Post on 05-Jan-2016
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Signal Detection Theory
March 25, 2010
Phonetics Fun, Ltd.• Check it out:
• http://sakurakoshimizu.blogspot.com/
Another Brick in the Wall• Another interesting finding which has been used to argue for the “speech is special” theory is duplex perception.
• Take an isolated F3 transition:
and present it to one ear…
Do the Edges First!• While presenting this spectral frame to the other ear:
Two Birds with One Spectrogram
• The resulting combo is perceived in duplex fashion:
• One ear hears the F3 “chirp”;
• The other ear hears the combined stimulus as “da”.
Duplex Interpretation• Check out the spectrograms in Praat.
• Mann and Liberman (1983) found:
• Discrimination of the F3 chirps is gradient when they’re in isolation…
• but categorical when combined with the spectral frame.
• (Compare with the F3 discrimination experiment with Japanese and American listeners)
• Interpretation: the “special” speech processor puts the two pieces of the spectrogram together.
Some Psychometrics!• Response data from a perception experiment is usually organized in the form of a confusion matrix.
• Data from Peterson & Barney (1952)
• Each row corresponds to the stimulus category
• Each column corresponds to the response category
Detection• In a detection task (as opposed to an identification task), listeners are asked to determine whether or not a signal was present in a stimulus.
• For example--do the following clips contain release bursts?
• Potential response categories:
SignalResponse
Hit: Present (in stimulus) “Present”
Miss: Present “Absent”
False Alarm: Absent “Present”
Correct Rejection: Absent “Absent”
Confusion, Simplified• For a detection task, the confusion matrix boils down to just two stimulus types and response options…
(Response Options)
Present Absent
Present Hit Miss
Absent False Alarm Correct Rejection
(Stim Types)
• Notice that a bias towards “present” responses will increase totals of both hits and false alarms.
• Likewise, a bias towards “absent” responses will increase the number of both misses and correct rejections.
Canned Examples• From the text: in session 1, listeners are rewarded for “hits”. The resultant confusion matrix looks like this:
Present Absent
Present 82 18
Absent 46 54
• The “correct” responses (in bold) = 82 + 54 = 136
Canned Examples• In session 2, the listeners are rewarded for “correct rejections”…
Present Absent
Present 55 45
Absent 19 81
• The “correct” responses (in bold) = 55+ 81 = 136
• Moral of the story: simply counting the number of “correct responses” does not satisfactorily tell you what the listener is doing…
• And response bias is not determined by what they can or cannot perceive in the signal.
Detection Theory• Signal Detection Theory: a “parametric” model that predicts when and why listeners respond with each of the four different response types in a detection task.
• “Parametric” = response proportions are derived from underlying parameters
• Assumption #1: listeners base response decisions on the amount of evidence they perceive in the stimulus for the presence of a signal.
• Evidence = gradient variable.
perceptual evidence
The Criterion• Assumption #2: listeners respond positively when the amount of perceptual evidence exceeds some internal criterion measure.
perceptual evidence
criterion ()
“present” responses“absent” responses
• evidence > criterion “present” response
• evidence < criterion “absent” response
The Distribution• Assumption #3: the amount of perceived evidence for a particular stimulus varies randomly…
• and the variation is distributed normally.
perceptual evidence
Frequency
The categorization of a particular stimulus will vary between trials.
Normal Facts• The normal distribution is defined by two parameters:
• mean (= “average”) ()
• standard deviation ()
• The mean = center point of values in the distribution
• The standard deviation = “spread” of values around the mean in the distribution.
standard deviation standard deviation
Comparisons• Assumption #4: responses to both “absent” and “present” stimuli in a detection task will be distributed normally.
• Generally speaking:
• the mean of the “present” distribution will be higher on the evidence scale than that of the “absent” distribution.
• Assumption #5: both “absent” and “present” distributions will have the same standard deviation.
• (This is the simplest version of the model.)
Interpretationcorrect rejections false alarms
misses hitscriterion
Important: the criterion level is the same for both types of stimuli…
…but the means of the two distributions differ
Sensitivity• The perceptual distance between the means of the
distributions reflects the listener’s sensitivity to the distinction.
• Q: How can we estimate this distance?
• A: We measure the distance of the criterion from each mean.
