> Lance

> Lance

> Lance

> Lance

> On Jul 2, 2:46 am, Gary <LanceG...@gmail.com> wrote:

> > This is a somewhat poorly formed question but the problem it
> > represents has troubled me several times in my career. Essentially
> > many theories may state that a particular phenomenon exists either as
> > a dimension or as a set of discrete categories. For example Reversal
> > Theory in psychology states (amongst other things) that a person is
> > either in a telic (purpose driven, arousal avoiding, future oriented)
> > mode or in a paratelic (activity driven, arousal seeking, present
> > oriented) mode and that people can't be somewhere "inbetween" the two
> > modes. So Reversal theory is positing a set of two discrete categories
> > and strongly claims that all people are in one or other of the two
> > states and that there is no continuum between them. Similarly Fulda
> > developed a mathematical model of the pull of temptation and asserts
> > that the model works on discrete moments of thought (in other words
> > the probabilities of temptation that are being modelled are discrete
> > and not continuous). In my experience it is really hard to devise
> > tests for claims of this kind. I wondered whther there are any
> > existing statistical tests designed to to test hypotheses of this
> > kind, or whether there are procedures and designs suitable for testing
> > such claims?

> > Lance

> Look up 'taxometrics', which claims to be able to identify discrete
> phenomena. I don't think it can, but many people do.- Hide quoted text -

> Hi Lance,

> These claims seem meaningless as scientific statements, unless there
> is some way to relate the state someone is in to something measurable.
> Obviously if you could measure the state directly, then in the two-
> state case you would only ever see two outcomes, which seems pretty
> clear cut. So I presume the state is inferred from some other form of
> measurement. What would that be?

> illywhacker;

> > Lance

> Look up 'taxometrics', which claims to be able to identify discrete
> phenomena. I don't think it can, but many people do.

> > Lance

> In some instances a phenomenon is finely discrete, e.g., an integer,
> instead of continuous, e.g., a real number.  Let's just call both
> cases "practically continuous."  The first thing that you need to do
> define a practically continuous metric, make measurements with this
> metric, and plot a histogram.  If the histogram has gaps larger than
> the discretization of the metric, the phenomenon is not practically
> continuous.

> For example, to measure schizophrenia, one might construct a
> practically continuous metric Yj = sum Ai/Bi, i = 1 to N

> where

> N = Number of false beliefs that a jth individual has

> Ai = Strength of conviction (certainty) for ith false belief

> Bi = Proportion of population with ith (identical) false belief (to
> reduce the influence of mass delusions from popular religions and
> Obama)

> Then you make measurements on many individuals and plot the
> histogram.  If the histogram has big gaps, the schizophrenia is not
> practically continuous.  You can bet it would be bell shaped like that
> of IQ.  Of course, you have to know which beliefs are false to measure
> their number.  So, dumb F psychologists without thermometers classify
> things as hot or cold.

> > Lance
> Your post is an example of discrete. A symbol, a word, a sentence
> either exists, and can be counted, or it is not present at all.
> Discrete occurences can be tested and evaluated as discrete, e.g. by
> Poisson distribution. When occurences are numerous, this distribution
> transforms into continuous distribution.
> kunzmilan

> > On Jul 2, 2:46 am, Gary <LanceG...@gmail.com> wrote:

> > > This is a somewhat poorly formed question but the problem it
> > > represents has troubled me several times in my career. Essentially
> > > many theories may state that a particular phenomenon exists either as
> > > a dimension or as a set of discrete categories. For example Reversal
> > > Theory in psychology states (amongst other things) that a person is
> > > either in a telic (purpose driven, arousal avoiding, future oriented)
> > > mode or in a paratelic (activity driven, arousal seeking, present
> > > oriented) mode and that people can't be somewhere "inbetween" the two
> > > modes. So Reversal theory is positing a set of two discrete categories
> > > and strongly claims that all people are in one or other of the two
> > > states and that there is no continuum between them. Similarly Fulda
> > > developed a mathematical model of the pull of temptation and asserts
> > > that the model works on discrete moments of thought (in other words
> > > the probabilities of temptation that are being modelled are discrete
> > > and not continuous). In my experience it is really hard to devise
> > > tests for claims of this kind. I wondered whther there are any
> > > existing statistical tests designed to to test hypotheses of this
> > > kind, or whether there are procedures and designs suitable for testing
> > > such claims?

