Add to ORKGABSTRACT. This is the first of a sequence of papers proving the quantum invariance under ordinary flops over an arbitrary smooth base. In this first part, we determine the defect of the cup product under the canonical correspondence and show that it is corrected by the small quantum product attached to the extremal ray. We then perform various reductions to reduce the problem to the local models. In Part II [10], we develop a quantum Leray–Hirsch theorem and use it to show that the big quantum cohomology ring is invariant under analytic continuations in the Kähler moduli space for ordinary flops of splitting type. In Part III [7], we remove the splitting condition by developing a quantum splitting principle, and hence solve the problem com...
In this thesis we address several questions involving quantum groups, quantum cluster algebras, and ...
Abstract A symmetry-twisted boundary condition of the path integral provides a suitable framework fo...
In this thesis we address several questions involving quantum groups, quantum cluster algebras, and ...
ABSTRACT. This is the first of a sequence of papers proving the quan-tum invariance under ordinary f...
Abstract. A driving question in (quantum) cohomology of flag varieties is to find non-recursive, pos...
For any compact toric orbifold (smooth proper Deligne-Mumford toric stack) $ Y$ with projective coar...
For stratified Mukai flops of type $A_{n,k}, D_{2k+1}$ and $E_{6,I}$, it is shown the fiber product ...
We give a new reconstruction method of big quantum K-ring based on the q-difference module structure...
Abstract. We give conditions on a curve class that guarantee the vanishing of the structure constant...
Cataloged from PDF version of article.The quantum effects for a physical system can be described by ...
Abstract. A reconstruction theorem for genus 0 gravitational quantum cohomology and quantum K-theory...
In \cite{F} there is a statement generalizing the results in \cite{FG}. Unfortunately there is a mis...
summary:From the text: The author reviews recent research on quantum deformations of the Poincar\'e ...
The multichannel quantum defect theory (MQDT) can be reinterpreted as a quantum Poincaré map in repr...
Journal ArticleThis article is devoted to constructing a quantum version of the famous Kadomtsev-Pet...
In this thesis we address several questions involving quantum groups, quantum cluster algebras, and ...
Abstract A symmetry-twisted boundary condition of the path integral provides a suitable framework fo...
In this thesis we address several questions involving quantum groups, quantum cluster algebras, and ...
ABSTRACT. This is the first of a sequence of papers proving the quan-tum invariance under ordinary f...
Abstract. A driving question in (quantum) cohomology of flag varieties is to find non-recursive, pos...
For any compact toric orbifold (smooth proper Deligne-Mumford toric stack) $ Y$ with projective coar...
For stratified Mukai flops of type $A_{n,k}, D_{2k+1}$ and $E_{6,I}$, it is shown the fiber product ...
We give a new reconstruction method of big quantum K-ring based on the q-difference module structure...
Abstract. We give conditions on a curve class that guarantee the vanishing of the structure constant...
Cataloged from PDF version of article.The quantum effects for a physical system can be described by ...
Abstract. A reconstruction theorem for genus 0 gravitational quantum cohomology and quantum K-theory...
In \cite{F} there is a statement generalizing the results in \cite{FG}. Unfortunately there is a mis...
summary:From the text: The author reviews recent research on quantum deformations of the Poincar\'e ...
The multichannel quantum defect theory (MQDT) can be reinterpreted as a quantum Poincaré map in repr...
Journal ArticleThis article is devoted to constructing a quantum version of the famous Kadomtsev-Pet...
In this thesis we address several questions involving quantum groups, quantum cluster algebras, and ...
Abstract A symmetry-twisted boundary condition of the path integral provides a suitable framework fo...
In this thesis we address several questions involving quantum groups, quantum cluster algebras, and ...
