NFL Turnover Differential and the Point Spread


In the comments section of the Advanced NFL Stats post on the conference round post-season projections, an anonymous poster claimed the following:
For a very long period, winning NFL bettors made money simply by betting *against* the team with the better turnover difference. That's how drastically the public has overestimated the predictive value of turnovers. 
NFL turnovers are far more random than most people realize, and only correlate weakly with prior game performance.  Teams that have achieved strong season-to-date records by "winning the turnover battle" are more likely to regress to the mean.  Vice versa for teams with bad records due to poor turnover differentials.


I was curious to see if this market inefficiency actually existed and at what level.  A quick google search on the topic yielded conflicting results.  According to one site, teams with the unfavorable season-to-date turnover differential covered the spread more than 75%(!) of the time.  I would be skeptical of any statement of the form "When [simple rule], the spread is covered [x%] of the time", where [x] is anything north of 60%.  Especially if the rule can be applied to virtually every game.  A different site appears to claim just the opposite: you should try to pick teams that protect the ball well, since teams that win the turnover battle tend to cover the spread (then again, this site also claims to tell you how to pick NFL games "accuratley").



The Data


Using data from Killer Sports, I was able to look at performance against the spread for all NFL games going back to 1998 (excluding games for the first three weeks of the season).  I stratified the games according to the teams' relative turnover differential.  The ">=1 " column shows performance against the spread for all teams whose season-to-date turnover differential was at least 1 turnover worse than their opponent's.  The ">=5" column shows performance for teams whose turnover differential was at least 5 turnovers worse, and so on.


The data shows a weak correlation between covering the spread and unfavorable turnover differential.  If you had bet on every team with an unfavorable differential, you would have won 51.4% of the time.  Unfortunately, you need to win 52.5% of the time in order to break even.  The correlation does get stronger if you restrict to teams with a wider gap.  Greater than 5, and you're up to 52.0%.  You're in to positive returns for greater than 10 (54.4%) and 55.8% for greater than 15.  Somewhat encouraging.  Here's the data:

'Unfavorable' Turnover Differential
>=1 >=5 >=10 >=15
Season Games %Cvr Games %Cvr Games %Cvr Games %Cvr
1998 171 55.3% 108 53.7% 47 57.4% 13 65.4%
1999 179 54.7% 117 57.7% 50 64.0% 26 59.6%
2000 179 46.9% 115 46.5% 63 40.5% 34 42.6%
2001 178 59.8% 115 61.7% 60 64.2% 23 65.2%
2002 188 55.3% 108 53.7% 53 53.8% 24 52.1%
2003 185 51.1% 120 52.5% 58 64.7% 21 78.6%
2004 184 46.2% 120 46.2% 76 47.4% 31 51.6%
2005 188 48.1% 122 43.0% 76 45.4% 35 44.3%
2006 182 53.3% 106 53.3% 47 64.9% 19 60.5%
2007 179 46.4% 111 49.1% 54 47.2% 23 54.3%
2008 182 51.9% 107 53.7% 40 58.8% 15 73.3%
2009 182 52.5% 110 55.5% 55 60.0% 15 60.0%
2010 188 50.3% 120 52.1% 50 50.0% 16 43.8%
2011 187 48.7% 129 50.8% 58 54.3% 25 54.0%
Total 2552 51.4% 1608 52.0% 787 54.4% 320 55.8%
1998-2004 1264 52.7% 803 53.1% 407 55.3% 172 57.3%
2005-2011 1288 50.2% 805 50.9% 380 53.6% 148 54.1%

Defensive Turnover Differential


I also looked at performance when focusing just on offensive or defensive turnovers. You can quickly go insane searching for hidden patterns in point spread performance data (e.g. "Road dogs coming off a 8+ point loss at home against a non-divisional opponent are 24-15-2 ATS when the over under is at least 50 points", and so on).  For that reason, I was hesitant to start slicing and dicing the data.  You cut the data enough times, and you're bound to find a correlation just due to random chance.  