> > > Lance

> > Look up 'taxometrics', which claims to be able to identify discrete
> > phenomena. I don't think it can, but many people do.- Hide quoted text -

> I agree with you! Don't these people take 'Scientific Method 101'
> before they are let loose on patients?

> illywhacker;

> > Hi Lance,

> > These claims seem meaningless as scientific statements, unless there
> > is some way to relate the state someone is in to something measurable.
> > Obviously if you could measure the state directly, then in the two-
> > state case you would only ever see two outcomes, which seems pretty
> > clear cut. So I presume the state is inferred from some other form of
> > measurement. What would that be?

> > illywhacker;

> I just tried to give some examples - but obviously they were very
> brief without any defence of the ideas. I don't think the sort of
> question I was posing is unique to psychology - I'm not a physicist
> but my memories of high school physics include the idea of quanta and
> that electrons had to choose particular distances from nuclei, and the
> like, so the same kind of question occurs elsewhere in other
> subjects.

> In reversal theory (the example I started with) the argument is pretty
> common sense really. It is the idea that we experience the content of
> our minds and the feelings our body generates in discrete but bi-
> stable ways. So when you are relaxing in the evening you might not
> mind that nothing much is happening - you will take that as
> pleasureable and not seek arousal and not be worried that your goals
> are not being achieved. But there are other occasions when the same
> absense of stimulation is experienced as boredom, and you feel you
> should be doing something and accomplishing something and you worry
> about achiving larger goals. I could go on but there is a great deal
> of data to support the idea that different approaches to mental
> content can exist in the same individual at different times. The
> theory claims that the meta states (discrete, notice) are bi-stable
> and quite abrupt switches can occur between them. You are, for
> example, a thrill seeker and love riding on a roller coaster, and when
> on a roller coaster you enjoy the arousal that the experience
> provides. But imagine looking forward across the approaching dip in
> the roller coaster ride and noticing a break in the rails. Suddenly
> your enjoyment of the arousal can turn to an extremely unpleasant
> experience of arousal - fear and anxiety. The same mental content
> (high arousal) but experienced differently.

> Phenomenologically most people find reversal theory quite convincing
> (try to read some of the appers and see for your self). Obviously
> there are measurable things involved - arousal level can be measured,
> so can "hedonic tone" (heck that dates back to Wundt) and the like.
> But to test reversal theory one would need to rule out the middle
> ground. One would need to show that high levels of arousal cannot be a
> matter of indifference for a person - they must be experienced as
> something pleasant (exciting, thrilling, exhilirating) or as something
> unpleasant (anxiety, fear, dread, shock, etc). So one needs to show
> that there is not a continuum in the way people experience high
> arousal but rather two discrete ways in which the mental content and
> feelings can be taken. Similar remarks can be made for low arousal
> levels (very low arousal can either be relaxed, pleasant, a precursor
> to sleep) or boredom, vacuity, dullness). Anyway,

> My question was I agree simple (maybe stupid). Most statistical tests
> that I know of look for differences in means, or averages (and when
> you average across arousal experience you obviously get something like
> the Yerkes-Dodson law, that there is an "optimum level" of arousal -
> but Reversal Theory would claim that average conceals the underlying
> bi-stable dynamic). One can of course play with the mathematics - I
> think Clyde Coombs once published an article where he tried to show
> that all single peaked preference curves (which are unbiquitous in
> Psychology) could be explained as the average of two opposite
> tendencies. I could find the refeence in the Psychological Bulletin if
> you desire. But my question was really an attempt to try to get away
> from the creation of single-peaked average curves and test the sort of
> claims that are being made - that these preference curves actually are
> the result of a underlying dynamic of discrete but alternating states.
> I understand that perhaps I am just being idiotic, or displaying
> ignorance. But if I am an idiot or ignorant I would like to discover
> why I'm an idiotic or where my ignorance lies.

