50,861 research outputs found
Review of the book How Fascism Works, by J. Stanley
Dr. Devin Z. Shaw (Douglas College) reviews the book How fascism works, by J. Stanley (2020).Final article published
[Subpoena by Bill Shaw summoning Captain J. W. Fritz]
Subpoena by Bill Shaw summoning captain J. W. Fritz to testify in the case of Jack Ruby
Letter from Thomas J. Shaw to Hagan
Holograph letter from Thomas [J.] Shaw, [La Marretra] Mullingar (County Westmeath), to Hagan. As a member of the [C.D.I.I.] he has often felt the need for greater co-operation between voluntary societies and groups engaged in Catholic literary propaganda work in the English-speaking world; suggesting a meeting of these on the occasion of the Eucharistic Congress in Rome in 1922. (Handwritten note by Hagan; recommended to writer a procedure through the C.(atholic) T.(ruth) S.(ociety) and the bishops but cautioned against an English-speaking conference so as not to invite it to be used for English propaganda.
Lost Light, Kayla Shaw, Spring 2020
Kayla Shaw was the first �freshman� to enroll in SIS Seminar. She is a pre�med major from Birmingham, Alabama
The Forgotten, Kayla Shaw, Spring 2020
Kayla Shaw was the first �freshman� to enroll in SIS Seminar. She is a pre�med major from Birmingham, Alabama
Shaw, J J, WX160
This record was harvested from a previous catalogue system and will be withdrawn in 2025. Information in this record may be superseded or incomplete.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/416375Surname: SHAW. Given Name(s) or Initials: J J. Military Service Number or Last Known Location: WX160. Missing, Wounded and Prisoner of War Enquiry Card Index Number: 7980.238528
Item: [2016.0049.48636] "Shaw, J J, WX160
Hele-Shaw Flow Near Cusp Singularities
This thesis discusses the radial version of the Hele-Shaw problem. Different from the channel version, traveling-wave solutions do not exist in this version. Under algebraic potentials, in the case that the droplets expand, in finite time, cusps will appear on the boundary and classical solutions may not exist afterwards. Physicists have suggested that for (2p+1,2)-cusps, that near cusp singularities of Hele-Shaw flow, after scaling X, Y by some powers of time t respectively, the main part of Y(X, t) is a one-parameter family and does not depend on time t. They have also suggested that the solutions of the Hele-Shaw problem are connected with dispersionless KdV (dKdV) hierarchy. In this study, we rigorously proved that this is the case for (3,2)-cusps when the droplets are simply connected and the external potentials are algebraic. We gave exact solutions and showed that the main parts of the exact solutions are some special solutions of the dispersionless string equation. More over, borrowed from the physical paper\cite{Teo} with a little more details, we showed the arguments of how these special solutions are related to dKdV hierarchy
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