A mathematical model for simple learning is presented. Changes in the probability of occurrence of a response in a small time h are described with the aid of mathematical operators. The parameters which appear in the operator equations are related to experimental variables such as the amount of reward and work. Relations between the probability and empirical measures of rate of responding and latent time are defined. Acquisition and extinction of behavior habits are discussed for the simple runway and for the Skinner box. Equations of mean latent time as a function of trial number are derived for the runway problem; equations for the mean rate of responding and cumulative numbers of responses versus time are derived for the Skinner box experiments. An attempt is made to analyze the learning process with various schedules of partial reinforcement in the Skinner type experiment. Wherever possible, the correspondence between the present model and the work of Estes [2] is pointed out.
[1]
G. C. Grindley.
EXPERIMENTS ON THE INFLUENCE OF THE AMOUNT OF REWARD ON LEARNING IN YOUNG CHICKENS
,
1929
.
[2]
R. M. Elliott,et al.
Behavior of Organisms
,
1991
.
[3]
S. Williams.
Resistance to extinction as a function of the number of reinforcements.
,
1938
.
[4]
C. H. Graham,et al.
The acquisition, extinction, and spontaneous recovery of a conditioned operant response.
,
1940
.
[5]
E. Hilgard,et al.
Conditioning and Learning
,
1940
.
[6]
L. Crespi.
Quantitative variation of incentive and performance in the white rat.
,
1942
.
[7]
B. Skinner,et al.
Principles of Behavior
,
1944
.
[8]
R. Solomon.
The influence of work on behavior.
,
1948,
Psychological bulletin.
[9]
G. A. Miller,et al.
Statistical behavioristics and sequences of responses.
,
1949,
Psychological review.
[10]
W. O. Jenkins,et al.
Partial reinforcement: a review and critique.
,
1950,
Psychological bulletin.