> Lance- Hide quoted text -

> - Show quoted text -

> > > On Jul 2, 2:46 am, Gary <LanceG...@gmail.com> wrote:

> > > > This is a somewhat poorly formed question but the problem it
> > > > represents has troubled me several times in my career. Essentially
> > > > many theories may state that a particular phenomenon exists either as
> > > > a dimension or as a set of discrete categories. For example Reversal
> > > > Theory in psychology states (amongst other things) that a person is
> > > > either in a telic (purpose driven, arousal avoiding, future oriented)
> > > > mode or in a paratelic (activity driven, arousal seeking, present
> > > > oriented) mode and that people can't be somewhere "inbetween" the two
> > > > modes. So Reversal theory is positing a set of two discrete categories
> > > > and strongly claims that all people are in one or other of the two
> > > > states and that there is no continuum between them. Similarly Fulda
> > > > developed a mathematical model of the pull of temptation and asserts
> > > > that the model works on discrete moments of thought (in other words
> > > > the probabilities of temptation that are being modelled are discrete
> > > > and not continuous). In my experience it is really hard to devise
> > > > tests for claims of this kind. I wondered whther there are any
> > > > existing statistical tests designed to to test hypotheses of this
> > > > kind, or whether there are procedures and designs suitable for testing
> > > > such claims?

> > > > Lance

> > > Look up 'taxometrics', which claims to be able to identify discrete
> > > phenomena. I don't think it can, but many people do.- Hide quoted text -

> > I agree with you! Don't these people take 'Scientific Method 101'
> > before they are let loose on patients?

> > illywhacker;

> Who do you think has no grasp of scientific method? If it is me, OK, I
> know I am stupid and ignorant. If it is Paul Meehl I do suggest that
> you read some of his papers. He seems to me to be an extremely subtle
> thinker.

> Cheers

> lance- Hide quoted text -

> - Show quoted text -

> > > Lance
> > Your post is an example of discrete. A symbol, a word, a sentence
> > either exists, and can be counted, or it is not present at all.
> > Discrete occurences can be tested and evaluated as discrete, e.g. by
> > Poisson distribution. When occurences are numerous, this distribution
> > transforms into continuous distribution.
> > kunzmilan

> This sounds profound to me but I'm not sure that I can apply it to
> sort of examples I was offering. In Fulda's account of weakness of
> will, he asks you to imagine two cases, where a person X and a person
> Y are confined to particular rooms. In one room a person X of very
> strong character and high moral principles is confined along with some
> object of temptation. Perhaps the temptation is a bribe, or perhaps a
> very beautiful woman who is not his wife. Anyway, being of good
> character the Person X is capable of resisting temptation so
> effectively that he will obly succumb once in a hundred temptations.
> But here he is, exposed to the object of temptation and unable to get
> away. Now Fulda reasons that in this situation, person X is still very
> likely to succumb to the temptation because everytime his mind moves
> off whatever he is using to distract his thoughts the temptation will
> be there again, and over the course of time he will likely experience
> more than a hundred occasions of temptation. In the other room is a
> person Y who is of poor character and very weak willed. He will be
> able to resist temptation only once in a hundred times. Again his
> temptation is there before him. However, in his case, his room has a
> button that if pushed, will whisk the temptation away so that it can
> no longer be reached or enjoyed. Just that one push will be enough to
> save person Y from moral failure. Now Fulda argues that person Y only
> needs one moment of strength to save his virture. So he argues person
> Y (though very weak willed) will be likely to emerge from the room
> unscathed by moral failure, unlike person X (who of course was very
> strong willed). One objection raised to Fulda's argument, for what it
> is worth, is that the probabilities involved would not be discrete (as
> his argument suggests - particular moments of temptation - but would
> be continuous, and that therefore the argument does not hold. What do
> you think? How can Fulda support his claim (perhaps using pigeons in
> Skinner boxes as George Ainslie did, to avoid ethical objections)?
> What kind of evidence would count?

