5. The proposition “The circle is in the square” is in a certain sense
independent of the assignment of a particular position. (In a certain sense it
is totally unconnected.)
yes – ‘the circle is in the
square – does not address the question of particular position – it leaves that
question – open –
if you assign position – you have
a different and separate proposal
this ‘open’ proposition –
is logically speaking no
different to any other proposal – any other proposition –
a proposal – a proposition – is open to question – open to doubt –
the ‘openness’ – we are talking
about here – is uncertainty –
a proposition is uncertain – a
proposition expresses uncertainty
any claim to the contrary – any
claim of certainty – is no more than pretence –
such claims are not logical –
they are rhetorical
6. The proposition “This circle is in the square” is not a disjunction of
cases.
‘the circle is in the square’ –
is not a disjunctive statement
you could well put forward a
disjunctive proposal regarding position –
but that proposal would be quite
different to ‘the circle is in the square’
on the basis of this proposition
‘the circle is in the square’ – yes the circle has position – and further – the
position of the circle is uncertain
the proposition is
straightforward –
we are dealing fairly and
squarely with uncertainty
and it is not ‘a darkness veiling
possible position etc.’
it is uncertainty in the clear
light of day – as clear as day
if you come from a philosophic
tradition that regards uncertainty as the enemy –
understanding that uncertainty is
the reality – hard and fast –
might require a big conceptual
and psychological shift –
basically you need to divest
yourself of pretence and rhetoric –
get to the clarity of logic
7. The inadequacy of the Frege-Russell notation for generality
Wittgenstein’s question is
whether “('x)”
has the applicability that is claimed for it – has the generality –
‘The proposition “there are only
two things that are circles in this square” (construed on the model of the
proposition “there are only two men who have climbed the mountain”) sounds
crazy with good reason. That is to say nothing is gained by forcing the
proposition “there are two circles in this square into that form; it only helps
to conceal that we haven’t cleared up the grammar of the proposition.’
a proposition is a proposal –
open to question – open to doubt – is uncertain –
this applies whatever form a
proposition takes – be that – as in this case –
notation or ordinary language
and it is clear that we use
different propositional forms for different purposes –
and no formulation used – for
whatever purpose –
is beyond question
can any one form – i.e. logical
notation or ordinary language – be used to apply in all circumstances?
I hate to bring all this crashing
down to earth – but it is really just a question of use –
if a particular form is used – by
a user in all the propositional contexts that he operates in – then you would
be inclined to say – yes –
so generality as an application
is really just a matter of the constant use of a propositional form
does it suit our purposes to use
the one form constantly?
I would think – that as a matter
of fact – the answer is – no –
and obviously so
8. Criticism of my former view of generality
‘My view about general
propositions was that ($x).fx is a logical sum and that though
its terms aren’t enumerated here
they are capable of being enumerated (from the dictionary and the grammar of
language).
For if they can’t be enumerated
we don’t have a logical sum. (A rule, perhaps, for the construction of logical
sums).
Of course the explanation of ($x).fx as a logical sum and of (x). fx as a logical product is indefensible. It went
with an incorrect notion of logical analysis in that I thought that some day
the logical product for a particular ($x).fx would be found. –
Of course it is correct that ($x).fx behaves in some ways like a logical sum and (x). fx like a product; indeed for one use of the words
“all” and ‘some’ my old explanation is correct. – for instance for “all the
primary colours occur in this picture” or “all notes of the C major scale occur
in this theme”. But for cases like “all men die before they are 200 years old”
my explanation is not correct. …’
the logical sum interpretation of ($x).fx – as Wittgenstein himself notes has limited
applicability
the point is that ‘all’ – is open – to interpretation – and one
interpretation – or if you like – one use of ‘all’ – does not close off – or
exclude – other interpretations and uses
if you think you can define a
term a priori – you have it wrong
a word only has meaning in use –
and just what that meaning is – will be open to question – to doubt – will be
uncertain –
and it is this logical uncertainty
– that gives rise to different uses – different interpretations – different
meanings –
as Wittgenstein realised the
logical sum interpretation of ‘all’ – in not all there is to ‘all’ –
and if you are looking for an
account of ‘all’ that covers all possibilities – you misunderstand language –
there is no complete analysis of
any term –
any term – and any analysis – is
‘open’ – that is the point – open –
to question – to doubt
language is uncertain
‘The generality notation of our
ordinary language grasps the logical form even more superficially than I
earlier believed. In this respect it is comparable with the subject-predicate
form.’?
