We choose a generator G of the derived category of coherent sheaves on a smooth
curve X of genus g which corresponds to a choice of g distinguished points P1, . . . , Pg on X.
We compute the Hochschild cohomology of the algebra B = Ext (G,G) in certain internal
degrees relevant to extending the associative algebra structure on B to an A1-structure, which
demonstrates that A1-structures on B are finitely determined for curves of arbitrary genus.
When the curve is taken over C and g = 1, we amend an explicit A1-structure on B
computed by Polishchuk so that the higher products m6 and m8 become Hochschild cocycles.
We use the cohomology classes of m6 and m8 to recover the j-invariant of the curve. When
g 2, we use Massey products in Db(X) to show that in the A1-structure on B, m3 is
homotopic to 0 if and only if X is hyperelliptic and P1, . . . , Pg are chosen to be Weierstrass
points.
iv
| Identifer | oai:union.ndltd.org:uoregon.edu/oai:scholarsbank.uoregon.edu:1794/12368 |
| Date | January 2012 |
| Creators | Fisette, Robert, Fisette, Robert |
| Contributors | Polishchuk, Alexander |
| Publisher | University of Oregon |
| Source Sets | University of Oregon |
| Language | en_US |
| Detected Language | English |
| Type | Electronic Thesis or Dissertation |
| Rights | All Rights Reserved. |
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