> Lance- Hide quoted text -

> - Show quoted text -

> > kunzmilan wrote:
> > > On 2 čnc, 11:46, Gary <LanceG...@gmail.com> wrote:
> > > > This is a somewhat poorly formed question but the problem it
> > > > represents has troubled me several times in my career. Essentially
> > > > many theories may state that a particular phenomenon exists either as
> > > > a dimension or as a set of discrete categories. For example Reversal
> > > > Theory in psychology states (amongst other things) that a person is
> > > > either in a telic (purpose driven, arousal avoiding, future oriented)
> > > > mode or in a paratelic (activity driven, arousal seeking, present
> > > > oriented) mode and that people can't be somewhere "inbetween" the two
> > > > modes. So Reversal theory is positing a set of two discrete categories
> > > > and strongly claims that all people are in one or other of the two
> > > > states and that there is no continuum between them. Similarly Fulda
> > > > developed a mathematical model of the pull of temptation and asserts
> > > > that the model works on discrete moments of thought (in other words
> > > > the probabilities of temptation that are being modelled are discrete
> > > > and not continuous). In my experience it is really hard to devise
> > > > tests for claims of this kind. I wondered whther there are any
> > > > existing statistical tests designed to to test hypotheses of this
> > > > kind, or whether there are procedures and designs suitable for testing
> > > > such claims?

> > > > Lance
> > > Your post is an example of discrete. A symbol, a word, a sentence
> > > either exists, and can be counted, or it is not present at all.
> > > Discrete occurences can be tested and evaluated as discrete, e.g. by
> > > Poisson distribution. When occurences are numerous, this distribution
> > > transforms into continuous distribution.
> > > kunzmilan

> > This sounds profound to me but I'm not sure that I can apply it to
> > sort of examples I was offering. In Fulda's account of weakness of
> > will, he asks you to imagine two cases, where a person X and a person
> > Y are confined to particular rooms. In one room a person X of very
> > strong character and high moral principles is confined along with some
> > object of temptation. Perhaps the temptation is a bribe, or perhaps a
> > very beautiful woman who is not his wife. Anyway, being of good
> > character the Person X is capable of resisting temptation so
> > effectively that he will obly succumb once in a hundred temptations.
> > But here he is, exposed to the object of temptation and unable to get
> > away. Now Fulda reasons that in this situation, person X is still very
> > likely to succumb to the temptation because everytime his mind moves
> > off whatever he is using to distract his thoughts the temptation will
> > be there again, and over the course of time he will likely experience
> > more than a hundred occasions of temptation. In the other room is a
> > person Y who is of poor character and very weak willed. He will be
> > able to resist temptation only once in a hundred times. Again his
> > temptation is there before him. However, in his case, his room has a
> > button that if pushed, will whisk the temptation away so that it can
> > no longer be reached or enjoyed. Just that one push will be enough to
> > save person Y from moral failure. Now Fulda argues that person Y only
> > needs one moment of strength to save his virture. So he argues person
> > Y (though very weak willed) will be likely to emerge from the room
> > unscathed by moral failure, unlike person X (who of course was very
> > strong willed). One objection raised to Fulda's argument, for what it
> > is worth, is that the probabilities involved would not be discrete (as
> > his argument suggests - particular moments of temptation - but would
> > be continuous, and that therefore the argument does not hold. What do
> > you think? How can Fulda support his claim (perhaps using pigeons in
> > Skinner boxes as George Ainslie did, to avoid ethical objections)?
> > What kind of evidence would count?

> > Lance- Hide quoted text -

> > - Show quoted text -

> "It is the idea that we experience the content of
> our minds and the feelings our body generates in discrete but bi-
> stable ways. So when you are relaxing in the evening you might not
> mind that nothing much is happening - you will take that as
> pleasureable and not seek arousal and not be worried that your goals
> are not being achieved."

> That sounds like asleep vs. awake which I agree is bistable.
> Otherwise, I haven't noticed much bistability.  For example, the
> degrees of my hunger, thirst, or pain seems continuous.

