ECRI Weekly Leading Index: "Recoveries Remain Resilient"
Today's release of the publicly available data from ECRI (Economic Cycle Research Institute) puts its Weekly Leading Index (WLI) at 132.6, down from 133.5 the previous week. The WLI annualized growth indicator (WLIg) is at 0.6, down from the previous week's 1.2, and off its interim low of -4.7 in mid-January.
"Recoveries Remain Resilient"
ECRI currently features an article suggesting that concern over negative trend growth is no reason to panic. Recession is not imminent as we are not yet in a "window of vulnerability." The article also discusses Spain's recent cyclical upturn and warns that one shouldn't assume that a cyclical upturn also means positive long-term trend growth. The overall message is not to "fret about recession just yet".
Read the full version here.
The ECRI Indicator Year-over-Year
Below is a chart of ECRI's smoothed year-over-year percent change since 2000 of their weekly leading index. The latest level is fractionally higher than it was at the start of the last recession.
Appendix: A Closer Look at the ECRI Index
The first chart below shows the history of the Weekly Leading Index and highlights its current level.
For a better understanding of the relationship of the WLI level to recessions, the next chart shows the data series in terms of the percent off the previous peak. In other words, a new weekly high registers at 100%, with subsequent declines plotted accordingly.
As the chart above illustrates, only once has a recession ended without the index level achieving a new high -- the two recessions, commonly referred to as a "double-dip," in the early 1980s. Our current level is still off the most recent high, which was set back in June of 2007. We've exceeded the previously longest stretch between highs, which was from February 1973 to April 1978. But the index level rose steadily from the trough at the end of the 1973-1975 recession to reach its new high in 1978. The pattern in ECRI's indictor is quite different, and this has no doubt been a key factor in their business cycle analysis.
The WLIg Metric
The best known of ECRI's indexes is their growth calculation on the WLI. For a close look at this index in recent months, here's a snapshot of the data since 2000.
Now let's step back and examine the complete series available to the public, which dates from 1967. ECRI's WLIg metric has had a respectable record for forecasting recessions and rebounds therefrom. The next chart shows the correlation between the WLI, GDP and recessions.
The History of ECRI's 2011 Recession Call
ECRI's weekly leading index has become a major focus and source of controversy ever since September 30, 2011, when ECRI publicly announced that the U.S. is tipping into a recession, a call the Institute had announced to its private clients on September 21st. Here is an excerpt from the announcement:
Early last week, ECRI notified clients that the U.S. economy is indeed tipping into a new recession. And there's nothing that policy makers can do to head it off.
ECRI's recession call isn't based on just one or two leading indexes, but on dozens of specialized leading indexes, including the U.S. Long Leading Index, which was the first to turn down — before the Arab Spring and Japanese earthquake — to be followed by downturns in the Weekly Leading Index and other shorter-leading indexes. In fact, the most reliable forward-looking indicators are now collectively behaving as they did on the cusp of full-blown recessions, not "soft landings." [Read the report here.]
Year-over-Year Growth in the WLI
Triggered by another ECRI commentary, Why Our Recession Call Stands, here is a snapshot of the year-over-year growth of the WLI rather than ECRI's previously favored method of calculating the WLIg series from the underlying WLI (see the endnote below). Specifically the chart immediately below is the year-over-year change in the 4-week moving average of the WLI. The red dots highlight the YoY value for the month when recessions began.
The WLI YoY is in the negative zone, now at -1.5%, down 0.3% from last week and off its interim low of -2.3% set in mid-January. The latest level is fractionally higher than it was at the start of the last recession. This indicator has only rarely dipped below its recent interim low outside recessionary periods: Lower levels occurred in 1988 and also during the economic volatility following the last recession.
Weak US Economy but Not in Recession
ECRI has now publicly backed off its claim of a US recession in the late 2011 to early 2013 time frame. Lakshman Achuthan's May 8th Bloomberg interview acknowledging the erroneous call (see video here).
Additional Sources for Business Cycle Forecasts
Dwaine van Vuuren, CEO of RecessionAlert.com, and his collaborators, including Georg Vrba and Franz Lischka, have developed a powerful recession forecasting methodology that shows promise of making forecasts with fewer false positives, which includes excessively long lead times, such as ECRI's September 2011 recession call.
Earlier Video Chronology of ECRI's Recession Call
- September 30, 2011: Recession Is "Inescapable"
- September 30, 2011: Tipping into a New Recession
- February 24, 2012: GDP Data Signals U.S. Recession
- May 9, 2012: Renewed U.S. Recession Call
- July 10, 2012: "We're in Recession Already"
- September 13, 2012: "U.S. Economy Is in a Recession"
Note: How to Calculate the Growth series from the Weekly Leading Index
ECRI's weekly Excel spreadsheet includes the WLI and the Growth series, but the latter is a series of values without the underlying calculations. After a collaborative effort by Franz Lischka, Georg Vrba, Dwaine van Vuuren and Kishor Bhatia to model the calculation, Georg discovered the actual formula in a 1999 article published by Anirvan Banerji, the Chief Research Officer at ECRI: " The three Ps: simple tools for monitoring economic cycles - pronounced, pervasive and persistent economic indicators."
Here is the formula:
"MA1" = 4 week moving average of the WLI
"MA2" = moving average of MA1 over the preceding 52 weeks
"n"= 52/26.5
"m"= 100
WLIg = [m*(MA1/MA2)^n] - m