"Virgil" <
vir...@ligriv.com> wrote in message
news:virgil-1E6CBF....@bignews.usenetmonster.com...
>> > > w: (1)
>> >
>> > Not to me.
>> >
>> > To me, any limit of the sequence you give abode as
>> > 0: (0), 1: 1(0), 2: 01(0), 3: 11(0), 4: 001(0), 5: 101(0), 6:
>> > 011(0),...
>> > must contain infinitely many non-zero characters in it.
>>
>> That limit does: in fact, it contains *only* non-zero characters.
>>
>> > > So, the limit of sequence 's' *must* be the string "(1)".
>> >
>> > Wrong!
>>
>> Wrong *what*?
>
> If most of the terms in your sequence contain "0"s why must your alleged
> limit be without any?
Reverse direction, same slope! It is a limit entry, so there is nothing
strange, in fact it is quite "natural". I have already provided support to
that choice in the original post: informally (but easily formalizable), it
is a basic property of lexicographical orderings that, given any such sorted
list, the first entry shall be composed of occurrences of the first digit of
the alphabet only, and the last entry of occurrences of the last digit only,
for any suitable definition of "last" list entry. Furthermore, speaking of
evidence, let's try and look at the very diagonal argument: we know that the
anti-diagonal of a list cannot be on that list, and we know that our
anti-diagonal is indeed the string "(1)". What more doubts would you have?
-LV