> > illywhacker wrote:
> > > On Jul 2, 11:46 am, Gary <LanceG...@gmail.com> wrote:
> > > > This is a somewhat poorly formed question but the problem it
> > > > represents has troubled me several times in my career. Essentially
> > > > many theories may state that a particular phenomenon exists either as
> > > > a dimension or as a set of discrete categories. For example Reversal
> > > > Theory in psychology states (amongst other things) that a person is
> > > > either in a telic (purpose driven, arousal avoiding, future oriented)
> > > > mode or in a paratelic (activity driven, arousal seeking, present
> > > > oriented) mode and that people can't be somewhere "inbetween" the two
> > > > modes. So Reversal theory is positing a set of two discrete categories
> > > > and strongly claims that all people are in one or other of the two
> > > > states and that there is no continuum between them. Similarly Fulda
> > > > developed a mathematical model of the pull of temptation and asserts
> > > > that the model works on discrete moments of thought (in other words
> > > > the probabilities of temptation that are being modelled are discrete
> > > > and not continuous). In my experience it is really hard to devise
> > > > tests for claims of this kind. I wondered whther there are any
> > > > existing statistical tests designed to to test hypotheses of this
> > > > kind, or whether there are procedures and designs suitable for testing
> > > > such claims?

> > > Hi Lance,

> > > These claims seem meaningless as scientific statements, unless there
> > > is some way to relate the state someone is in to something measurable.
> > > Obviously if you could measure the state directly, then in the two-
> > > state case you would only ever see two outcomes, which seems pretty
> > > clear cut. So I presume the state is inferred from some other form of
> > > measurement. What would that be?

> > > illywhacker;

> > I just tried to give some examples - but obviously they were very
> > brief without any defence of the ideas. I don't think the sort of
> > question I was posing is unique to psychology - I'm not a physicist
> > but my memories of high school physics include the idea of quanta and
> > that electrons had to choose particular distances from nuclei, and the
> > like, so the same kind of question occurs elsewhere in other
> > subjects.

> > In reversal theory (the example I started with) the argument is pretty
> > common sense really. It is the idea that we experience the content of
> > our minds and the feelings our body generates in discrete but bi-
> > stable ways. So when you are relaxing in the evening you might not
> > mind that nothing much is happening - you will take that as
> > pleasureable and not seek arousal and not be worried that your goals
> > are not being achieved. But there are other occasions when the same
> > absense of stimulation is experienced as boredom, and you feel you
> > should be doing something and accomplishing something and you worry
> > about achiving larger goals. I could go on but there is a great deal
> > of data to support the idea that different approaches to mental
> > content can exist in the same individual at different times. The
> > theory claims that the meta states (discrete, notice) are bi-stable
> > and quite abrupt switches can occur between them. You are, for
> > example, a thrill seeker and love riding on a roller coaster, and when
> > on a roller coaster you enjoy the arousal that the experience
> > provides. But imagine looking forward across the approaching dip in
> > the roller coaster ride and noticing a break in the rails. Suddenly
> > your enjoyment of the arousal can turn to an extremely unpleasant
> > experience of arousal - fear and anxiety. The same mental content
> > (high arousal) but experienced differently.

> > Phenomenologically most people find reversal theory quite convincing
> > (try to read some of the appers and see for your self). Obviously
> > there are measurable things involved - arousal level can be measured,
> > so can "hedonic tone" (heck that dates back to Wundt) and the like.
> > But to test reversal theory one would need to rule out the middle
> > ground. One would need to show that high levels of arousal cannot be a
> > matter of indifference for a person - they must be experienced as
> > something pleasant (exciting, thrilling, exhilirating) or as something
> > unpleasant (anxiety, fear, dread, shock, etc). So one needs to show
> > that there is not a continuum in the way people experience high
> > arousal but rather two discrete ways in which the mental content and
> > feelings can be taken. Similar remarks can be made for low arousal
> > levels (very low arousal can either be relaxed, pleasant, a precursor
> > to sleep) or boredom, vacuity, dullness). Anyway,

> > My question was I agree simple (maybe stupid). Most statistical tests
> > that I know of look for differences in means, or averages (and when
> > you average across arousal experience you obviously get something like
> > the Yerkes-Dodson law, that there is an "optimum level" of arousal -
> > but Reversal Theory would claim that average conceals the underlying
> > bi-stable dynamic). One can of course play with the mathematics - I
> > think Clyde Coombs once published an article where he tried to show
> > that all single peaked preference curves (which are unbiquitous in
> > Psychology) could be explained as the average of two opposite
> > tendencies. I could find the refeence in the Psychological Bulletin if
> > you desire. But my question was really an attempt to try to get away
> > from the creation of single-peaked average curves and test the sort of
> > claims that are being made - that these preference curves actually are
> > the result of a underlying dynamic of discrete but alternating states.
> > I understand that perhaps I am just being idiotic, or displaying
> > ignorance. But if I am an idiot or ignorant I would like to discover
> > why I'm an idiotic or where my ignorance lies.

