Book Review: \u3cem\u3eJournal of Vaishnava Studies 20.2 (Spring 2012)\u3c/em\u3e

A review of the anthology Journal of Vaishnava Studies 20.2 (Spring 2012) edited by Stephen J. Rosen and Graham M. Schweig

Reading in the 21st century; reading at scale

Essay from a festshrift that was originally published in: Reading for faith and learning : essays on scripture, community, and libraries in honor of M. Patrick Graham / edited by John B. Weaver and Douglas L. Gragg. Abilene : Abilene Christian University Press, 2017

An Explicit Solution to the Chessboard Pebbling Problem

We consider the chessboard pebbling problem analyzed by Chung, Graham, Morrison and Odlyzko [3]. We study the number of reachable configurations $G(k)$ and a related double sequence $G(k,m)$. Exact expressions for these are derived, and we then consider various asymptotic limits.Comment: 12 pages, 7 reference

Volume 10, Issue 2: Full Issue

Full issue of the March 2014 issue of Manuscripts. Includes work by: Lucy Kaufman, Thomas J. Luck, Mary M. Schortemeier, Verse Forms Class, Jeanne Gass, Jack DeVine, Mildred Reimer, Donald Rider, Donald Morgan, Joe Howitt, Elizabeth Hyatt, Arline Hyde, Stuart Palmer, George Zainey, Peggy O\u27Donnell, Lester Hunt, Arthur Graham, Rosemary Haviland, Fayetta Hall, and Jane Burrin

Edward M. Graham, Sr., on New Steam Turbine in Veazie

Edward M. Graham, Sr., discusses the new steam turbine dedicated at Bangor Hydro’s Graham Station in Veazie in 1954.https://digitalcommons.library.umaine.edu/wlbz_station_records/1128/thumbnail.jp

Edward M. Graham, Sr., on New Steam Turbine in Veazie

Edward M. Graham, Sr., discusses the new steam turbine dedicated at Bangor Hydro’s Graham Station in Veazie in 1954.https://digitalcommons.library.umaine.edu/wlbz_station_records/1128/thumbnail.jp

Unique continuation and extensions of Killing vectors at boundaries for stationary vacuum space-times

Generalizing Riemannian theorems of Anderson-Herzlich and Biquard, we show that two $(n+1)$-dimensional stationary vacuum space-times (possibly with cosmological constant $\Lambda \in \R$) that coincide up to order one along a timelike hypersurface \mycal T are isometric in a neighbourhood of \mycal T. We further prove that KIDS of $\partial M$ extend to Killing vectors near $\partial M$. In the AdS type setting, we show unique continuation near conformal infinity if the metrics have the same conformal infinity and the same undetermined term. Extension near $\partial M$ of conformal Killing vectors of conformal infinity which leave the undetermined Fefferman-Graham term invariant is also established