76,233 research outputs found
C. J. R. Scott
"VX75167 CFN C.J.R. Scott. N.11.CA L of C W.Shops. A.E.M.E. Adelaide River & Alice Springs 1942 -1945".VX75167 Craftsman C.J.R. Scott. N.11.CA Lines of Communication Workshops. Corps of Australian Electrical and Mechanical Engineers, Adelaide River & Alice Springs 1942 -1945.Date:199
Existence and stability of multiple spot solutions for the Gray-Scott model in R^2$
Existence and Stability of Multiple Spot Solutions for the Gray-Scott Model in In this paper, we rigorously
prove the existence and stability of multiple spot patterns for the Gray-Scott system in a two dimensional domain
which are far from
spatial homogeneity.
The Green's function and its derivatives
together with two nonlocal eigenvalue problems
both play a major role in the analysis.
We establish a threshold behavior for stability:
If a certain inequality for the parameters holds
then we get stability, otherwise we get instability of multiple spot solutions.
The exact asymptotics of the critical thresholds are obtained
Scott, L R, VX43061
This record was harvested from a previous catalogue system and will be withdrawn in 2025. Information in this record may be superseded or incomplete. Visit this record in UMA's new catalogue at: https://archives.library.unimelb.edu.au/nodes/view/415903Surname: SCOTT. Given Name(s) or Initials: L R. Military Service Number or Last Known Location: VX43061. Missing, Wounded and Prisoner of War Enquiry Card Index Number: 44932.238056
Item: [2016.0049.48164] "Scott, L R, VX43061
Letter from R. T. Scott and James M. Parks to L. S. Joynes, 1860 December 18
Letter from R. T. Scott and James M. Parks to L. S. Joynes explaining the environment at the National Medical School.https://scholarscompass.vcu.edu/san/1123/thumbnail.jp
Letter from R. T. Scott and James M. Parks to L. S. Joynes, 1860 December
Letter from R. T. Scott and James M. Parks to L. S. Joynes asking if they can be accepted at the Medical College of Virginia.https://scholarscompass.vcu.edu/san/1122/thumbnail.jp
Letter From William Bell Scott to Mr Chambers
abstract: Concerning Scott's thanks, his writings about his own works, and a manuscript of "The Nightingale Unheard."Seller's Description: Reads "A.L.S. from Author to Mr. Chambers explaining how busy he is... The sonnet is printed in the book. Fredeman: 56.7 £87.50"Handwritten Note: Unknown handwriting at top right reads "June 1st 1877."Publication Details: "The Nightingale Unheard" published in "Poems" by William Bell Scott.Creation Date Details: Undated range is the author's lifespan.Provenance: Removed from:
Poems / by William Bell Scott. Ballads, studies from nature, sonnets, etc. / illustrated by seventeen etchings by the author and L. Alma Tadema. Publisher London : Longmans, Green, 1875. CALL #
HAYDEN SPECIAL COLL SPEC PRB-13
Asymmetric spotty patterns for the Gray-Scott model in R^2
In this paper, we rigorously
prove the existence and stability of asymmetric spotty patterns for the Gray-Scott model in a bounded two dimensional domain.
We show that given any two positive integers k_1,\,k_2,
there are asymmetric solutions with k_1 large spots (type A) and k_2 small spots (type B).
We also give conditions for their location and calculate their heights.
Most of these asymmetric solutions are shown
to be unstable. However, in a narrow range of parameters,
asymmetric solutions may be stable
B-0020a: Millville, Utah, Ernest R. Scott/Maughan L. Scott residence. Lot 1 Block 7 Plat A. Built 1931
B-0020a: Millville, Utah, Ernest R. Scott/Maughan L. Scott residence. Lot 1 Block 7 Plat A. Built 193
Existence and stability of multiple spot solutions for the gray-scott model in R^2
We study the Gray-Scott model in a bounded two dimensional domain and establish the existence and stability of {\bf symmetric} and {\bf asymmetric} multiple spotty patterns. The Green's function and its derivatives
together with two nonlocal eigenvalue problems
both play a major role in the analysis.
For symmetric spots, we establish a threshold behavior for stability:
If a certain inequality for the parameters holds
then we get stability, otherwise we get instability of multiple spot solutions.
For asymmetric spots, we show that they can be stable within a narrow parameter range
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