> > Lance- Hide quoted text -

> > - Show quoted text -

> No one (least of all me) was suggesting that you are idiotic. Everyone
> is ignorant, as Socrates told us. I just find it hard to know what you
> are talking about when many of the words you use are so poorly
> defined. What is a mental state? Why is introspection relevant? Does a
> psycholgical state exist in any meaningful sense (certainly it does
> not exist in the way a chair exists)? I am afraid I view this kind of
> psychology as akin to fiction, in that it provides metaphors and ways
> of talking about ourselves that are useful. This is absolutely not an
> insult. It does mean, however, that applying scientific techniques to
> it misses the point rather.

> Having said that: equilibria (if that is the right way to think of
> 'mental states' that are in some sense stable in time) are necessarily
> (unless there is a continuous symmetry), points in some space of
> states, since they are local minima of some potential. Passing from
> one to another as a parameter varies is often, although not always) a
> discontinuous process. Check out first- and second-order phase
> transitions or catastrophe theory.

> illywhacker;

> > On Jul 3, 2:30 pm, Gary <LanceG...@gmail.com> wrote:

> > > illywhacker wrote:
> > > > On Jul 2, 11:46 am, Gary <LanceG...@gmail.com> wrote:
> > > > > This is a somewhat poorly formed question but the problem it
> > > > > represents has troubled me several times in my career. Essentially
> > > > > many theories may state that a particular phenomenon exists either as
> > > > > a dimension or as a set of discrete categories. For example Reversal
> > > > > Theory in psychology states (amongst other things) that a person is
> > > > > either in a telic (purpose driven, arousal avoiding, future oriented)
> > > > > mode or in a paratelic (activity driven, arousal seeking, present
> > > > > oriented) mode and that people can't be somewhere "inbetween" the two
> > > > > modes. So Reversal theory is positing a set of two discrete categories
> > > > > and strongly claims that all people are in one or other of the two
> > > > > states and that there is no continuum between them. Similarly Fulda
> > > > > developed a mathematical model of the pull of temptation and asserts
> > > > > that the model works on discrete moments of thought (in other words
> > > > > the probabilities of temptation that are being modelled are discrete
> > > > > and not continuous). In my experience it is really hard to devise
> > > > > tests for claims of this kind. I wondered whther there are any
> > > > > existing statistical tests designed to to test hypotheses of this
> > > > > kind, or whether there are procedures and designs suitable for testing
> > > > > such claims?

> > > > Hi Lance,

> > > > These claims seem meaningless as scientific statements, unless there
> > > > is some way to relate the state someone is in to something measurable.
> > > > Obviously if you could measure the state directly, then in the two-
> > > > state case you would only ever see two outcomes, which seems pretty
> > > > clear cut. So I presume the state is inferred from some other form of
> > > > measurement. What would that be?

> > > > illywhacker;

> > > I just tried to give some examples - but obviously they were very
> > > brief without any defence of the ideas. I don't think the sort of
> > > question I was posing is unique to psychology - I'm not a physicist
> > > but my memories of high school physics include the idea of quanta and
> > > that electrons had to choose particular distances from nuclei, and the
> > > like, so the same kind of question occurs elsewhere in other
> > > subjects.

> > > In reversal theory (the example I started with) the argument is pretty
> > > common sense really. It is the idea that we experience the content of
> > > our minds and the feelings our body generates in discrete but bi-
> > > stable ways. So when you are relaxing in the evening you might not
> > > mind that nothing much is happening - you will take that as
> > > pleasureable and not seek arousal and not be worried that your goals
> > > are not being achieved. But there are other occasions when the same
> > > absense of stimulation is experienced as boredom, and you feel you
> > > should be doing something and accomplishing something and you worry
> > > about achiving larger goals. I could go on but there is a great deal
> > > of data to support the idea that different approaches to mental
> > > content can exist in the same individual at different times. The
> > > theory claims that the meta states (discrete, notice) are bi-stable
> > > and quite abrupt switches can occur between them. You are, for
> > > example, a thrill seeker and love riding on a roller coaster, and when
> > > on a roller coaster you enjoy the arousal that the experience
> > > provides. But imagine looking forward across the approaching dip in
> > > the roller coaster ride and noticing a break in the rails. Suddenly
> > > your enjoyment of the arousal can turn to an extremely unpleasant
> > > experience of arousal - fear and anxiety. The same mental content
> > > (high arousal) but experienced differently.

