An overview from physically-based to data-driven approaches of the modelling and simulation of glioblastoma progression in microfluidic devices
Ayensa-Jimenez, J
Perez-Aliacar, M
Doweidar, M
Gaffney, E
Doblare, M
Archives of Computational Methods in Engineering
Monodromy for Some Rank Two Galois Representations over CM Fields
Allen, P
Newton, J
Documenta Mathematica
volume 25
2487-2506
(01 Jan 2020)
Deformations during jet-stripping in the galvanizing process
Hocking, G
Sweatman, W
Fitt, A
Breward, C
Journal of Engineering Mathematics
volume 70
issue 1-3
297-306
(01 Jul 2011)
Lattice and discrete Boltzmann equations for fully compressible Flow
Dellar, P
3rd M.I.T. Conference on Computational Fluid and Solid Mechanics
632-635
(01 Dec 2005)
Aspects of secondary sonic boom propagation
Kaouri, K
Allwright, D
Dallois, L
Dellar, P
Acta Acustica (Stuttgart)
volume 89
issue SUPP.
(01 May 2003)
Bulk and shear viscosities in lattice Boltzmann equations
Dellar, P
Physical Review E - Statistical, Nonlinear, and Soft Matter Physics
volume 64
issue 3 I
312031-3120311
(01 Sep 2001)
Preface
Jarosch, A
Hewitt, I
Annals of Glaciology
volume 57
issue 72
(01 Jul 2016)
Thu, 15 May 2025
17:00
17:00
L3
Feferman's Completeness Theorem
Michael Rathjen
(University of Leeds)
Abstract
Feferman proved in 1962 that any arithmetical theorem is a consequence of a suitable transfinite iteration of uniform reflections. This result is commonly known as Feferman's completeness theorem. The talk aims to give one or two new proofs of Feferman's completeness theorem that, we hope, shed new light on this mysterious and often overlooked result.
Moreover, one of the proofs furnishes sharp bounds on the order types of well-orders necessary to attain completeness.
(This is joint work with Fedor Pakhomov and Dino Rossegger.)