From Quantum Cohomology to Integrable Systems

Quantum cohomology has its origins in symplectic geometry and algebraic geometry, but is deeply related to differential equations and integrable systems. This text explains what is behind the extraordinary success of quantum cohomology, leading to its connections with many existing areas of mathemat

Quantum cohomology has its origins in symplectic geometry and algebraic geometry, but is deeply related to differential equations and integrable systems. This text explains what is behind the extraordinary success of quantum cohomology, leading to its connections with many existing areas of mathemat

<P>The CKP hierarchy and the WDVV prepotential; H. Aratyn, J. van de Leur.- Quantum invariance groups of particle algebras; M. Arik.- Algebraic Hirota maps; C. Athorne.- Boundary states in Susy Sine-Gordon model; Z. Bajnok et al.- Geometry of discrete integrability. The consistency approach; A.I. Bo

<P>Integrated quantum hybrid devices, built from classical dielectric nanostructures and individual quantum systems, promise to provide a scalable platform to study and exploit the laws of quantum physics. On the one hand, there are novel applications, such as efficient computation, secure communica