Notícias
Informação para a participação no seminário via Zoom:
https://videoconf-colibri.zoom.us/j/83969355532
ID da reunião: 839 6935 5532
Senha de acesso: 412890
Adiado para data a anunciar.
Adiado para data a anunciar.
References
[1] https://mcescher.com/gallery/most-popular/
[2] https://www.researchgate.net/publication/335977863 Escher variations from Leibnitz to Mandelbrot
[3] https://www.google.com/search?q=lima+de+freitas&source=lnms&tbm=isch&sa=X&ved=0ahUKEwjZ98Oi5fPkAhWI
[4] https://www.researchgate.net/publication/303898801 Lima de Freitas
The external numbers are an attempt to model orders of magnitude as numbers, in relation to a nonstandard set of real numbers, rather than functions, which give the notation O(.) and o(.). The calculation rules are either equal to the rules for real numbers, or are adaptations. In particular each external number has its own zero, called neutrix. We present an axiomatic system for the external numbers, in analogy with the axioms for the real numbers, which we complete with an axiom that postulates the existence of a non-trivial neutrix. We build a structure satisfying all the axioms, called a Complete Arithmetical Solid, showing the consistency of the axiomatic system. We show how the structure captures the intrinsic imprecisions of orders of magnitudes, the Sorites paradox and informal error analysis. Some applications in error propagation and perturbation analysis are indicated.
