Add to ORKGWe are defining a refinement of Kool-Thomas invariants via K-theoretic invariants proposed by Nekrasov and Okounkov. We introduce two K-theory class on the moduli space that contain the information of the incidence of a point with a curve supporting a stable pair (F,s). The evaluation at t=1 of the contribution of pairs supported on S to the K-theoretic invariants gives the Kool-Thomas invariants. Moreover, the generating function of this contribution contains the same information with the generating function given by the refined curve counting on complex surfaces defined by Göttsche and Shend
Given a projective smooth complex variety X, one way to associate to it numericalinvariants is by ta...
This thesis develops a method (dimensional reduction) to compute motivic Donaldson--Thomas invariant...
Donaldson\u2013Thomas theory on a Calabi\u2013Yau can be described in terms of a certain six-dimensi...
We are defining a refinement of Kool-Thomas invariants via K-theoretic invariants proposed by Nekras...
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 ...
The moduli space of stable pairs on a local surface X = KS is in general non-compact. The action of ...
In [MT2] the Vafa-Witten theory of complex projective surfaces is lifted to oriented $\mathbb C^*$-e...
We interpret the generalised gauge symmetry introduced in string theory and M-Theory as a special ca...
We interpret the generalised gauge symmetry introduced in string theory and M-Theory as a special ca...
The Donaldson-Thomas (DT) theory of a Calabi-Yau threefold X gives rise to subtle deformation invari...
In this work we study K-theoretic Donaldson-Thomas theory. We derive an explicit formula for the cap...
Let X = S × E be the product of a K3 surface S and an elliptic curve E. Reduced stable pair invarian...
We develop equivariant KK–theory for locally compact groupoid actions by Morita equivalences on real...
ABSTRACT. Oberdieck and Pandharipande conjectured [9] that the curve counting invari-ants of S × E, ...
Given a projective smooth complex variety X, one way to associate to it numericalinvariants is by ta...
This thesis develops a method (dimensional reduction) to compute motivic Donaldson--Thomas invariant...
Donaldson\u2013Thomas theory on a Calabi\u2013Yau can be described in terms of a certain six-dimensi...
We are defining a refinement of Kool-Thomas invariants via K-theoretic invariants proposed by Nekras...
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 ...
The moduli space of stable pairs on a local surface X = KS is in general non-compact. The action of ...
In [MT2] the Vafa-Witten theory of complex projective surfaces is lifted to oriented $\mathbb C^*$-e...
We interpret the generalised gauge symmetry introduced in string theory and M-Theory as a special ca...
We interpret the generalised gauge symmetry introduced in string theory and M-Theory as a special ca...
The Donaldson-Thomas (DT) theory of a Calabi-Yau threefold X gives rise to subtle deformation invari...
In this work we study K-theoretic Donaldson-Thomas theory. We derive an explicit formula for the cap...
Let X = S × E be the product of a K3 surface S and an elliptic curve E. Reduced stable pair invarian...
We develop equivariant KK–theory for locally compact groupoid actions by Morita equivalences on real...
ABSTRACT. Oberdieck and Pandharipande conjectured [9] that the curve counting invari-ants of S × E, ...
Given a projective smooth complex variety X, one way to associate to it numericalinvariants is by ta...
This thesis develops a method (dimensional reduction) to compute motivic Donaldson--Thomas invariant...
Donaldson\u2013Thomas theory on a Calabi\u2013Yau can be described in terms of a certain six-dimensi...