Treasury yields moved surprisingly little on the day of Chairman Powell’s Jackson Hole comments, but on reflection early last week intermediate sections of the curve moved up considerably. The forward 1-month U.S. Treasury yield now peaks at 4.95%, up 27 basis points.

**Inverted Yields, Negative Rates, and U.S. Treasury Probabilities 10 Years Forward**

The negative 2-year/10-year Treasury spread has now persisted for 43 days, narrowing this week to a negative 20 basis points from negative 33 basis points last week. In this week’s forecast, the focus is on three elements of interest rate behavior: the future probability of the recession-predicting inverted yield curve, the probability of negative rates, and the probability distribution of U.S. Treasury yields over the next decade.

We start from the closing U.S. Treasury yield curve and the interest rate swap quotations based on the Secured Overnight Financing Rate published daily by the Federal Reserve Bank of New York. Using a maximum smoothness forward rate approach, Friday’s implied forward rate curve shows a quick rise in 1-month rates to an initial peak of 3.70%, versus 3.64% last week. After the initial rise, there is some volatility before rates peak again at 3.56%, compared to 3.06% one week ago. Rates finally peak again at 4.95%, compared to 4.68% last week, and then decline to a lower plateau at the end of the 30-year horizon.

Using the methodology outlined in the appendix, we simulate 500,000 future paths for the U.S. Treasury yield curve out to thirty years. The next three sections summarize our conclusions from that simulation.

**Inverted Treasury Yields: Inverted Now, 67.8% Probability by March 3, **2023

A large number of economists have concluded that a downward sloping U.S. Treasury yield curve is an important indicator of future recessions. A recent example is this paper by Alex Domash and Lawrence H. Summers. We measure the probability that the 10-year par coupon Treasury yield is lower than the 2-year par coupon Treasury for every scenario in each of the first 80 quarterly periods in the simulation.[1] The next graph shows that the probability of an inverted yield remains high, peaking at 67.8%, compared to 81.7% one week before, in the 91-day quarterly period ending March 3, 2023.

**Negative Treasury Bill Yields: 9.1% Probability by February 26, 2027**

The next graph describes the probability of negative 3-month Treasury bill rates for all but the last 3 months of the next 3 decades. The probability of negative rates starts near zero but then rises steadily to peak at 9.1%, versus 9.9% one week earlier, in the period ending February 26, 2027:

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**U.S. Treasury Probabilities 10 Years Forward**

In this section, the focus turns to the decade ahead. This week’s simulation shows that the most likely range for the 3-month U.S. Treasury bill yield in ten years is from 0% to 1%. There is a 28.57% probability that the 3-month yield falls in this range, a change from 28.91% one week before. For the 10-year Treasury yield, the most likely range is from 2% to 3%. The probability of being in this range is 23.68%, compared to 24.59% one week prior.

In a recent post on SeekingAlpha, we pointed out that a forecast of “heads” or “tails” in a coin flip leaves out critical information. What a sophisticated bettor needs to know is that, on average for a fair coin, the probability of heads is 50%. A forecast that the next coin flip will be “heads” is literally worth nothing to investors because the outcome is purely random.

The same is true for interest rates.

In this section we present the detailed probability distribution for both the 3-month Treasury bill rate and the 10-year U.S. Treasury yield 10 years forward using semi-annual time steps. We present the probability of where rates will be at each time step in 1 percent “rate buckets.” The forecast is shown in this graph:

**3-Month U.S. Treasury Yield Data:**

The probability that the 3-month Treasury bill yield will be between 1% and 2% in 2 years is shown in column 4: 32.12%. The probability that the 3-month Treasury bill yield will be negative (as it has been often in Europe and Japan) in 2 years is 1.15% plus 0.01% plus 0.00% = 1.16%. Cells shaded in blue represent positive probabilities of occurring, but the probability has been rounded to the nearest 0.01%. The shading scheme works like this:

Dark blue: the probability is greater than 0% but less than 1%

Light blue: the probability is greater than or equal to 1% and less than 5%

Light yellow: the probability is greater than or equal to 5% and 10%

Medium yellow: the probability is greater than or equal to 10% and less than 20%

Orange: the probability is greater than or equal to 20% and less than 25%

Red: the probability is greater than 25%

The chart below shows the same probabilities for the 10-year U.S. Treasury yield derived as part of the same simulation.

** ****10-Year US Treasury Yield Data:**

**Appendix: Treasury Simulation Methodology**

The probabilities are derived using the same methodology that SAS Institute Inc. recommends to its KRIS^{®} and Kamakura Risk Manager^{®} clients, who currently have more than $38 trillion in assets or assets under management. A moderately technical explanation is given later in the appendix, but we summarize it in plain English first.

Step 1: We take the closing U.S. Treasury yield curve as our starting point.

Step 2: We use the number of points on the yield curve that best explain historical yield curve shifts. Using daily data from 1962 through June 30, 2022, we conclude that 10 “factors” drive almost all movements of U.S. Treasury yields.

Step 3: We measure the volatility of changes in those factors and how it has changed over the same period.

Step 4: Using those measured volatilities, we generate 500,000 random shocks at each time step and derive the resulting yield curve.

Step 5: We “validate” the model to make sure that the simulation EXACTLY prices the starting Treasury curve and that it fits history as well as possible. The methodology for doing this is described below.

Step 6: We take all 500,000 simulated yield curves and calculate the probabilities that yields fall in each of the 1% “buckets” displayed in the graph.

**Do Treasury Yields Accurately Reflect Expected Future Inflation?**

We showed in a recent post on SeekingAlpha that, on average, investors have almost always done better by buying long term bonds than by rolling over short term Treasury bills. That means that market participants have generally (but not always) been accurate in forecasting future inflation and adding a risk premium to that forecast.

The distribution above helps investors estimate the probability of success from going long.

Finally, as mentioned weekly in The Corporate Bond Investor Friday overview, the future expenses (both the amount and the timing) that all investors are trying to cover with their investments are an important part of investment strategy. The author follows his own advice: cover the short-term cash needs first and then step out to cover more distant cash needs as savings and investment returns accumulate.

**Technical Details**

Daily Treasury yields form the base historical data for fitting the number of yield curve factors and their volatility. The historical data is provided by the U.S. Department of the Treasury.

An example of the modeling process using data through March 31, 2022 is available at this link.

The modeling process was published in a very important paper by David Heath, Robert Jarrow and Andrew Morton in 1992:

Professor Jarrow’s biography is available here.

For technically inclined readers, we recommend Prof. Jarrow’s book *Modeling Fixed Income Securities and Interest Rate Options* for those who want to know exactly how the “HJM” model construction works.

The number of factors (10 for the United States) has been stable for some time, but the volatilities for each factor are updated monthly and available to subscribers to the KRIS interest rate and macro-factor data service.

**Footnotes:**

[1] After the first 20 years in the simulation, the 10-year Treasury cannot be derived from the initial 30 years of Treasury yields.