Pawel Sosna scite author profile

Abstract. We prove that the bounded derived category of the surface S constructed by Barlow admits a length 11 exceptional sequence consisting of (explicit) line bundles. Moreover, we show that in a small neighbourhood of S in the moduli space of determinantal Barlow surfaces, the generic surface has a semiorthogonal decomposition of its derived category into a length 11 exceptional sequence of line bundles and a category with trivial Grothendieck group and Hochschild homology, called a phantom category. This is done using a deformation argument and the fact that the derived endomorphism algebra of the sequence is constant. Applying Kuznetsov's results on heights of exceptional sequences, we also show that the sequence on S itself is not full and its (left or right) orthogonal complement is also a phantom category.

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On the derived category of the classical Godeaux surface

Böhning

Bothmer

Sosna

2013

Advances in Mathematics

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We construct an exceptional sequence of length 11 on the classical Godeaux surface X which is the Z/5-quotient of the Fermat quintic surface in P^3. This is the maximal possible length of such a sequence on this surface which has Grothendieck group Z^11+Z/5. In particular, the result answers Kuznetsov's Nonvanishing Conjecture, which concerns Hochschild homology of an admissible subcategory, in the negative. The sequence carries a symmetry when interpreted in terms of the root lattice of the simple Lie algebra of type E_8. We also produce explicit nonzero objects in the (right) orthogonal to the exceptional sequence.Comment: 33 pages, 1 figure; version 2: apart from small changes, section 10 on the derived endomorphism algebra of the sequence adde

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On the derived category of the Hilbert scheme of points on an Enriques surface

Krug

Sosna

2015

Sel. Math. New Ser.

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Derived categories of resolutions of cyclic quotient singularities

Krug

Ploog

Sosna

2017

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For a cyclic group G acting on a smooth variety X with only one character occurring in the G-equivariant decomposition of the normal bundle of the fixed point locus, we study the derived categories of the orbifold [X/G] and the blow-up resolution Y → X/G.Some results generalise known facts about X = A n with diagonal G-action, while other results are new also in this basic case. In particular, if the codimension of the fixed point locus equals |G|, we study the induced tensor products under the equivalence D b ( Y ) ∼ = D b ([X/G]) and give a 'flop-flop=twist' type formula. We also introduce candidates for general constructions of categorical crepant resolutions inside the derived category of a given geometric resolution of singularities and test these candidates on cyclic quotient singularities.

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On the Jordan–Hölder property for geometric derived categories

Böhning

Bothmer

Sosna

2014

Advances in Mathematics

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We prove that the semiorthogonal decompositions of the derived category of the classical Godeaux surface X do not satisfy the Jordan-Hölder property. More precisely, there are two maximal exceptional sequences in this category, one of length 11, the other of length 9. Assuming the Noetherian property for semiorthogonal decompositions, one can define, following Kuznetsov, the Clemens-Griffiths component CG(D) for each fixed maximal decomposition D. We then show that D b (X) has two different maximal decompositions for which the Clemens-Griffiths components differ. Moreover, we produce examples of rational fourfolds whose derived categories also violate the Jordan-Hölder property.

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Pawel Sosna

Determinantal Barlow surfaces and phantom categories

On the derived category of the classical Godeaux surface

On the derived category of the Hilbert scheme of points on an Enriques surface

Derived categories of resolutions of cyclic quotient singularities

On the Jordan–Hölder property for geometric derived categories

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