> > > Phenomenologically most people find reversal theory quite convincing
> > > (try to read some of the appers and see for your self). Obviously
> > > there are measurable things involved - arousal level can be measured,
> > > so can "hedonic tone" (heck that dates back to Wundt) and the like.
> > > But to test reversal theory one would need to rule out the middle
> > > ground. One would need to show that high levels of arousal cannot be a
> > > matter of indifference for a person - they must be experienced as
> > > something pleasant (exciting, thrilling, exhilirating) or as something
> > > unpleasant (anxiety, fear, dread, shock, etc). So one needs to show
> > > that there is not a continuum in the way people experience high
> > > arousal but rather two discrete ways in which the mental content and
> > > feelings can be taken. Similar remarks can be made for low arousal
> > > levels (very low arousal can either be relaxed, pleasant, a precursor
> > > to sleep) or boredom, vacuity, dullness). Anyway,

> > > My question was I agree simple (maybe stupid). Most statistical tests
> > > that I know of look for differences in means, or averages (and when
> > > you average across arousal experience you obviously get something like
> > > the Yerkes-Dodson law, that there is an "optimum level" of arousal -
> > > but Reversal Theory would claim that average conceals the underlying
> > > bi-stable dynamic). One can of course play with the mathematics - I
> > > think Clyde Coombs once published an article where he tried to show
> > > that all single peaked preference curves (which are unbiquitous in
> > > Psychology) could be explained as the average of two opposite
> > > tendencies. I could find the refeence in the Psychological Bulletin if
> > > you desire. But my question was really an attempt to try to get away
> > > from the creation of single-peaked average curves and test the sort of
> > > claims that are being made - that these preference curves actually are
> > > the result of a underlying dynamic of discrete but alternating states.
> > > I understand that perhaps I am just being idiotic, or displaying
> > > ignorance. But if I am an idiot or ignorant I would like to discover
> > > why I'm an idiotic or where my ignorance lies.

> > > Lance- Hide quoted text -

> > > - Show quoted text -

> > No one (least of all me) was suggesting that you are idiotic. Everyone
> > is ignorant, as Socrates told us. I just find it hard to know what you
> > are talking about when many of the words you use are so poorly
> > defined. What is a mental state? Why is introspection relevant? Does a
> > psycholgical state exist in any meaningful sense (certainly it does
> > not exist in the way a chair exists)? I am afraid I view this kind of
> > psychology as akin to fiction, in that it provides metaphors and ways
> > of talking about ourselves that are useful. This is absolutely not an
> > insult. It does mean, however, that applying scientific techniques to
> > it misses the point rather.

> > Having said that: equilibria (if that is the right way to think of
> > 'mental states' that are in some sense stable in time) are necessarily
> > (unless there is a continuous symmetry), points in some space of
> > states, since they are local minima of some potential. Passing from
> > one to another as a parameter varies is often, although not always) a
> > discontinuous process. Check out first- and second-order phase
> > transitions or catastrophe theory.

> > illywhacker;

> Thanks for the catastrophe theory reference. The authors of reversal
> theory did in fact consider catastrophe theory when developing their
> ideas.

> As for your first paragraph it seems like I would have to write a book
> to answer you. Another time perhaps.

> Lance

> Lance

> > ((cuts))
> > Similarly Fulda
> > developed a mathematical model of the pull of temptation and asserts
> > that the model works on discrete moments of thought (in other words
> > the probabilities of temptation that are being modelled are discrete
> > and not continuous).

> The domain of the probability (mass) function is discrete. The range,
> however, may remain continuous -- at least conceptually. This may seem
> a small point, but it goes to the heart of the question later posed...

