From: Brian Holtz [brian@holtz.org]
Sent: Saturday, March 23, 2002 11:12 PM
To: alt.atheism.moderated
Subject: Re: finite number of sentences

"Paul Holbach" <heir-of-holbach@freenet.de> wrote:

> I have no idea how there could be something real which is not measurable
> because it´s quantity transcends all possible rational numbers serving
> as units of measurement

I don't know precisely how there could be such either, but I don't know
that there couldn't be such.

> It´s nonsensical to say that
> there is a "possibility beyond all possible possibilities".

Those aren't my words, so please don't quote them as such.

> > > > > Only if there were an explicit,
> > > > > non-self-contradictory definition of "actually infinite"
> > > >
> > > > Example: space or time is "actually infinite" if and only if
> > > > it has no end.
> > >
> > > That´s a non-contradictory but fairly tautological pseudo-definition
> >
> > Every definition is a tautology -- by definition.
>
> [..] a definition [is] not identical with "tautology"

I didn't say it was. So again, the above is "an explicit,
non-self-contradictory definition of 'actually infinite'". QED.

> > Yes, and you seem to be asserting that "to have no end" is
> > is obviously self-contradictory for existent things.  I disagree.
>
> Now, that´s a strawman of yours because I´ve said many times that a
> strictly potentialistic interpretation of infinity is fully
> acceptable.

By "end" I don't just mean "procedural stopping point", but
also limit, endpoint, or terminus. You assert that to have no
such end is obviously self-contradictory for existent things.
I disagree.

> "actual" means "being really there
> altogether, completely, finalized, here and now"

Can you define "complete" and "finalized" in a non-question-begging
way?  Also, I dispute the criterion of "here and now".  There
is nothing metaphysically privileged about any point in spacetime.

> there are people who claim that
> time has no beginning and that, therefore, the number of past instants
> constitutes an actual infinity. To that I could object that the past
> instants are not here right now and that, therefore, they cannot be
> an actual whole

Again, you simply *define* 'actual' as "here and now"
and thus never spatiotemporally infinite.  That is hardly a convincing
argument that spatiotemporal infinities can never be actual. It
is rather argument by assertion/definition.

> but then you would certainly blame me again for an
> allegedly tendentious stipulation.

Yes. So why did you do it?

> it doesn´t make sense to say that a past event is actual

Yes it does: it's called the "B-series" understanding of time,
in contrast to your "A-series" understanding which holds that the
present is somehow privileged.  It isn't.

> a past event has actually happened but now it´s no longer actual
> itself (that´s why it´s called "past")

No, it's called the "past" because it is in the set of all events
that could potentially be seen as influencing (but not being
influenced by) the events you currently call "present".

> > But to assume that the only lengths are finite
> > lengths is just to assume your premise.
>
> An infinite geometrical line is elongated but it has no length.

It has an infinite length. You again here just assume lengths must
be finite.

> > If you define a "table" as having two "ends", then an "infinitely
> > long table" has an infinite distance between the two "ends",
> > and it is an illicit appeal to inapplicable intuition to speak
> > of "the carpenter" who can go from one "end" to the other in
> > a completable journey.
>
> I thank you for this argument against the reality of an actual
> infinity.

No, it's merely an application of the definition of 'infinity',
and only argues against carpenters ever being able to complete
an infinite journey.

> > > He then walks all along the infinitely long table and
> > > fixes the other two legs on the other end so
> > > that his work is eventually finished.
> >
> > Again, it's contrary to the definition of an infinitely long table
> > to assume that the carpenter can finish a walk from the beginning
> > of the table to the end.
>
> Yes sure, but if actual infinities existed, a table like the one I´ve
> described would be a perfectly possible thing.

You here agree that an infinite table cannot be walked,
but then say a walkable infinite table (i.e. "the one I've
described") would be "perfectly possible".  That's a blatant
contradiction.

> Many people think that 100000 is closer to positive infinity than 1,
> but that´s nonsense because the "distance" between any number n and
> "infinity" is always infinite itself.

And how does this demonstrate that actual infinities are impossible?

> > > I´ve been asking for an acceptable definition
> > > of "actual infinity" and not of "potential infinity"!
> >
> > I would define an "actual infinity" as an existent infinity.
> > Depending on your definition of "complete", including "complete"
> > in the definition of "actual infinity" either begs the
> > question (and thus demonstrates nothing) or leaves the
> > question open (which is how I contend it is).
>
> If completeness is not essential for a set,

Nothing like completeness is mentioned in the formal definitions
of 'set' that I've seen.

> then it´s up to you to explain what an open,
> incomplete yet actual set is and how to construct it.

I assume by "open, incomplete" you mean "not able to have
its members listed in a finite number of steps".
As for "how to construct it", you probably really mean "how to
finish constructing it", to which I would say there is nothing
in the definition of 'set' that requires its construction
or enumeration to be completable in a finite number of steps.

> If you give me a complete and explicit list of all natural numbers

If by "complete" you mean having a definite (i.e. finite) number
of members or having a last member, then of course this is impossible
by the definition of "natural number".

> the best way to show that something is possible is to actualize it!

If an actual infinity could be shown to already exist, then
you wouldn't bother defending your position.  Similarly, if an actual
infinity could be shown to be logically impossible, then I
wouldn't bother defending *my* position. :-)

> > that the measuring process cannot end is in fact what qualifies
> > the thing as "infinitely heavy".
>
> But how could we conceive of a real quantitative effect that renders
> the  accurate measurement of its own cause impossible?

Easily: by dismissing the unproven assumption that any quantity
can be measured in a finite number of steps.

> How can a real "thing" have an infinite quantitative property
> such that the effect of that property eludes all scales?

One way might be if the effect is not a linear function
of the property but rather approaches an asymptote.

> > You can certainly start; you just can't end.
>
> You can´t start measuring what doesn´t exist.

"what doesn't exist": yet another restatement of your premise.
Do you really think you're going to figure out how to restate
your premise in a way that I won't be able to spot? :-)
How long are we going to continue this exercise?

> > there doesn't seem to be a single
> > philosophy reference work that asserts that an actual infinity is
> > logically impossible
>
> It´s just a footnote and not intended to be a substantial argument.

What is "it" here?

> Nevertheless, listening to a
> scientific authority is not always the worst thing to do!

Huh? Don't you mean "not always the best"?  Otherwise, why aren't
you listening to the authorities' lack of a consensus that
actual infinities are impossible?
--
brian@holtz.org
http://humanknowledge.net