logical form – here – is a theory
of language structure and use –
(by the way – open to question –
open to doubt – uncertain)
so the real question is –
is it ordinary language that is
wanting – relative to such a theory –
a theory expressed in symbolic
logic
or the theory – that is
inadequate relative to ordinary language?
and the answer is yes
the reality is that any form –
will be found to be inadequate relative to another form –
if you believe one form is
authoritative – and the other lacking in authority
and it seems that it is logical
form that gets the authoritative guernsey here from Wittgenstein
we operate with different
propositional forms in different contexts
and the only real ‘authority’ –
is use
this is the reality that has to
be grasped – if we are to have an understanding of language –
an understanding of our world
symbolic logic is a stripped down
language-game –
and an intriguing one at that
the language of logical notation
can serve – does serve – certain purposes –
but the idea that it can or does
or should function as a bedrock to all propositional action is at the best –
fanciful – and at the worst – rhetorical rubbish – based I would suggest on
outmoded authoritarian epistemology
‘Generality is as ambiguous as
the subject-predicate form’?
it is not that generality is
ambiguous – it is uncertain
‘There are many different “alls”
as there are “ones” ‘?
and just what ‘all or ‘one’ –
amounts to is – logically speaking – never clear cut –
these terms are – like any other
proposal – open to question –
and there is no point at which –
logically speaking – the questioning stops
‘So it is no use using the word
“all” for clarification unless we know its grammar in this particular case.’?
even when a grammar – a context –
a use – is proposed –
questions can still be asked –
doubts can always be raised –
so any so called ‘knowledge’ here
– will be uncertain
the reality on the ground – is
just that we do use the word ‘all’ – without
clarification
and I would suggest the reason
for that is not ignorance or incompetence –
but rather a native understanding
– that there will be no definitive clarification –
that the whole point of ‘all’ –
is to leave the matter – open –
open to question
9. The explanation of generality by examples
‘The mental process of
understanding is of no interest to us (any more than the mental process of an
intuition).
“Still there’s no doubt that
someone who understands the examples as arbitrary cases chosen to illustrate
the concept doesn’t understand the same as a man who regards them as a
definitely bounded enumeration.” Quite right, but what does the first man understand that the second doesn’t? Well,
in the things he is shown he sees examples to illustrate certain features; he
doesn’t think I am showing him the things for their own sake as well. –
I would like to call the one
class “logically bounded” and the others “logically unbounded”.’
‘the mental process of
understanding is of no interest to us’?
let’s be clear here – ‘mental
process’ – is an account of – an
‘explanation’ – of understanding –
it is a description – a proposal
– for explaining ‘understanding’ –
and as with any other proposition
put – as an explanation of understanding – it is open to question – open to
doubt – it is uncertain
if such an account ‘is of no
interest to us’ – so be it –
this does not mean however –
that the argument of such a
proposal is not worth considering –
that such a proposal can be of no
use in some context –
we approach the unknown with
different conceptual schemes – different philosophies
different world view
and no one approach – is beyond
question – beyond doubt –
in reality in practise – it is
just a question – an empirical question – of what approach is used – where and
by whom
what is of interest to us – logically
speaking is just what is proposed
– whatever that is
and how that proposition works –
how it is proposed that it works
with any ‘explanatory’
proposition – we are invited to see the world in a certain way –
this is where we begin – to
question – doubt – to deal with the uncertainty – that is at the base of any
proposal – of any proposition
and dealing with proposals – dealing with uncertainty is argument
and yes different proposals –
different propositions – are the currency of understanding
and different proposals –
different descriptions – whether made public
or not – will be different understandings
and yes you can classify these
understandings – these proposals – as ‘logically bounded’ and ‘logically
unbounded’ –
this is just another kind of
description of the different
proposals –
examples – ‘bounded’ or
‘unbounded’ – are proposals – open to question – open to doubt –
windows into uncertainty
‘Yes, but is it really true that
he sees only these features in the things? In a leaf, say, does he see only
what is common to all leaves? That would be as if he saw everything else as
blank like an uncompleted form with the essential features ready printed. (But
the function “f( …)” is just such a form .)
