On 11 Jun., 14:21, Aatu Koskensilta <aatu.koskensi...@uta.fi> wrote: > WM <mueck...@rz.fh-augsburg.de> writes: > > Most (of the few) mathematicians who share my standpoint do not talk > > about vanishing information. > > Who are these few mathematicians who share your standpoint?
Here you will find some of them, if you click through till the end of that lesson. http://www.hs-augsburg.de/~mueckenh/GU/GU11.PPT#385,50,Folie 50 > > > But consider any lawless choice sequence that has been fixed to a > > certain n (by writing it in a memory). If this memory is destroyed, > > the due information has disappeared. > > On your conception what becomes of such basic principles as the density > axiom > > Every finite sequence <a1, ..., an> is the initial segment of a lawless > choice sequences. > > the principle of open data > > If a property P holds of a lawless choice sequence alpha, there is an > initial segment <a1, ..., an> of alpha such that P holds of all lawless > choice sequences with <a1, ..., an> as an initial segment. > > and so on? >