2.1. Physical description of the El Niño Southern Oscillation

ENSO is a naturally occurring climate mode of variability with chaotic multiyear variations in sea-surface temperature and winds over the tropical Pacific Ocean (Bjerknes, Reference Bjerknes1969). Phenomenologically, it comprises of the mature phases La Niña and El Niño, and also the neutral phase. It takes between 3 and 7 years to transition from one mature phase to the other and back again, via the neutral state. A canonical La Niña is illustrated in Figure 2a, with cooler than average waters in the eastern Pacific (blue oval). It is warmer than average in the west (red oval), which is accompanied by a local transfer of ocean mass to the atmosphere via enhanced evaporation. Ocean currents flow from the cooler water in the east, with an enhanced upwelling of the even cooler deeper water in the eastern Pacific. This means that the depth at which the ocean temperature matches that of the deep ocean shallows in the east due to upwelling, and deepens in the west due to anomalously warm surface temperatures. Along the equator, this depth is referred to as the equatorial thermocline. Typically, the thermocline slopes upward from west to east, and this slope is accentuated during a La Niña phase. This state has anomalously more heat (yellow arrows) transported to the region between the sea surface and the thermocline across the tropical Pacific. According to the recharge/discharge oscillator theory, this heat transfer plays a key role in the periodic transition between the phases of ENSO (Jin, Reference Jin1997). In response to the ocean temperatures, the hot moist atmospheric air in the west convects upward, and this space is taken up by the cool dry air from the east. The hot air in the west travels toward the east where it cools, sinks to the surface, and completes an atmospheric loop referred to as the Walker circulation (gray arrows). As illustrated in Figure 2b, El Niño is characterized by an anomalously warm eastern Pacific (red oval), and cool western Pacific (blue oval). The slope of the thermocline decreases due to a deepening in the east and shallowing in the west, with less ocean heat content retained overall (yellow arrows). In the atmosphere evaporation, convection and rainfall are now enhanced in the central to eastern Pacific, and the Walker circulation breaks down. The neutral phase is topologically similar to La Niña, but with less extreme anomalous temperature, winds, convection, and precipitation. There is also evidence for a greater variety of transitional phases (Froyland et al., Reference Froyland, Giannakis and Lintner2021). Due to climate teleconnections, ENSO can affect rainfall and temperature to more distant nonlocal regions of the Earth, with the strongest influences in the tropics. The phases of ENSO have seasonal, asymmetric, and heterogeneous impacts on rainfall and temperature (and potentially economic activity) over the entire Earth (Westra et al., Reference Westra, Renard and Thyer2015).

Figure 2. Atmospheric and oceanic structure during phases of El Niño Southern Oscillation (ENSO): (a) La Niña and (b) El Niño. The black box indicates the region of the Niño4 index. The neural phase of ENSO is topologically similar to La Niña with less extreme anomalous temperature, winds, convection, and precipitation.

2.2. Climate observations

For the true historical observations of ENSO, we adopt the monthly averaged surface air temperature (SAT) fields from the Japanese reanalysis (JRA) dataset of Kobayashi et al. (Reference Kobayashi, Ota, Harada, Ebita, Moriya, Onoda, Onogi, Kamahori, Kobayashi, Endo, Miyaoka and Takahashi2015). We calculate the phase and magnitude of ENSO using the typical Niño4 index, given by

(1) $$ {E}_{\mathrm{obs}}(d)\hskip0.35em =\hskip0.35em \left\langle {T}_{0,\mathrm{obs}}\left(x,y,d\right)-{\overline{T}}_{0,\mathrm{obs}}\left(x,y,\tau \right)\right\rangle, $$

where $ {T}_{0,\mathrm{obs}}\left(x,y,d\right) $ is the monthly averaged SAT field at date d, of longitude x and latitude y. The angled brackets represent the spatial averaging within a tropical region in the eastern Pacific from 5°S to 5°N and 160°E to 150°W, represented by the black box in Figure 2. $ {\overline{T}}_{0,\mathrm{obs}}\left(x,y,\tau \right) $ is the climatological averaged SAT field, where τ represents the month of the year. A climatological average is the field (e.g., SAT) averaged over an historical multiyear time period including only the desired month of the year (e.g., January and February). Here, this predefined historical period is set to be the in-sample period over which the model coefficients are learnt, which by definition is prior to the out-of-sample period for all forecasts presented in the current study. Positive values of $ {E}_{\mathrm{obs}}(t) $ indicate the El Niño phase, and negative values La Niña. The event strength is proportional to the magnitude of the index, with magnitudes less than half of the standard deviation (STD) of the signal typically classified as being in a neutral phase. In the out-of-sample forecasts, we use this dataset to calculate the ENSO-related model coefficients and initial conditions.

