Finally found more information about the journal article. It was written by Rose Baker and widely reported in the press in December 2004. Mad Moggie did a summary here:
http://www.safespeed.org.uk/forum/viewtopic.php?t=1408
This is what the times reported:
http://www.timesonline.co.uk/article/0, ... 95,00.html
I am trying to find a copy of the full article which was in Mathematics Today but not have a great deal of luck so far....
Quote:
The Trouble With Speed Cameras
Rose Baker demonstrates the effect of proposed new Government policy.
Under a simple model of speeding offences, the probability distribution of time to being banned from driving as a result of speeding offences being caught on camera is studied, under the existing '4 strikes in 3 years and you're out' policy, and also under the Government's proposed new policy where banning follows 6 minor speeding offences or two major ones. The trouble with speed cameras (apart from the intractability of the mathematics) is that the time to banning for identical drivers is extremely variable. It is shown how far the proposed new policy ameliorates this problem. The analytic solution for the distribution of time to banning for major speeding offences is derived and shows a rich structure.
The number of speed cameras in the UK has increased to around 4500 at the time of writing, and many roads in my area now sport them. I found this out the hard way by getting flashed whilst driving too fast through the outskirts of Manchester. This prompted some mathematical reflections, which is ironical as it was making mathematical reflections while driving that was my downfall. I began wondering, this time at my desk, how one might model the events of being caught speeding, and the subsequent unhappy possibility of being banned from driving for a year after 4 speeding offenses within a 3-year period. The question is: what is the distribution of the time to getting banned, starting with a clean license, under a simple model of the occurrence of speeding offenses. Is the problem mathematically trivial, or not? The answer would seem to be that no analytic solution can be obtained (by me anyway) in general, but that for the simpler case when only two offenses cause banning, as is the case for serious speeding violations under the Government's proposed new scheme, an analytic solution can be obtained very simply.I can find no previous work on the mathematical modelling of speeding, although there are quite a few papers discussing the empirical effect of speeding cameras (e.g. Pilkington, 2003 and Redelmeier et al 2003) and driver attitudes to them e.g. Lawton et al (1997). The obvious point-process model for speeding offences is a Poisson process, which means that there is always a constant hazard of the next event, and that the interval between offences is therefore a random variate from an exponential distribution.
Clearly
=kN
where N is the number of speed cameras in use.
The process (and the car) stops when the driver is banned, which must eventually occur for any >0. For practical purposes however, being banned after 3000 years of driving is hardly a worry, and only the probability of being banned in a driving life span of say 50 years is of interest.
This is a problem of the absorption of a random walk, that stops when the total length of 3 consecutive steps is less than 3 years. This stopping criterion is resistant to mathematical analysis, but a Monte-Carlo computation is easy and yields quick results. Analytical results are later derived for the simpler case where only 2 offences within a period are required for banning: the resulting distribution of time to banning is sufficiently strange to suggest that an analytical solution of the general problem would be very interesting.
The web page for it seems to have disappeared, I used one of those archive caches. My institution doesn't have access to the mathematics today journal which it appeared in December 2004. Others might have better athens accounts
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