> In my experience it is really hard to devise

> > tests for claims of this kind. I wondered whther there are any
> > existing statistical tests designed to to test hypotheses of this
> > kind, or whether there are procedures and designs suitable for testing
> > such claims?

> All measurement is ultimately discrete, since there is no measurement
> device or reporting procedure that may return as its report a literal
> point, precise to an infinite number of decimal places. In a finite
> life, nobody has the time either to make such a report, or to wait for
> one.

> Nevertheless -- and this is the key conceptual point -- it is useful
> to conceive of certain attributes -- e.g. height, weight, probability
> -- as defining a continuous domain. Measurement reports with respect
> to such domain will ultimately define only a cluster of points, e.g.
> an interval, either crisp, or more generally fuzzy, within such a
> domain.

> For example, the 30 cm. ruler on my desk has but 300 markings along
> its continuous edge. Therefore, a measurement made with it may be
> precise only to within about +/- 1 mm, even if there were no
> calibration error, and no systematic error involved in its use.

> This may seem irrelevant to the concern expressed, but consider this:
> the notion of a discrete psychological state may arise from some
> complex of underlying variables, some of which may be inherently
> discrete, others of which may be continuous. I am not a psychologist,
> and know nothing of reversal theory, but I know something about
> statistics and measurement, so please bear with me. Consider the
> attribute of race. Clearly it is a discrete, not a continuous
> attribute. If we walk down the street we may walk past ten strangers,
> and be able to make, to a high degree of accuracy, a determination of
> race for each one. (No arguments please, I mean race in the social
> sense we all understand.) But if you think about it, we rely for such
> determination on a complex of variables -- skin color, hair texture,
> width and shape of nose, degree of prognathism, gait, among others --
> some of which are conceptually continuous (e.g. skin color, width of
> nose, degree of prognathism), others of which we may deem to be
> conceptually discrete (e.g. hair texture, although even here we may
> allow for *degrees* of curliness). My point is that these underlying
> variables define a multi-dimensional space involving continuous and
> discrete dimensions, yet we may abstract from this multi-dimensional
> space to give an unerring (by and large) description of the race of
> someone -- a clearly discrete variable -- we merely pass by on the
> street. In effect, we assign a relatively small number of discrete
> "racial" markers to point clusters within the afore-mentioned multi-
> dimensional space, and thus move from a continuous multi-dimensional
> space to a uni-dimensional discrete space.

> I suspect something similar is going on with reversal theory. This
> however is not the point. The bigger point is that a continuous space
> exists only in our imagination -- any child will grasp the *concept*
> of a continuum, by contemplating the straight edge of a ruler.
> However, actual measurement -- psychometric or otherwise -- must
> necessarily be discrete, and involve some finer or coarser amount of
> clustering of points that may be assigned to various neighborhoods of
> points within a latent or underlying continuous space. We do it for
> length measurement with my ruler, and we do it for race "measurement"
> when we walk down the street.

> The upshot of this, for the question you ask, is that whether you
> contemplate a discrete variable or continuous variable, is an act of
> imagination that is logically prior to any application of statistical
> method. Further, even if by your act of imagination you contemplate a
> continuous attribute (eg. the aforementioned ruler on my desk with its
> continuous straight edge), measurements made with respect to that
> attribute may only ever be discretely many. (The same goes for the
> measurement of probability btw, even though it is conceptually clearly
> a continuous attribute on the [0,1] interval). And further, as with
> "measurement" of race, the discretely many measurements may involve
> such coarse clustering that we may be tempted to think of the
> attribute as inherently discrete, when on a closer examination we may
> find some number of underlying attributes which may themselves be
> continuous.

> I say all of that to sum up with the following short answer:
> statistical hypothesis testing, and indeed statistical inference
> procedures more generally, may only come into play *after*
> measurements (however coarse) have been taken, and may shed no light
> per se on the act of imagination by which one accords to an attribute
> the qualities of discreteness or continuity as the case may be.

> I hope that is helpful. I have come late to the thread, and I notice
> that the discussion seems to have veered off in a direction that may
> have left the, very good, question you raised still deserving of
> further response.

> Kind regards,
> S. F. Thomas

> P.S. I had to think deeply about this kind of issue in writing my
> (1995) _Fuzziness and Probability_. ACG Press.

> > Lance