2.3. Climate model forecasting

As mentioned in Section 1, the general circulation model (GCM)-ENSO forecast dataset exploited here was generated using the CAFE system (O’Kane et al., Reference O’Kane, Sandery, Monselesan, Sakov, Chamberlain, Matear, Collier, Squire and Stevens2019, Reference O’Kane, Squire, Sandery, Kitsios, Matear, Moore, Risbey and Watterson2020). The vast range of scales present in the global climate makes its numerical simulation exceedingly challenging. Even on the largest available supercomputers, it is not computationally tractable to have a grid domain large enough to capture the entire globe while having grid divisions small enough to resolve the finest scale turbulence. Since the representation of ENSO is key in this study, the adopted GCM must have sufficient spatial resolution to explicitly resolve its dynamics. This is illustrated in Figure 1, with the GCM ocean grid resolution indicated by the vertical dotted line being smaller than (or to the left of) the gray ENSO oval. Any physical phenomena to the left of the dotted line are unresolved with their influence on the large scales parameterized, and are hence not predictable with the current system. Specifically, the ocean grid has 1° resolution in longitude, higher latitudinal resolution in specific regions, and 50 vertical levels (Bi et al., Reference Bi, Marsland, Uotila, O’Farrell, Fiedler, Sullivan, Griffies, Zhou and Hirst2013). The sea-ice model has the same horizontal resolution as the ocean grid, with five ice thickness categories. The atmospheric grid has a resolution of 2° in latitude, 2.5° in longitude with 24 vertical levels. The atmosphere is driven by realistic incoming solar radiation, aerosols, radiative gases, and land cover.

The climate forecasts are initiated from start dates at the beginning of each month between February 2002 and December 2015, inclusive. The initial conditions are tailored (or bred) to target the longer ENSO-related timescales, which comes at the expense of reduced skill at the shorter lead times (O’Kane et al., Reference O’Kane, Sandery, Monselesan, Sakov, Chamberlain, Matear, Collier, Squire and Stevens2019). This point will become important in the discussion of the forecast skill metrics in the following sections, and is described in further detail in Appendix A. The associated Niño4 indices are calculated according to

(2) $$ {E}_{\mathrm{gcm}}\left(d,\Delta t\right)\hskip0.35em =\hskip0.35em \left\langle {T}_{0,\mathrm{gcm}}\left(x,y,d,\Delta t\right)-{\overline{T}}_{0,\mathrm{obs}}\left(x,y,\tau \right)\right\rangle, $$

where $ {T}_{0,\mathrm{gcm}}\left(x,y,d,\Delta t\right) $ is the monthly averaged and ensemble-averaged SAT field from the GCM forecast dataset, Δt is the forecast horizon in months, and we again adopt the climatological average calculated from the JRA dataset $ {\overline{T}}_{0,\mathrm{obs}}\left(x,y,\tau \right) $ over a consistent climatological period. The GCM forecast initial conditions are indexed by d, where d = 0 refers to the first forecast initiated on February 1, 2002, d = 1 refers to March 1, 2002, and so on until the final forecast starting on December 1, 2015. Note that the GCM Niño4 index $ {E}_{\mathrm{gcm}}\left(d,\Delta t\right) $ is dependent upon both the initialization date d and the lead time Δt, since by virtue of the nonlinearity of the Earth system, a forecast 1 month ago will in general not coincide with the initial conditions today. The observations, however, are only dependent upon that date in question (i.e., $ {E}_{\mathrm{obs}}\left(d+\Delta t\right) $ ). In the econometric models of the commodities to follow, the monthly averaged climate data are only known at the beginning of the following month, to ensure that no future information is used.

These GCM Niño4 indices are additionally shifted and rescaled in a fair way using only data prior to the initialization data to remove persistent model biases, as detailed in Appendix B. Note that the debiasing requires several historical forecasts to be effective. For this reason, statistical measures of forecast skill are averaged over a common set of forecast start dates from February 2003 to December 2015.

