Add to ORKGWe exploit the critical structure on the Quot scheme QuotA3(O⊕r,n), in particular the associated symmetric obstruction theory, in order to study rank r K-theoretic Donaldson-Thomas (DT) invariants of the local Calabi-Yau 3-fold A3. We compute the associated partition function as a plethystic exponential, proving a conjecture proposed in string theory by Awata-Kanno and Benini-Bonelli-Poggi-Tanzini. A crucial step in the proof is the fact, nontrival r > 1, that the invariants do not depend on the equivariant parameters of the framing torus (*)r. Reducing from K-theoretic to cohomological invariants, we compute the corresponding DT invariants, proving a conjecture of Szabo. Reducing further to enumerative DT invariants, we solve the higher ra...
We show that the Quot scheme $\text{Quot}_{\mathbf{A}^3}(\mathcal{O}^r,n)$ admits a symmetric obstru...
We introduce the notion of symmetric obstruction theory and study symmetric obstruction theories whi...
ABSTRACT. Oberdieck and Pandharipande conjectured [9] that the curve counting invari-ants of S × E, ...
We exploit the critical structure on the Quot scheme QuotA3(O⊕r,n), in particular the associated sym...
We exploit the critical structure on the Quot scheme QuotA3(O⊕r,n), in particular the associated sym...
We exploit the critical structure on the Quot scheme QuotA3(O⊕r,n), in particular the associated sym...
We exploit the critical structure on the Quot scheme QuotA3(O⊕r,n), in particular the associated sym...
We exploit the critical structure on the Quot scheme QuotA3(O 95r,n), in particular the associated s...
My research is on Equivariant Enumerative Geometry of moduli spaces of sheaves, in particular toric ...
My research is on Equivariant Enumerative Geometry of moduli spaces of sheaves, in particular toric ...
Donaldson and Thomas defined Donaldson-Thomas (DT) invariants for moduli spaces of sheaves on proper...
We show that the Quot scheme QuotA3(Or, n) admits a symmetric obstruction theory, and we compute its...
This review gives an introduction to cohomological Donaldson– Thomas theory: the study of a cohomolo...
We compute the Donaldson–Thomas invariants of a local elliptic surface with section. We introduce a ...
We study Hilbert schemes of points on a smooth projective Calabi–Yau 4-fold X. We define invariants ...
We show that the Quot scheme $\text{Quot}_{\mathbf{A}^3}(\mathcal{O}^r,n)$ admits a symmetric obstru...
We introduce the notion of symmetric obstruction theory and study symmetric obstruction theories whi...
ABSTRACT. Oberdieck and Pandharipande conjectured [9] that the curve counting invari-ants of S × E, ...
We exploit the critical structure on the Quot scheme QuotA3(O⊕r,n), in particular the associated sym...
We exploit the critical structure on the Quot scheme QuotA3(O⊕r,n), in particular the associated sym...
We exploit the critical structure on the Quot scheme QuotA3(O⊕r,n), in particular the associated sym...
We exploit the critical structure on the Quot scheme QuotA3(O⊕r,n), in particular the associated sym...
We exploit the critical structure on the Quot scheme QuotA3(O 95r,n), in particular the associated s...
My research is on Equivariant Enumerative Geometry of moduli spaces of sheaves, in particular toric ...
My research is on Equivariant Enumerative Geometry of moduli spaces of sheaves, in particular toric ...
Donaldson and Thomas defined Donaldson-Thomas (DT) invariants for moduli spaces of sheaves on proper...
We show that the Quot scheme QuotA3(Or, n) admits a symmetric obstruction theory, and we compute its...
This review gives an introduction to cohomological Donaldson– Thomas theory: the study of a cohomolo...
We compute the Donaldson–Thomas invariants of a local elliptic surface with section. We introduce a ...
We study Hilbert schemes of points on a smooth projective Calabi–Yau 4-fold X. We define invariants ...
We show that the Quot scheme $\text{Quot}_{\mathbf{A}^3}(\mathcal{O}^r,n)$ admits a symmetric obstru...
We introduce the notion of symmetric obstruction theory and study symmetric obstruction theories whi...
ABSTRACT. Oberdieck and Pandharipande conjectured [9] that the curve counting invari-ants of S × E, ...