well indeed you could speculate in this way –
once it is understood that the
ground of any proposal is uncertainty – then it is clear that speculation – inventive and fascinating
as it may be – is all we have
‘But what sort of process is it
when someone shows me several different things as examples of a concept to get
me to see what is common to them, and when I look for it and then actually see
it? He may draw my attention to what is common – But by doing this does he make
me see the object differently? Perhaps so; for surely I may take a special look
at one of the parts, when otherwise I would have seen the whole with equal clarity.
But this seeing is not the understanding of the concept. For what we see isn’t
something with an empty argument place’
examples of a concept?
first up a ‘concept’ of – is an
explanation of – what? – a word usage –
and then – explaining – the
concept – via examples?
the giving of examples is a means
of explaining the concept
so the idea is that the concept
should capture – or indicate – possible usage
when you strip this down – what
it amounts to is a proposal – the proposing of examples – of usage
what I see – ‘when someone shows me several different things’ – is a proposal
how I ‘see’ – interpret the proposal – is logically
speaking – an open question
‘But seeing is not the
understanding of the concept’ –
understanding of – whatever – is
whatever I propose – as understanding
–
and any such proposal – will be
open to question – open to doubt –
understanding – is uncertain
‘For what we see isn’t something
with an empty argument place’
when we propose – we propose the argument place
and with each new proposal – a new argument place
the argument and the argument
place are one in the same
language – and therefore the
world – is a constant argument
‘So it is the rules governing the
example that make it an example’ –
and as for ‘rules’ – what you are
talking about here is accepted or proposed propositional practice – in some
context –
a rule – once you divest it of
pretence – is just a proposal – open to question –
the logical reality is that with
or without the ‘rules’ – we are dealing with and in uncertainty at every turn –
‘… and when I hear the word
“plant” it isn’t that there comes before my mind a picture I then describe as a
plant. No I make the application as it were spontaneously.’
either proposal – the picture – or the ‘spontaneous application’ – is an explanation of what happens
in the absence of any explanation
– what happens is – unknown –
the action of proposing – is the
action of knowing
any ‘knowledge’ we operate with
is uncertain – open to question – to revision – to doubt
when I put forward a different
proposal to what you propose – or a different ‘explanation’
can I be sure that I know what it
is you mean – and can you be sure that you know what I am saying?
no – the matter is uncertain
when I operate with a similar –
or even identical proposal or explanation –– to the one you put – can I be sure
that I know what you are proposing – and that you know what I am proposing?
no – the matter is uncertain
yet it is just this uncertainty
that is the traffic of our communication –
that I might decide that I know
what you are on about – is at best a pragmatic decision
it is a decision to proceed – in order to proceed –
and to proceed in uncertainty
‘The only thing of interest to us
is the exact relationship between the
example and the behaviour that accords with it”
the relationship between an
example and the behaviour that accords with it –
is a matter of perception in the
first place – and as for any statement regarding the relationship – any such
proposal will be open to question – open to doubt – will be uncertain
and if so – what sense can you
make of ‘exactness’?
surely any claim of ‘exactness’
can only be rhetorical
‘The example is a point of
departure for further calculation’ –
the ‘example’ is an invitation –
an invitation to propositional inquiry –
it is a devise of usage – a focus
for – the adventure that is –
uncertainty
‘There is one thing I always want
to say to clarify the distinction between instances that are offered as
examples for a concept and instances that make up a definite closed group in
the grammar … F(a, b, c, d, e) is the disjunction of all the cases we have
actually used, but there is also other cases (we won’t of course mention any)
that make true the general proposition “F(a, b, c, d, …)”. And here of course
we can’t put the general proposition in place of F(a, b, c, d, e).’
