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1. Editor's corner

   https://doi.org/10.1080/10429247.1999.11415032  

   Bailey, J. M. (October 2020, The Earth scientist)

   null (Ed.)

   It is a pleasure to present the second special issue of The Earth Scientist sponsored by the MEL Project team (https://serc.carleton.edu/mel/index.html)! The Model-Evidence Link (MEL) and MEL2 projects have been sponsored by the National Science Foundation (Grant Nos. 1316057, 1721041, and 2027376) to Temple University and the University of Maryland, in partnership with the University of North Georgia, TERC, and the Planetary Science Institute. In 2016 we shared with you the four MEL diagram activities, covering the topics of climate change, the formation of the Moon, fracking and earthquakes, and wetlands use, as well as a rubric for assessment. This issue brings to you our four new build-a-MEL activities on the origins of the Universe, fossils and Earth’s past, freshwater resources, and extreme weather. Additionally, there are articles about a new NGSS-aligned rubric and transfer task to help students apply their new skills in other situations and about teaching with MEL and build-a-MEL activities. Our goals with all of these activities are to help students learn Earth science content by engaging in scientific practices, notably the evaluation of alternative explanatory models (by looking at the connections between lines of evidence and the competing models) and argumentation. The team has tested these activities in multiple middle and high school classrooms. Our research has shown the activities to be effective in learning both content and skills, and our partner teachers report that students enjoy the activities. These activities are freely available for teachers to use. We hope that you and your students will also find them to be effective and enjoyable approaches to learning about complex and sometimes controversial socioscientific issues within Earth Science. 

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2. Uniqueness of the 2D Euler equation on a corner domain with non-constant vorticity around the corner

   https://doi.org/10.1088/1361-6544/ac586a  

   Agrawal, Siddhant; Nahmod, Andrea R (May 2022, Nonlinearity)

   Abstract We consider the 2D incompressible Euler equation on a corner domain Ω with angle νπ with 1 2 < ν < 1 . We prove that if the initial vorticity ω 0 ∈ L 1 (Ω) ∩ L ∞ (Ω) and if ω 0 is non-negative and supported on one side of the angle bisector of the domain, then the weak solutions are unique. This is the first result which proves uniqueness when the velocity is far from Lipschitz and the initial vorticity is non-constant around the boundary. 

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3. Sustainable ammonia synthesis: Just around the corner?

   https://doi.org/10.1016/j.joule.2022.09.001  

   Klein, Channing K.; Manthiram, Karthish (September 2022, Joule)
4. Hollow vortex in a corner

   https://doi.org/10.1017/jfm.2020.966  

   Christopher, T. W.; Llewellyn Smith, Stefan G. (February 2021, Journal of Fluid Mechanics)

   null (Ed.)

   Equilibrium solutions for hollow vortices in straining flow in a corner are obtained by solving a free-boundary problem. Conformal maps from a canonical doubly connected annular domain to the physical plane combining the Schottky–Klein prime function with an appropriate algebraic map lead to a problem similar to Pocklington's propagating hollow dipole. The result is a two-parameter family of solutions depending on the corner angle and on the non-dimensional ratio of strain to circulation. 

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5. Gravitational corner conditions in holography

   https://doi.org/10.1007/JHEP01(2020)155  

   Horowitz, Gary T.; Wang, Diandian (January 2020, Journal of High Energy Physics)