Adjacency matrix formulation of energy flow in dendrimeric polymers

Andrews, David L. and Li, Shaopeng (2006) Adjacency matrix formulation of energy flow in dendrimeric polymers. In: UNSPECIFIED.

[thumbnail of 188]
Preview
PDF (188) - Accepted Version
Download (149kB) | Preview

Abstract

Dendrimers are synthetic, highly branched polymers with an unusually high density of chromophores. As a result of their extremely high absorption cross-sections for visible light, they represent some of the most promising new materials for energy harvesting. Although the signature of the bonding structure in dendrimers is an essentially fractal geometry, the three-dimensional molecular folding of most higher generation materials results in a chromophore layout that is more obviously akin to concentric spherical shells. The number of chromophores in each shell is a simple function of the distance from the central core. The energy of throughput optical radiation, on capture by any of the chromophores, passes by a multi-step but highly efficient process to the photoactive core. Modeling this crucial migration process presents a number of challenges. It is far from a simple diffusive random walk; each step is subject to an intricate interplay of geometric and spectroscopic features. In this report, the first results of a new approach to the theory is described, developed and adapted from an adjacency matrix formulation. It is shown how this method offers not only kinetic information but also insights into the typical number of steps and the patterns of internal energy flow.

Item Type: Conference or Workshop Item (Other)
Faculty \ School: Faculty of Science > School of Chemistry
UEA Research Groups: Faculty of Science > Research Groups > Physical and Analytical Chemistry (former - to 2017)
Faculty of Science > Research Groups > Chemistry of Light and Energy
Faculty of Science > Research Groups > Centre for Photonics and Quantum Science
Depositing User: Pure Connector
Date Deposited: 18 Jan 2016 17:19
Last Modified: 16 Feb 2023 10:31
URI: https://ueaeprints.uea.ac.uk/id/eprint/56615
DOI: 10.1117/12.678038

Downloads

Downloads per month over past year

Actions (login required)

View Item View Item