1,173 research outputs found
On the postulation of s^d fat points in P^d
In connection with his counter-example to the fourteenth problem of Hilbert,
Nagata formulated a conjecture concerning the postulation of r fat points of
the same multiplicity in the projective plane and proved it when r is a square.
Iarrobino formulated a similar conjecture in any projective space P^d. We prove
Iarrobino's conjecture when r is a d-th power. As a corollary, we obtain new
counter-examples modeled on those by Nagata.Comment: 14 page
Bialynicki-Birula schemes in higher dimensional Hilbert schemes of points and monic functors
The Bialynicki-Birula cells on the Hilbert scheme H^n({A}^d) are smooth and
reduced in dimension d=2. We prove that there is a schematic structure in
higher dimension, the Bialynicki-Birula scheme, which is natural in the sense
that it represents a functor. Let \rho_i be the Hilbert-Chow morphism from the
Hilbert scheme H^n({A}^d) to Sym^n(A^1) associated with the i^{th} coordinate.
We prove that a Bialynicki-Birula scheme associated with an action of a torus T
is schematically included in the fiber over the origin if the
i^{th} weight of T is non positive. We prove that the monic functors
parametrizing families of ideals with a prescribed initial ideal are
representable.Comment: 18 pages, simplified proofs, noetherian assumptions removed,
bibliography improve
Connect Four and Graph Decomposition
We introduce the standard decomposition, a way of decomposing a labeled graph
into a sum of certain labeled subgraphs. We motivate this graph-theoretic
concept by relating it to Connect Four decompositions of standard sets. We
prove that all standard decompositions can be generated in polynomial time,
which implies that all Connect Four decompositions can be generated in
polynomial time
New structural data reveal benleonardite to be a member of the pearceite-polybasite group
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