Zobrazeno 1 - 10
of 79
pro vyhledávání: '"Jack Morgan"'
Autor:
Büşra Günay, Elizabeth Matthews, Jack Morgan, Marianna A. Tryfonidou, Radka Saldova, Abhay Pandit
Publikováno v:
FASEB BioAdvances, Vol 5, Iss 8, Pp 321-335 (2023)
Abstract Degeneration of the intervertebral disc is an age‐related condition. It also accompanies the disappearance of the notochordal cells, which are remnants of the developmental stages of the nucleus pulposus (NP). Molecular changes such as ext
Externí odkaz:
https://doaj.org/article/a277ae4a05d344ca8e6de75ab1dc08ae
The synthetic analogue functor $\nu$ from spectra to synthetic spectra does not preserve all limits. In this paper, we give a necessary and sufficient criterion for $\nu$ to preserve the global sections of a derived stack. Even when these conditions
Externí odkaz:
http://arxiv.org/abs/2407.01507
Autor:
Ken Walczak, Grace Crim, Thane Gesite, Salome Habtemichael, Jack Morgan, Cynthia Tarr, Laris Turkic, Jeff Wiedemann
Publikováno v:
International Journal of Sustainable Lighting, Vol 23, Iss 1 (2021)
Instrumentation developed to monitor and characterize light pollution from the ground has helped frame our understanding of the impacts of artificial light at night (ALAN) [Bará, Lima, & Zamorano, 2019; Hänel et al., 2018; Zamorano et al., 2017]. A
Externí odkaz:
https://doaj.org/article/933ff503fd7b4835a1d30d8ebcaf1f8d
We provide a simple proof that the unit map from the sphere spectrum to the connective image-of-$J$ spectrum $\mathrm{j}$ is surjective on homotopy groups. This is achieved using a novel $t$-structure on the category of $E$-synthetic spectra and a sp
Externí odkaz:
http://arxiv.org/abs/2401.16508
Autor:
Davies, Jack Morgan
Lurie and Gepner--Meier each define equivariant cohomology theories, namely "tempered cohomology" and "equivariant elliptic cohomology," respectively, using derived algebraic geometry. We construct a natural equivalence between the equivariant ellipt
Externí odkaz:
http://arxiv.org/abs/2311.07958
Autor:
Davies, Jack Morgan
Publikováno v:
Ann. K-Th. 9 (2024) 447-473
We discuss a notion of uniqueness up to $n$-homotopy and study examples from stable homotopy theory. In particular, we show that the $q$-expansion map from elliptic cohomology to topological $K$-theory is unique up to $3$-homotopy, away from the prim
Externí odkaz:
http://arxiv.org/abs/2305.02173
Autor:
Davies, Jack Morgan
Publikováno v:
Advances in Mathematics, Volume 452, 2024
The cohomology theory TMF of topological modular forms is a derived algebro-geometric interpretation of the classical ring of complex modular forms from number theory. In this article, we refine the classical Adams operations, Hecke operators, and At
Externí odkaz:
http://arxiv.org/abs/2212.06208
Microclimatic performance of a free-air warming and CO2 enrichment experiment in windy Wyoming, USA.
Publikováno v:
PLoS ONE, Vol 10, Iss 2, p e0116834 (2015)
In order to plan for global changing climate experiments are being conducted in many countries, but few have monitored the effects of the climate change treatments (warming, elevated CO2) on the experimental plot microclimate. During three years of a
Externí odkaz:
https://doaj.org/article/16b002f992aa43c181da15ecc41a85e6
Autor:
Davies, Jack Morgan
Publikováno v:
In Advances in Mathematics August 2024 452
Autor:
Davies, Jack Morgan
Publikováno v:
DAVIES, J. (2022). ELLIPTIC COHOMOLOGY IS UNIQUE UP TO HOMOTOPY. Journal of the Australian Mathematical Society, 1-20
Homotopy theory folklore tells us that the sheaf defining the cohomology theory Tmf of topological modular forms is unique up to homotopy. Here we provide a proof of this fact, although we claim no originality for the statement. This retroactively re
Externí odkaz:
http://arxiv.org/abs/2106.07676