F(a, b, c, d, e) is a disjunction
– and therefore – closed –
the disjunction – is a bounded
statement – a bounded generality
“F(a, b, c, d, …)” – is an unbounded
statement – an unbounded generality
what we are talking about here is
restricted generality – and unrestricted generality –
here are two ways in which the
‘concept’ generality is defined – is used
’So this is how it is: “bring me
a flower” can never be replaced by an order of the form “bring me a or b or c”,
but must always be “bring me a or b or c or some other flower”?
But why does the general sentence
behave so indeterminately when every case which actually occurs is something I
could have described in advance?
But even that seems to me not to
get to the heart of the matter; because what matters I believe, isn’t really
the infinity of the possibilities, but a kind of indeterminacy. Indeed if I
were asked how many possibilities a circle in the visual field has of being
within a particular square, I could neither name a finite number, nor say that
there are infinitely many (as in a Euclidean plane). Here, although we don’t
ever come to an end, the series isn’t endless in the way in which ½1, x, x + 1 | is.
Rather , no end to which we come
is really the end; that is, I could always say: I don’t understand why these
should be all the possibilities. – And doesn’t that just mean that it is
senseless to speak of “all the possibilities”? So enumeration doesn’t touch the
concepts “plant” and “egg” at all.’
so this is how it is – yes a
disjunctive statement is quite different
– to an unrestricted general statement
‘when every case is something I
could have described in advance’?
any proposal for ‘every case’ –
will be open to question – to doubt – will be uncertain
one shouldn’t get ahead of
oneself – in logic or in life
‘what matters is a kind of
indeterminacy’ –
yes – and at the heart of
indeterminacy – is uncertainty
‘no end to which we come is
really the end’
yes – any proposal is open to
question – open to doubt – is uncertain
‘ends’ – are not logical – they
are pragmatic points – for moving on
‘senseless to speak of all
possibilities’?
it is never senseless to leave a
matter open – it is to be logical
‘So enumeration doesn’t touch the
concepts “plant” and “egg” at all.’?
well it does touch them – perhaps only just – but touch them it does
the point is any explication of a term – is open to question – to doubt – is
uncertain
logically speaking there is no
complete analysis of any term –
there is only what occurs –
by way of explication – by way of
proposal –
we are fooled by syntax – into
thinking that words – are definite –
language – in whatever
presentation – is argument –
and it is as ongoing – as you
want it to be – need it to be – are prepared for it to be –
we are in the practise of life –
limited –
limited by time by space and our
very human concerns –
logic – not so
‘I would like to say: in grammar
nothing is supplementary, no stipulations come after others, everything is
there simultaneously.’
grammar here is a gaming of language – a structuring of
language
there are obviously good reasons
for this
it enables functionality at a
basic level – on a common platform
for ‘grammar’ to have
functionality – to enable functionality – however – there must be adherence to its rules – by language users –
that is the game must have
players – and players who play according to rules –
what this comes down to is the
pragmatics of language
a proficient game player – plays
well according to the rules
a player who doesn’t play
proficiently – let us say haphazardly – relative to the rules –
(and this would be most of us –
most of the time – I would suggest –)
still uses language – and
who’s to say – ineffectively?
yes the well constructed game –
leaves nothing out – really if it did – it would be a failure as a game
whether in fact language actually
operates in accordance with such a model – is quite another question
how language is used – what
grammar – or grammars people operate with – is open to question – to doubt – is
in fact – uncertain
the point is – you can look at
language use – and develop a theory from what you observe – all to the good –
really all you have with language
– is action – bare and bold – action
that works –
the why and the how – are
actually irrelevant – to the brute fact of language use
all you can say of a language
users who don’t operate with your grammar – is that they don’t –
and perhaps the consequence is
that you don’t get what they are on about – that you don’t understand them –
perhaps they say the same of you?
we are indeed used to everyone
communicating with each other – or at least using language at each other –
be a big job to find out if
everyone is following the rules – and who’s rules they are
and if they weren’t being
followed what would be the difference?
you are still faced with the
logical reality that whatever is proposed –
is open to question to doubt – is
uncertain –
‘What is said about enumeration
of individual cases cannot ever be a roundabout explanation of generality.’
