5,603 research outputs found
The dawn of mathematical biology
In this paper I describe the early development of the so-called mathematical
biophysics, as conceived by Nicolas Rashevsky back in the 1920's, as well as
his latter idealization of a "relational biology". I also underline that the
creation of the journal "The Bulletin of Mathematical Biophysics" was
instrumental in legitimating the efforts of Rashevsky and his students, and I
finally argue that his pioneering efforts, while still largely unacknowledged,
were vital for the development of important scientific contributions, most
notably the McCulloch-Pitts model of neural networks.Comment: 9 pages, without figure
Existentially closed fields with G-derivations
We prove that the theories of fields with Hasse-Schmidt derivations
corresponding to actions of formal groups admit model companions. We also give
geometric axiomatizations of these model companions.Comment: In version 2: new proof of (the current) Proposition 3.3
Integrating Hasse-Schmidt derivations
We study integrating (that is expanding to a Hasse-Schmidt derivation)
derivations, and more generally truncated Hasse-Schmidt derivations, satisfying
iterativity conditions given by formal group laws. Our results concern the
cases of the additive and the multiplicative group laws. We generalize a
theorem of Matsumura about integrating nilpotent derivations (such a
generalization is implicit in work of Ziegler) and we also generalize a theorem
of Tyc about integrating idempotent derivations
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