20,004 research outputs found
Cyprus as a winter destination. An exploratory study
Seasonal fluctuations of demand are regular in the Mediterranean islands. this could be attributed to the distinct qualities of island destinations, their vulnerability, peripherality, and isolation. this article aims to determine whether Cyprus has the geographical and governance qualities needed to address seasonality by diversifying its tourism product. An exploratory, interpretive, inductive approach to research was undertaken with key informers within the industry to investigate these issues. the findings indicate that Cyprus has the necessary geographical features to address seasonality. however, there is high dependency on small number of tour operators, air travel companies, the narrow sun-and-sea product, and governmental control, which prevents winter tourism development
Multi-Plaintiff Litigation in Australia: A Comparative Perspective
Graphene is a single layer of carbon atoms, laid out in a hexagonal lattice. The material has remarkable properties that opened up several new research areas since its discovery in 2004. One promising field is graphene based biosensors, where researchers hope to create new devices that are smaller, cheaper and more reliable than those based on today’s technology. Among several manufacturing methods, graphene grown on silicon carbide is one of the promising ones for biosensing. A chip design has been developed in order to support research into graphene on silicon carbide as a base material for biosensors. Along with the chip, a holder for electrochemical measurements has been designed and an investigation into the requirements of a custom measurement device for the sensor has been undertaken
A time-dependent variational principle for dissipative dynamics
We extend the time-dependent variational principle to the setting of
dissipative dynamics. This provides a locally optimal (in time) approximation
to the dynamics of any Lindblad equation within a given variational manifold of
mixed states. In contrast to the pure-state setting there is no canonical
information geometry for mixed states and this leads to a family of possible
trajectories --- one for each information metric. We focus on the case of the
operationally motivated family of monotone riemannian metrics and show further,
that in the particular case where the variational manifold is given by the set
of fermionic gaussian states all of these possible trajectories coincide. We
illustrate our results in the case of the Hubbard model subject to spin
decoherence.Comment: Published versio
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