Scalar expectancy

The scalar timing or scalar expectancy theory (SET) is a model of the processes that govern behavior controlled by time. The model posits an internal clock, and particular memory and decision processes.[1] SET is one of the most important models of animal timing behavior.[2]

History

John Gibbon originally proposed SET to explain the temporally controlled behavior of non-human subjects.[1] He initially used the model to account for a pattern of behavior seen in animals that are being reinforced at fixed-intervals, for example every 2 minutes. [3] An animal that is well trained on such a fixed-interval schedule pauses after each reinforcement and then suddenly starts responding about two-thirds of the way through the new interval. (See operant conditioning) The model explains how the animal's behavior is controlled by time in this manner. [1] Gibbon and others later elaborated the model and applied it to a variety of other timing phenomena.

Summary of the model

SET assumes that the animal has a clock, a working memory, a reference memory, and a decision process. The clock contains a discrete pacemaker that generates pulses like the ticks a mechanical clock. A stimulus that signals the start of a timed interval closes a switch, allowing pulses to enter an accumulator. The resulting accumulation of pulses represents elapsed time, and this time value is continuously sent to a working memory. When reinforcement happens at the end of the timed interval, the time value is stored in a long-term reference memory. This time-to-reinforcement in reference memory represents the expected time to reinforcement.

Key to the SET model is the decision process that controls timing behavior. While the animal is timing some interval it continually compares the current time (stored in working memory) to the expected time (stored in reference memory). Specifically, the animal continually samples from its memory of past times at which reinforcement occurred and compares this memory sample with the current time on its clock. When the two values are close to one another the animal responds; when they are far enough apart, the animal stops responding. To make this comparison, it computes the ratio of the two values; when the ratio is less than a certain value it responds, when the ratio is larger it does not respond.

By using a ratio of current time to expected time, rather than, for example, simply subtracting one from the other, SET accounts for a key observation about animal and human timing. That is, timing accuracy is relative to the size of the interval being timed. This is the "scalar" property that gives the model its name. For example, when timing a 10 sec interval an animal might be accurate to within 1 sec, whereas when timing a 100 sec interval the animal would be accurate to only about 10 sec. Thus time perception is like the perception of lights, sounds, and other sensory events, where accuracy also is relative to the size (brightness, loudness, etc.) of the percept being judged. (See Weber-Fechner law.)

A number of alternative models of timing have appeared over the years. These include Killeen’s Behavioral Theory of timing (BeT) model[4] and Machado’s learning-to-time (LeT) model.[5]

Moreover, there are some evidence that this property might not be valid in all ranges of durations.[6] Additionally John Staddon argues that SET is inconsistent on explaining the location of temporal indifference point in temporal bisection procedure.[7]

Human mechanism

In 1993, John Wearden claimed that human behavior exhibits appropriate scalar properties, as was indicated by experiments on internal production with concurrent chronometric counting.[8] However, human timing behavior is undoubtedly more varied than animal timing behavior. A major factor responsible for this variability is attentional allocation.[8][9]

References

  1. Gibbon J (1977). "Scalar expectancy theory and Weber's law in animal timing". Psychological Review. 84 (3): 279–325. doi:10.1037/0033-295X.84.3.279.
  2. Beckmann JS (2007). The Effects of Stimulus Dynamics on Temporal Discrimination: Implications for Change and Internal Clock Models of Timing. pp. 5–. ISBN 978-0-549-22213-2. Retrieved 11 January 2013.
  3. Magaro CM (2008). Dissociating Clock Speed and Attention in the Modality Effect. pp. 7–. ISBN 978-0-549-47717-4. Retrieved 11 January 2013.
  4. Killeen PR (1991). "The psychology of learning and motivation". In Bower G (ed.). Behavior's Time. 27. New York: Academic Press. pp. 294–334.
  5. Machado A, Pata P (February 2005). "Testing the scalar expectancy theory (SET) and the learning-to-time model (LeT) in a double bisection task". Learning & Behavior. 33 (1): 111–22. doi:10.3758/bf03196055. PMID 15971498.
  6. Grondin S (2014). "About the (non)scalar property for time perception". In Merchant H, de Lafuente V (eds.). Neurobiology of Interval Timing. Advances in Experimental Medicine and Biology. 829. Springer New York. pp. 17–32. doi:10.1007/978-1-4939-1782-2_2. ISBN 978-1-4939-1782-2. PMID 25358703.
  7. Staddon JE, Higa JJ (March 1999). "Time and memory: towards a pacemaker-free theory of interval timing". Journal of the Experimental Analysis of Behavior. 71 (2): 215–51. doi:10.1901/jeab.1999.71-215. PMC 1284701. PMID 10220931.
  8. Pastor MA, Artieda J (10 June 1996). Time, Internal Clocks and Movement. Elsevier. pp. 148–. ISBN 978-0-08-054304-8. Retrieved 11 January 2013.
  9. Hallez Q, Droit-Volet S (September 2017). "High levels of time contraction in young children in dual tasks are related to their limited attention capacities". Journal of Experimental Child Psychology. 161: 148–160. doi:10.1016/j.jecp.2017.04.013. PMID 28527748.
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