162,562 research outputs found
O. J. Canham
"A/B O.J. Canham S.6759 H.M.A. Boom Defence Depot Darwin 1942 - 45. [Signature] Jack Canham".Able Seaman O. J. Canham S.6759 His Majesty's Australian Boom Defence Depot, Darwin 1942 - 45. [Signature] Jack Canham
Review of A chemical passion, Marelene Rayner-Canham and Geoff Rayner-Canham
Review of A Chemical Passion, Marelene Rayner-Canham and Geoff Rayner-Canham
Dataset: Nanoporous silicon as a green, high-tech educational tool
Dataset for article: Coffer, J. L.; Canham, L. T. (2021). Nanoporous silicon as a green, high-tech educational tool. Nanomaterials, 11 (2), Article 553. https://doi.org/10.3390/nano11020553This file contains a representative data set of 'nanoquizzes' and presentations
[Report to Chief J. E. Curry, by an unknown author #1]
Report to Chief J. E. Curry, by an unknown author. The report contains a list of officers who gave depositions to the United States Attorney
[Report to Chief J. E. Curry, by an unknown author #2]
Report to Chief J. E. Curry, by an unknown author. The report contains a list of officers who gave depositions to the United States Attorney
Predicting the occurrence of riparian woody species to inform environmental water policies in an Australian tropical river
<b>External Organisations</b><br/>Biometric Research; Department of Water and Environmental Regulation (Western Australia)<b>Associated Persons</b><br/>Daniel Gwinn (Creator); Robyn Loomes (Creator)This dataset includes riparian vegetation composition and structure data, collected from the lower Fitzroy River, WA (2018).
The data accompanies the following research outputs;
- Canham, C. A., Beesley, L. S., Gwinnn, D. C., Douglas, M. M., Setterfield, S. A., Freestone, F. L., Pusey, B. J. & Loomes, R. C. (2021). Predicting the occurrence of riparian woody species to inform environmental water policies in an Australian tropical river. Freshwater Biology., 66, 2251– 2263. https://doi.org/10.1111/fwb.13829
- Freestone F. L., Canham C. A., Setterfield S. A., Douglas M. M., Beesley L. S. & Loomes R. C. (2022). Characterising the woody vegetation in contrasting habitat types in the lower Fitzroy River, Western Australia. Australian Journal of Botany 70, 421-431. https://doi.org/10.1071/BT22039
- Freestone F. L., Canham C. A., Setterfield S. A., Douglas M. M. & Loomes R. C. (2021). Characterising vegetation zones along the lower Fitzroy River, Western Australia. University of Western Australia, Perth. https://nesplandscapes.edu.au/publications/characterising-vegetation-zones-along-the-lower-fizroy-river-western-australia-report/
This project is supported through funding from the Australian Government’s National Environmental Science Program through the Northern Australia Environmental Resources Hub.
For more information, please contact Samantha Setterfield [email protected]<mailto:[email protected]>
Murder on the mountain: author talk with Peter J. Wosh
Author talk by Peter J. Wosh on May 5th, 2022, on his book, "Murder on the Mountain: crime, passion, and punishment in gilded age New Jersey.
Mr. Melvin J. Collier, RWWL AUC, June 2011
This video is a conversation with Mr. Melvin J. Collier. Mr. Collier talks about his book, "From Mississippi to Africa: A Journey of Discovery". Daniel Le, AUC Woodruff Library, is the interviewer
Second variation of the Helfrich-Canham Hamiltonian and reparametrization invariance
A covariant approach towards a theory of deformations is developed to examine both the first and second variation of the Helfrich-Canham Hamiltonian — quadratic in extrinsic curvature — which describes fluid vesicles at mesoscopic scales. Deformations are decomposed into tangential and normal components; At first order, tangential deformations may always be identified with a reparametrization; at second order, they differ. The relationship between tangential deformations and reparametrizations, as well as the coupling between tangential and normal deformations, is examined at this order for both the metric and the extrinsic curvature tensors. Expressions for the expansion to second order in deformations of geometrical invariants constructed with these tensors are obtained; in particular, the expansion of the Hamiltonian to this order about an equilibrium is considered. Our approach applies as well to any geometrical model for membranes
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