2.4. Econometric time series forecasting of ENSO

We determine the most parsimonious AR representation of ENSO with additive seasonality, and compare its forecast skill to that of the GCM forecasts discussed in the previous section. We assume that the commodity price has no impact on ENSO, which is a typical assumption in the literature since ENSO is a naturally occurring climate mode that would have still been oscillating in the absence of humanity. As such, the ENSO model structure is given by

(3) $$ E(t)\hskip0.35em =\hskip0.35em {a}^{EE}+\sum \limits_{l\hskip0.35em =\hskip0.35em 1}^{11}{a}_l^{EE}{D}_l(t)+\sum \limits_{k\in {\mathbf{l}}^{EE}}{b}_k^{EE}E\left(t-k\right), $$

where $ {D}_l(t) $ is a binary variable equal to one during month l, and zero otherwise. The model offset $ {a}^{EE} $ , and associated month specific offsets $ {a}_l^{EE} $ , capture any potential additive seasonality. In the remaining summation, $ {\mathbf{l}}^{EE} $ is a vector of lags with associated model gradients $ {b}_k^{EE} $ .

The procedure for determining the model structure is as follows. We assess all combinations of lags up to 12 months building models using all of the available data from January 1980 to December 2020. The first check is to ensure there is no significant serial autocorrelation in the residuals. Any models that contain residual lagged autocorrelations that exceed a 95% confidence level for any lag up to 12 months are excluded. Likewise, models that are shown to be heteroskedastic to a 99% confidence level on the basis of Engle (Engle, Reference Engle1982) tests are also excluded. Of the remaining combinations of lags, we then determined the most parsimonious model as that minimizes the Bayesian information criterion (BIC; Schwarz, Reference Schwarz1978)

(4) $$ \mathrm{BIC}\hskip0.35em =\hskip0.35em 2{N}_p\log (N)+N\log \left(\frac{\hskip0.1em \mathrm{RSS}\hskip0.1em }{N}\right), $$

where N is the number of samples, N_p is the number of parameters, and RSS is the residual sum of squares. We also assess the Akaike information criterion, its correction for small sample sizes, and the Hannan–Quinn information criterion, all yielding the same result for ENSO.

2.5. Econometric time series commodity forecasting

The most parsimonious AR representation of the commodity real log returns is determined as follows. The commodity prices (P(t)) used in this study were sourced from the World Bank database (www.worldbank.org/en/research/commodity-markets). The real commodity log returns $ p(t)\hskip0.35em =\hskip0.35em \left(1+i(t)\right)\times \left(1+\tilde{p}(t)\right)-1 $ , where the nominal rate $ \tilde{p}(t)\hskip0.35em =\hskip0.35em \log \left(P(t)/P\left(t-1\right)\right) $ . The monthly inflation rate, $ i(t)\hskip0.35em =\hskip0.35em \log \left(C(t)/C\left(t-1\right)\right) $ , is calculated on the basis of the G7 averaged consumer price index (denoted by C(t)), which was obtained from the OECD data portal (http://data.oecd.org).

Allowing for additive seasonality, AR processes, and lagged exogenous ENSO factors, the model representation of P(t) is given by

(5) $$ p(t)\hskip0.35em =\hskip0.35em {a}^{pp}+\sum \limits_{l\hskip0.35em =\hskip0.35em 1}^{11}{a}_l^{pp}{D}_l(t)+\sum \limits_{k\in {\mathbf{l}}^{pp}}{b}_k^{pp}p\left(t-k\right)+\sum \limits_{k\in {\mathbf{l}}^{pE}}{b}_k^{pE}E\left(t-k\right), $$

where $ {a}^{pp} $ is the offset and $ {a}_l^{pp} $ the month-specific offsets. In the remaining summations above, $ {\mathbf{l}}^{pp} $ is a vector of endogenous lags with associated model gradients $ {b}_k^{pp} $ , and $ {\mathbf{l}}^{pE} $ is a vector of lags for ENSO influencing the evolution of the log returns in model gradients $ {b}_k^{pE} $ . The procedure for calculating the model coefficients is as discussed for the AR ENSO model; however, we now assess all combinations of lags up to 12 months in both the endogenous and exogenous variables.