Meadow's Law is a discredited[1][2][3] legal concept in the field of child protection, intended to be used to judge cases of multiple cot or crib deaths – Sudden infant death syndrome (SIDS) – within a single family.
History
The "law" has it that because cot deaths are a rare phenomenon and difficult to explain by natural causes, it can be reasoned that "one is a tragedy, two is suspicious and three is murder unless there is proof to the contrary."[4]
The name is derived from the controversial British paediatrician Roy Meadow, who until 2003 was seen by many as "Britain's most eminent paediatrician" and leading expert on child abuse.[5] Meadow's reputation went into decline with a series of legal reverses for his theories, and in July 2005 he was struck off the medical register by the General Medical Council for tendering misleading evidence. Meadow's licence was reinstated in February 2006 by a London court.
Meadow attributes many unexplained infant deaths to the disorder or condition in mothers called Munchausen syndrome by proxy. According to this diagnosis some parents, especially mothers, harm or even kill their children as a means of calling attention to themselves. Its existence has been confirmed by cases where parents have been caught on video surveillance actively harming their children,[6] but its frequency is subject to debate as Meadow claimed to have destroyed the original data which he used to substantiate the law.[7]
As a result of the 1993 trial of Beverley Allitt, a paediatric nurse convicted of killing four children under her care and injuring five others, Meadow's ideas gained ascendancy in British child protection circles, and mothers were convicted of murder on the basis of his expert testimony.[8] Thousands of children were removed from their parents and taken into care or fostered out because they were deemed to be 'at risk'. From 2003, however, the tide of opinion turned: a number of high-profile acquittals cast doubt on the validity both of Munchausen's and 'Meadow's Law'. Several convictions were reversed, and many more came under review.
Attribution to the Di Maios
In a note to his mathematical analysis of the Sally Clark case, Professor Ray Hill endorses a claim that Meadow did not originate the rule:
Professor Meadow did not originate the law. It appears to be attributable to D. J. and V. J. M. Di Maio, two American pathologists who state in their book:[9] It is the authors’ opinion that while a second SIDS death from a mother is improbable, it is possible and she should be given the benefit of the doubt. A third case, in our opinion, is not possible and is a case of homicide. It is clear that the statement is the authors’ opinion. It is not a conclusion reached by analysis of their observations; no supportive data are presented and there are no illustrative case histories, or references to earlier publications. This is in striking contrast with the rest of the book which is replete with illustrative case histories and cites many references throughout. A recent examination of Meadow’s own contributions to the medical literature has likewise failed to uncover supportive pathological evidence or references to it
The precept was published in the United States by DiMaio and DiMaio in 1989, without mention of Meadow. In ABC of Child Abuse, first published in the same year, Meadow wrote his formulation:
'One sudden infant death is a tragedy, two is suspicious and three is murder until proved otherwise' is a crude aphorism but a sensible working rule for anyone encountering these tragedies
— Dr Roy Meadow, ABC of Child Abuse[4]
The formula is "clearly fallacious" according to Bob Carpenter, Professor of Medical Statistics at the London School of Hygiene and Tropical Medicine, an expert witness in some of the trials where infant cot deaths were prosecuted as homicides.[12]
Criticisms
Critics of Meadow's law state that it is based on a fundamental misunderstanding of statistics, particularly relating to probability, likelihood, and statistical independence.
At the trial in 1999 of solicitor Sally Clark, accused of murdering her two sons, Meadow testified that the odds against two such deaths happening naturally was 73,000,000:1, a figure which he obtained by squaring the observed ratio of births to cot-deaths in affluent non-smoking families (approximately 8,500:1).
This caused an uproar among professional statisticians, whose criticisms were twofold:
The prosecutor's fallacy
Firstly, Meadow was accused of espousing the so-called prosecutor's fallacy in which the probability of "cause given effect" (i.e. the true likelihood of a suspect's innocence) is confused with that of "effect given cause" (the likelihood that innocence will result in the observed double-cot-death). In reality, these quantities can only be equated when the likelihood of the alternative hypothesis, in this case murder, is close to certainty. Since murder (and especially double murder) is itself a rare event, the probability of Clark's innocence was certainly far greater than Meadow's figure suggested.
An equivalent error is to accuse anybody who wins a lottery of fraud.
Statistical independence
The second criticism was that Meadow's calculation had assumed that cot deaths within a single family were statistically independent events, governed by a probability common to the entire affluent non-smoking population. No account had been taken of conditions specific to individual families (such as a hypothesised "cot death gene") which might make some more vulnerable than others. The occurrence of one cot-death makes it likely that such conditions exist, and the probability of subsequent deaths is therefore greater than the group average (estimates are mostly in the region of 1:100).
Combining these corrections with estimates of successive murder probabilities by affluent non-smokers, Mathematics Professor Ray Hill found that the probability of Clark's guilt could be as low as 10% (based solely on the fact of two unexplained child deaths, and before any other evidence was considered).[11] In any case, a legal verdict is not to be rendered on the basis of statistics; Hill wrote, "guilt must be proved on the basis of forensic and other evidence and not on the basis of these statistics alone. My own personal view that she is innocent is based on my subjective assessment of all the aspects".[13]
See also
- Kathleen Folbigg
- Sally Clark
- Carol Matthey[14]
References
- ↑ Mitchell, Joshua (2 May 2021). "The Prosecutor's Fallacy: How flawed statistical evidence has been used to jail innocent people". Cherwell.
- ↑ Ritchie, Hannah (7 June 2023). "Kathleen Folbigg: Misogyny helped jail her, science freed her". BBC News.
- ↑ Lane, Isabelle (5 June 2023). "Kathleen Folbigg: Inside the case that gripped the nation". SBS News. Retrieved 30 November 2023.
- 1 2 Gene find casts doubt on double 'cot death' murders. The Observer; 15 July 2001
- ↑ Knight, Sam (15 July 2005). "Professor Sir Roy Meadow struck off". The Times. London.
- ↑ Samuels, M. P.; McClaughlin, W.; Jacobson, R. R.; Poets, C. F.; Southall, D. P. (1992). "Fourteen cases of imposed upper airway obstruction". Archives of Disease in Childhood. BMJ Publishing Group. 67 (2): 162–170. doi:10.1136/adc.67.2.162. PMC 1793411. PMID 1543373.
- ↑ Daily Telegraph
- ↑ "Timeline: Sir Roy Meadow". The Guardian. 15 July 2005. Retrieved 12 January 2019.
- ↑ Dominic J. DiMaio and Vincent J. M. DiMaio, Forensic Pathology, Elsevier, St. Louis MO, 1989, p. 291
- ↑ Brown, A. (30 April 2010). "Top doctor casts doubt on conviction of waiter Mohammad Ullah for killing baby stepson". The Daily Record. Retrieved 2010-06-12.
- 1 2 Hill, R. (2004). "Multiple sudden infant deaths – coincidence or beyond coincidence?" (PDF). Paediatric and Perinatal Epidemiology. 18 (5): 322–323. doi:10.1111/j.1365-3016.2004.00560.x. PMID 15367318.
- ↑ The Health Report: 24 January 2005 - Repeat Sudden Unexpected and Unexplained Infant Deaths
- ↑ Hill, R. "Cot Death or Murder". www.docstoc.com. p. 6. Retrieved 2010-06-13.
- ↑ Hollingsworth, Julia (March 20, 2021). "Genetics may free a woman convicted of killing her 4 babies and help other parents explain the unexplainable". CNN. Cable News Network. Archived from the original on 2021-03-20. Retrieved 2021-03-20.