But I had a rationale.  Based on data I've looked at, offensive turnovers are more consistent than defensive turnovers (but I've seen conflicting thoughts on this).  If defensive turnovers were more random than offensive ones, you should be able to find better betting opportunities just looking at defensive turnover differential.


The results show an even stronger correlation than total turnovers.  For games with at least a 10 defensive turnover differential between the two teams, the unfavorable team covered 58.7% of the time.  In addition, such a strategy would have paid off for each season, save for two.


I plan on testing this strategy out for the 2012 NFL season, using the ">=10" rule for defensive turnovers only.  I'll report back here on results.  From prior seasons, it looks like you can expect about 20-25 betting opportunities over the course of the season.

'Unfavorable' Defensive Turnover Differential
>=1 >=5 >=10 >=15
Season Games %Cvr Games %Cvr Games %Cvr Games %Cvr
1998 167 54.2% 80 58.1% 20 80.0% 5 70.0%
1999 173 52.9% 80 58.8% 21 57.1% 3 33.3%
2000 175 44.9% 92 44.0% 28 41.1% 11 40.9%
2001 174 58.3% 73 61.0% 23 69.6% 6 50.0%
2002 170 55.3% 63 54.8% 18 38.9% 5 60.0%
2003 181 51.1% 83 50.0% 29 56.9% 8 37.5%
2004 184 48.9% 91 49.5% 34 52.9% 3 33.3%
2005 188 49.7% 118 46.2% 37 58.1% 7 57.1%
2006 177 55.1% 75 50.7% 22 59.1% 4 37.5%
2007 178 51.1% 69 55.8% 20 67.5% 2 50.0%
2008 182 55.2% 72 59.0% 9 61.1% 0 0.0%
2009 169 56.8% 62 49.2% 15 60.0% 5 80.0%
2010 183 53.3% 69 51.4% 16 59.4% 0 0.0%
2011 186 52.2% 88 58.0% 20 70.0% 1 0.0%
Total 2487 52.7% 1115 52.9% 312 58.7% 60 49.2%
1998-2004 1224 52.2% 562 53.3% 173 56.1% 41 46.3%
2005-2011 1263 53.3% 553 52.5% 139 61.9% 19 55.3%

Offensive Turnover Differential


And here are the offensive turnover results.  As you can see, performance against the spread is inconsistent.

'Unfavorable' Offensive Turnover Differential
>=1 >=5 >=10 >=15
Season Games %Cvr Games %Cvr Games %Cvr Games %Cvr
1998 174 49.1% 83 50.0% 21 42.9% 3 33.3%
1999 178 55.3% 77 46.1% 25 62.0% 3 100.0%
2000 175 51.4% 71 43.0% 24 43.8% 6 58.3%
2001 178 57.6% 90 55.6% 23 54.3% 8 50.0%
2002 180 54.4% 80 55.0% 25 64.0% 4 50.0%
2003 179 53.1% 88 55.7% 19 57.9% 2 100.0%
2004 183 49.2% 89 38.8% 22 43.2% 6 58.3%
2005 186 42.5% 80 38.1% 24 43.8% 2 50.0%
2006 176 52.6% 80 56.2% 19 57.9% 6 50.0%
2007 180 46.1% 92 40.2% 22 50.0% 6 66.7%
2008 175 48.0% 82 50.0% 15 80.0% 2 100.0%
2009 177 51.7% 78 50.6% 22 40.9% 3 100.0%
2010 182 49.7% 97 54.6% 33 36.4% 11 18.2%
2011 178 46.6% 72 45.8% 17 50.0% 1 100.0%
Total 2501 50.5% 1159 48.7% 311 50.8% 63 55.6%
1998-2004 1247 52.9% 578 49.3% 159 52.8% 32 59.4%
2005-2011 1254 48.1% 581 48.0% 152 48.7% 31 51.6%


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