• In normal distributions, this distance:
• determines the proportion of responses on either side of the criterion
• This distance = the criterion’s “z-score”
Z-Scores
• Example 1: criterion at the mean
• Z-score = 0
• 50% hits, 50% misses
HitsMisses
Z-Scores
• Example 2: criterion one standard deviation below the mean
• Z-score = -1
• 84.1% hits, 15.9% misses
HitsMisses
Z-Scores
• Note: P(Hits) = 1-P(Misses)
• z(P(Hits)) = z(1-P(Misses)) = -z(P(Misses))
• In this case: z(84.1) = -z(15.9) = 1
HitsMisses
D-Prime• D-prime (d’) is a measure of sensitivity.
• = perceptual distance between the means of the “present” and “absent” distributions.
• This perceptual distance is expressed in terms of z-scores.
d’sn
D-Prime
d’sn
Hits
• d’ combines the z-score for the percentage of hits…
D-Prime
z(P(H))sn
Hits
• d’ combines the z-score for the percentage of hits…
• with the z-score for the percentage of false alarms.
False Alarms
-z(P(FA))
• d’ = z(P(H)) - z(P(FA))
D-Prime Examples1. Present Absent
Present 82 18
Absent 46 54
d’ = z(P(H)) - z(P(FA)) = z(.82) - z(.46) = .915 - (-.1) = 1.015
2. Present Absent
Present 55 45
Absent 19 81
d’ = z(P(H)) - z(P(FA)) = z(.55) - z(.19) = .125 - (-.878) = 1.003
• Note: there is no absolute meaning to the value of d-prime
• Also: NORMSINV() is the Excel function that converts percentages to z-scores.
Near Zero Correction• Note: the z-score is undefined at 100% and 0%.
• Fix: replace those scores with a minimal deviation from the limit (.5% or 99.5%)
• Present Absent
Present 100 0
Absent 72 28
d’ = z(P(H)) - z(P(FA)) = z(.995) - z(.72) = 2.57 - .58 = 1.99
Calculating Bias• An unbiased criterion would fall halfway between the means of both distributions.
• No bias: P (Hits) = P (Correct Rejections)
• Bias: P (Hits) != P (Correct Rejections)
u
b
Calculating Bias• Bias = distance (in z-scores) between the ideal criterion and the actual criterion
• Bias () = -1/2 * (z(P(H)) + z(P(FA)))
u
b
For Instance Let’s say: d’ = 2
• An unbiased criterion would be one standard deviation from both means…
z(P(H)) = 1z(P(FA)) = -1
• z(P(H)) = 1 P(H) = 84.1%
• z(P(FA)) = -1 P(FA) = 15.9%
Wink Wink, Nudge Nudge Now let’s move the criterion over 1/2 a standard deviation…
z(P(H)) = 1.5z(P(FA)) = -.5
• z(P(H)) = 1.5 P(H) = 93.3% (cf. 84.1%)
• z(P(FA)) = -.5 P(FA) = 30.9% (cf. 15.9%)
• Bias () = -1/2 * (z(P(H)) + z(P(FA)))
= -1/2 * (1.5 + (-.5)) = -1/2 * (1) = -.5
Calculating Bias: Examples1. Present Absent
Present 82 18
Absent 46 54
= -1/2 * (z(P(H)) + z(P(FA)) = -1/2 * (z(.82) + z(.46)) = -1/2 * (.915 + (-.1)) = -.407
2. Present Absent
Present 55 45
Absent 19 81
= -1/2 * (z(P(H)) + z(P(FA)) = -1/2 * (z(.55) + z(.19)) = -1/2 * (.125 + (-.878)) = .376
• The higher the criterion is set, the more positive this number will be.
Same/Different Example• With some caveats, the signal detection paradigm can be applied to identification or discrimination tasks, as well.
• AX Discrimination data (from the CP task):
Pair Same Different Pair Same Different
1-1 96 2 1-3 73 25
3-3 90 8
• We can combine the same pairs (1-1 and 3-3) to form the necessary same/different confusion matrix:
Same Diff.
Same 186 10
Diff. 73 25
Same/Different Example• Let’s assume:
• Hits = Same responses to Same pairs
• False Alarms = Diff. responses to Same pairs
Same Diff. Total %(Same)
Same 186 10 196 94.9%
Diff. 73 25 98 74.5%
• z(P(H)) = z(94.9) = 1.635
• z(P(FA)) = z(74.5) = .659
• d’ = z(P(H)) - z(P(FA)) = 1.635 - .659 = .977
• = -1/2*(z(P(H)) + z(P(FA)) = -.5*(1.635 + .659) = -1.147