Hardy distribution
In probability theory and statistics, the Hardy distribution is a discrete probability distribution that expresses the probability of the hole score for a given golf player. It is based on Hardy's basic assumption that there are three types of shots:
good,
bad and
ordinary,
where the probability of a good hit equals, the probability of a bad hit equals and the probability of an ordinary hit equals. Hardy further assigned
a value of 2 to a good stroke,
a value of 0 to a bad stroke and
a value of 1 to a regular or ordinary stroke.
Once the sum of the values is greater than or equal to the value of the par of the hole, the number of strokes in question is equal to the score achieved on that hole. A birdie on a par three could then have come about in three ways:, and, respectively, with probabilities, and.
Definitions
Probability mass function
A discrete random variable is said to have a Hardy distribution, with parameters, and if it has a probability mass function given by:if m is odd
and
if m is even
with
and
where
- is the par of the hole
- is the golf hole score if is even
- is the golf hole score if is odd
- is the probability of a good shot
- is the probability of a bad shot and
if m is odd
and
if m is even
with
and
Each raw moment and each central moment can be easily determined with the moment generating function, but the formulas involved are too large to present here.
Hardy distribution for a par three, four and five
For a par three:For a par four:
Note the resemblance with. For a par five:
Note the resemblance with the formulas for and.
History
When trying to make a probability distribution in golf that describes the frequency distribution of the number of strokes on a hole, the simplest setup is to assume that there are only two types of strokes:A good stroke with a probability of
A bad stroke with a probability of.
while
a good shot then gets the value 1 and
a bad shot gets the value 0.
Once the sum of the shot values equals the par of the hole, that is the number of strokes needed for the hole.
It is clear that with this setup, a birdie is not possible. After all, the smallest number of strokes one can get is the par of the hole. Hardy probably realized that too and then came up with the idea not to assume that there were just two types of strokes: good and bad, but three types:
good with probability
bad with probability
ordinary with probability.
In fact, Hardy called a good shot a supershot and a bad shot a subshot. Minton later called Hardy's supershot an excellent shot and Hardy's subshot a bad shot. In this article, Minton's excellent shot is called a good shot. Hardy came up with the idea of three types of shots in 1945, but the actual derivation of the probability distribution of the hole score was not given until 2012 by van der Ven.
Hardy assumed that the probability of a good stroke was equal to the probability of a bad stroke, namely. This was confirmed by Kang:
In retrospect, Hardy might well have been right, as the data in Table 2 in van der Ven show. This table shows the estimated - and -values for holes 1-18 for rounds 1 and 2 of the 2012 British Open Championship. The mean values were equal to 0.0633 and 0.0697, respectively. Later Cohen introduced the idea that and should be different. Kang says about this:
For the Hardy distribution the values of and may be different.