singular points of a reduced scheme are not dense in it?
A stupid AG question: could singular (Zarisky) points be dense in a reduced (Noetherian) scheme $S$? If yes, which 'standard' restrictions on $S$ could ensure that this does not happen? For example, s …