0000000001302119
AUTHOR
José M. Amigó
ATTRACTORS FOR A LATTICE DYNAMICAL SYSTEM GENERATED BY NON-NEWTONIAN FLUIDS MODELING SUSPENSIONS
In this paper we consider a lattice dynamical system generated by a parabolic equation modeling suspension flows. We prove the existence of a global compact connected attractor for this system and the upper semicontinuity of this attractor with respect to finite-dimensional approximations. Also, we obtain a sequence of approximating discrete dynamical systems by the implementation of the implicit Euler method, proving the existence and the upper semicontinuous convergence of their global attractors.
Chemistry Explained by Topology: An Alternative Approach
Molecular topology can be considered an application of graph theory in which the molecular structure is characterized through a set of graph-theoretical descriptors called topological indices. Molecular topology has found applications in many different fields, particularly in biology, chemistry, and pharmacology. The first topological index was introduced by H. Wiener in 1947 [1]. Although its very first application was the prediction of the boiling points of the alkanes, the Wiener index has demonstrated since then a predictive capability far beyond that. Along with the Wiener index, in this paper we focus on a few pioneering topological indices, just to illustrate the connection between p…
CCDC 1489441: Experimental Crystal Structure Determination
Related Article: Oriol Vallcorba, Rosa Adam, Jordi Rius, Rafael Ballesteros, José M. Amigó and Belén Abarca|2014|Powder Diffr.|29|331|doi:10.1017/S0885715614000402
CCDC 1489440: Experimental Crystal Structure Determination
Related Article: Oriol Vallcorba, Rosa Adam, Jordi Rius, Rafael Ballesteros, José M. Amigó and Belén Abarca|2014|Powder Diffr.|29|331|doi:10.1017/S0885715614000402