enumeration might be a way of
defining generality – of dealing with
generality –
is that how it is used – as an
illustration of generality in a particular context?
and look if generality is to have
some use for us – mustn’t it be made usable?
otherwise you could say – no
better case for Oakum’s razor
and really isn’t it the case that
generality is always ‘cut down’ – placed in a domain –
given definition – given context
– i.e. ‘all plants’ – is not meant to be a reference to ‘all trees’?
my point is I suppose – we
‘explain’ generality – just by how we use the concept –
that is the reality
the concept – really has no
significance – outside of use – it’s not in fact there
and how the ‘concept’ – is used –
as with any other concept – is open to question – to doubt – is always – on the ground – uncertain
finally –
you can play this conceptual game
– with all its complexity – i.e. rules – but as presented here by Wittgenstein
– it is essentially a priori –
the question is whether this
explanation of usage – is useful?
if in some context – this
conceptual – a priori proposal bears fruit – then I suppose
the answer will be – yes
my point really is that any
‘explanation’ of usage – is usage –
so logically speaking we can drop
this notion of ‘explanation’ – as a superfluity –
and as to how ‘examples’ work –
that too is a question of context – of usage
we have proposals – and proposals
in relation to proposals – that’s the story – that’s language use
as for ‘generality’ – it is a
classificatory proposal – that
becomes redundant – once you realise that any
proposal is – logically speaking – open
– ‘unbounded’ –
in practise we may pretend
‘boundedness’ – even ‘definitiveness’ –
this is behaviour – not logic –
pragmatic yes – but not logical
a general word – a general
proposition – is an invitation to question – to doubt – to uncertainty –
an invitation to the
propositional life
10. The law of a series “And so on”
‘The expression “and so on” is
nothing but the expression “and so on” (nothing, that is but a sign in a
calculus which can’t do more than have meaning via the rules that hold it;
which can’t say more than it shows).
That is, the expression “and so
on” does not harbour a secret power by which the series is continued without
being continued.’
‘The expression “and so on” is
nothing but the expression “and so on”’?
yes – and no –
the expression is never used –
without definition – without
context – i.e. ‘a sign in the calculus’ –
and yes – in any language game in
which it is used – it will have definition in terms of the rules of that game
a sign – any sign – only has
significance – in terms of some explication – some proposal for meaning
‘which can’t say more than it
shows’?
once an interpretation has been
adopted – then yes that is what it shows –
this is a pragmatic point
logically speaking – a sign – any
sign – is open to question – open to doubt –
is uncertain
‘That is, the expression “and so
on” does not harbour a secret power by which the series is continued without
being continued.’
this strikes me as obvious –
however that is not really the
point here –
how the expression ‘and so on’ –
is interpreted – how it is used –
is logically speaking – an open matter –
‘Of course it doesn’t contain that, you will say, but still it
contains the meaning of infinite continuation.’
well perhaps – perhaps not –
it depends who’s using it and in
what context
again it is a question of use –
and ‘use’ – is language use –
open to question – open to doubt
– uncertain
‘But we might ask: how does it
happen that someone who now applies the general rule to a further number is
still following this rule? How does
it happen that no further rule was necessary to allow him to apply the general
rule to this case in spite of the fact that this case was not mentioned in the
general rule?
And so we are puzzled that we
can’t bridge over the abyss between individual numbers and the general
proposition.
“Can one imagine an empty space?”
(Surprisingly, this is where this question belongs.)
It is one of the most deep rooted
mistakes of philosophy to see possibility as a shadow of reality.
But on the other hand it can’t be
an error; not even if one calls the proposition such a shadow.’
‘in spite of the fact that this
case was not mentioned in the general rule’?
it really does depend on how you interpret the general rule –
if you regard it as open – what doesn’t it
include?
‘possibility as a shadow of
reality’? –
this is poetry –
the logical reality is –
uncertainty –
and what that means is that how
we interpret any proposal – any proposition – even within an operating
interpretation – is open to question – open to doubt –
‘possibility’ – without the
poetics –
is propositional uncertainty
‘What troubles me is that the
“and so on” apparently has to occur in the rules for the sign “and so on.” For
instance, 1 + 1 and so on. = . 1 + 1 + 1 and so on, and
so on.”
as I interpret it – ‘and so on’ – is
a direction for use –
the sign ‘and so on’ is a rule
any rule – stated – made pubic –
is a sign
in ‘1+1 and so on’ – the ‘and so
on’ – refers to the action to be taken
with ‘1+1’ –
so we have a rule – for ‘1+1’ –
now do you include the rule in
the equation?
yes – for clear direction –
does it look strange on either
side of an ‘=’ sign?
perhaps – if you think the equals
sign only applies to ‘determinate’ propositions – determinate process – determinate states of affairs
in this case – it doesn’t –
no big adjustment I would think
‘The possibility of introducing
further numbers. The difficulty seems to be that the numbers I’ve in fact
introduced aren’t a group that is essential and yet there is nothing to
indicate that they are an arbitrary collection: Out of all numbers just those
numbers that have been written down.’
there is no essence / accident
issue here –
there is simply a learned
language behaviour – a learned practise
in the same way as there is no
grammar to ordinary language use –
yes – we have ‘explanation’ of
ordinary language use –
but then the question can always
be asked – what is the grammar of this grammar?
in reality we have different
languages – different language uses –
how and why this has come about –
is in the realm of speculation –
speculation which can be very
productive and useful
we learn forms of use – forms of
practise
introducing further numbers is no
more mysterious than – introducing further words –
it is what we do – when we do it
and in general we do it within
established forms – in accordance with accepted practise –
which we can if we wish to –
speculate upon –
such speculation has led to the
development of logics –
proposals to explain language use
– sign usage –
at the heart of the matter is
this:
any ‘explanation’ is open to
question – is open to doubt – is uncertain
I would suggest anyone who deals
in explanation understands this reality – intuitively
as to why we explain – again a
matter of speculation –
I would suggest the reason is –
for the pure excitement of – facing and exploring – uncertainty
‘and so on’ – is such a
pedestrian phrase – and that is as it should be –
for what it expresses – is nothing startling – it is in fact
ordinary everyday behaviour across the board –
philosophy may leave everything
as it is –
but not before dressing it up –
and dressing it down – in all manner of costume
‘What do we see “1, 1+1, 1 +1 +1….” as?
As an inexact form of expression.
The dots are like extra numerals indistinctly visible.
It is as if we stopped writing
numerals, because after all we can’t write them all down, but as if they are
all there all right in a kind of
box. Again, it is something like when I sing only the first notes of a melody
distinctly, and then merely hint at the rest and let it taper off into nothing.
(Or when in writing one writes only a few letters of a word distinctly and ends
with an unarticulated line.) In all such
cases the indistinctly has a distinctly corresponding to it.’
‘what do we see “1, 1+1, 1 +1 +1 ….” as?
the expression ‘1, 1+1, 1 +1 +1
….’ – has no meaning outside of interpretation –
and the context in which it is
used will determine how it is seen – which is to say how it is used
when I look at “1, 1+1, 1 +1 +1 ….” -
I see a directive – a directive
to – ‘keep going’ –
and to keep going in the way
already described
(Wittgenstein when asked by
Malcolm what it was he liked to eat – said he liked to eat anything – so long
as it was the same)
‘We are inclined to believe that
the notation that gives a series by writing down a few terms plus the sign “and
so on” is essentially inexact, by contrast with the specification of the
general term.’
as to exactness –
any proposal – in any form is
open to question – open to doubt – is uncertain –
and this includes any rules for
its use – and the system in which it is used
any claim of exactness is open to
question – and for that matter any claim of inexactness –
the issue is not exactness or
inexactness – it is function and utility
and the function and utility of
any proposal is open to question – open to doubt –is uncertain
Wittgenstein concludes here –
‘Is this notation inexact?
(referring to a line of logical notation). It isn’t supposed by itself to make
anything graphic: all that matters are the rules for its use, the system in
which it is used. The scruples attaching to it date from a train of thought
which concerned itself with the number of primitive signs in the calculus of Principia Mathematica.’
the search for propositional
certainty is naive –
it is pre-logical
© greg t. charlton. 2015.
