Are there other fish in the sea? Exploring the hedge, diversifier and safe-haven features of ESG investments

3.1 Data

To investigate the role of ESG investments, we use daily data from 1st January 2007 to 1st November 2021 on the Dow Jones Sustainability World Index (“DJSI”), the Standard and Poor Global Clean Energy Index (“SPCL”) and the Standard and Poor Green Bond Index (“SPGB”) [3]. DJSI comprises the top 10% of the largest 2,500 companies in the Standard and Poor Global Broad Market Index- S&P Global BMI according to the firms’ sustainability performance defined via the SP Global ESG score, which weighs the environmental and sociopolitical dimensions of each constituent. SPCL, by contrast, includes 100 stocks from SP Global BMI that either derive at least 25% of their revenues from clean energy-related businesses or that exploit renewable energy for their production activity. Finally, SPGB refers to global bonds that have met the eligibility criteria by the Climate Bonds Initiative (CBI). Clearly, these indicators represent different aspects of the ESG ecosystem: the DJSI is the more comprehensive in terms of ESG standards, while the SPCL and SPGB are more environmentally oriented.

The hedge, diversifier and safe-haven capabilities of ESG assets are tested against global equities, commodities and other traditional hedging assets (such as gold), denominated in the US dollars over the same period. In line with Disli et al. (2021), we select the Dow Jones Global Index (“DJ”) as our main proxy for equity performance. This is because of its extensive coverage of the global market. For the commodity market we select instead the SP Goldman Sachs commodity index (GSCI) Commodity Index (“SPCM) as in Graham et al. (2022).

Gold (SP GSCI Gold Index – “GLD”) is chosen firstly because anecdotal evidence and financial media seem to suggest its hedging or safe-haven role for financial assets or portfolios. Indeed, in the era of globalization, where correlations among most types of assets have increased dramatically, gold is still known to be frequently uncorrelated (Baur and Lucey, 2010). A plausible explanation is that, in contrast to many other commodities, gold is durable, easily recognizable, storable, portable, divisible and easily standardized (Baur, 2013); besides, from a historical perspective, it was among the first forms of money and was traditionally used as an inflation hedge. We carry out the analysis from a world perspective to better capture a common and global tendency, necessary for the identification of the general ESG behavior.

Each series is expressed in terms of daily returns, computed as the logarithmic difference between the price at time t and t – 1 [4]. All data are collected from Datastream.

Figures 1–2 graphically report both the price and the return series for the assets under consideration: as can be seen, both the DJSI and the SPCL prices exhibit a sharp fall during the two major financial turmoil events of the sample period, namely, the global financial crisis (GFC) in 2007–2008 and the first COVID-19 outbreak (2020–2021). This is reflected by volatility peaks in the return series. On the other hand, the SPGB prices and returns show major stability (save for some fluctuations) during the whole sample span.

As for the non-ESG investments, some similarities are in place: the equity index accurately reflects the DJSI behavior. The commodity index, instead, shows three major downturn events: during the GFC, during the second half of 2014 and the COVID-19 shock. The GLD series seems less affected by negative shocks, with the price showing overall increasing trends in 2009–2013 and 2019–2020. The volatility clusters of the returns are majorly shown across the well-known financial turmoil, but also in the subperiod 2011–2014.

Table 1 presents the main summary statistics for the return series under investigation: notably, all series are leptokurtic with negative skewness (apart from SPGB). Table 2 reports some diagnostic tests: the augmented Dickey–Fuller (here reported with the acronym ADF; Dickey and Fuller, 1979), the Philipps–Perron, i.e. PP (Phillips and Perron, 1988) and the KPSS (Kwiatkowski et al., 1992) tests for stationarity; the ARCH–LM test (Engle, 1982) for conditional heteroskedasticity, and the Doornik–Hansen normality test (Doornik and Hansen, 2008). All series appear nonnormal, with ARCH/GARCH effects. Moreover, no unit roots seem to be detected [5].

3.2 The cross-quantilogram and the DCC-GARCH model

The CQG apparatus was introduced by Han et al. (2016) as a method to explore the quantile dependence for two series at a different lag order. Formally, given two strictly stationary time series (e.g. asset returns), y_1,t and y_2,t, a quantile hit event is defined as 1[y_i,t < q_i,t(α_i)] for i = 1, 2, where q_i,t(α_i) is the α_i ∈ (0,1) quantile of y_i,t and 1[·] is the indicator function. In other words, a quantile hit process reports those observations falling below the range of a given quantile, potentially signaling outliers with suitable choices of α_i. The cross-correlation between two quantile hits, one for y_1,t and another for y_2,t−k, for an arbitrary couple (α₁, α₂) with k = 0, 1, …, is defined as CQG:

The sample counterpart of equation (1) is given by:

Clearly, ρ^(α1,α2)(k)∈[−1,1] with the limiting values meaning perfect negative and perfect positive correlation, respectively. Needless to say, positive values of ρ^(α1,α2)(k) indicate a comovement in the same direction for the quantile hit processes; negative values, on the other hand, represent a comovement in opposite directions, that is, observations falling inside a given α₁-quantile for y_1,t will correspond to observations of y_2,t−k outside its α₂-quantile. For k > 0, the information pertaining to y_2,t−k obviously predates y_1,t, implying the so-called directional predictability: a quantile hit 1[y_2,t−k < q_2,t−k(α₂)] is likely to be followed after k periods by a quantile hit 1[y_1,t < q_1,t(α₁)] if ρ^(α1,α2)(k)>0 or 1[y_1,t > q_1,t(α₁)] if ρ^(α1,α2)(k)<0. This information becomes particularly useful in evaluating the persistency and the dynamic of a shock. For example, a given correlation reported at k = 0 will appear smaller and smaller in magnitude the more k grows because of market efficiency.

Finally, the asymptotic distribution for ρ^(α1,α2)(k) is derived via the stationary bootstrap method (Politis and Romano, 1994); for instance, the (1 − γ) confidence interval for ρ(α1,α2)(k) is defined as [ρ^(α1,α2)(k)+T−12c1,k,γ; ρ^(α1,α2)(k)+T−1/2c2,k,γ ], where c_1,k,γ and c_2,k,γ are the critical values obtained as percentiles of the bootstrapped distributions.

The DCC model, on the other hand, belongs to the well-known family of multivariate GARCH and allows to assess the time-varying conditional correlations of a set of m asset returns y_t = y_1,t, y_2,t, …, y_m,t). The underlying assumption postulates that the process u_t = y_t − E (y_t|I_t−1)), where I_t−1 denotes the information set at time t – 1, as follows:

3.3 Safe-haven, hedge and diversifier asset with the cross-quantilogram

Scholars lack consensus on how exactly defining safe-haven assets. Currently, the most comprehensive definition is that strong (vs weak) safe havens show negative dependence (vs absence of any dependence) with other assets in extreme market conditions (Baur and Lucey, 2010). While the search for safe-haven assets mainly occurs during market downturns, there is always a need to hedge or diversify an investment portfolio (Baur and McDermott, 2010). Accordingly, we differentiate between a diversifier, hedge and safe haven (Baur and Lucey, 2010; Ratner and Chiu, 2013). A diversifier is an asset that has, on average, a weak positive dependence with another asset; while a weak (strong) hedge is an asset that on average has no association (negatively dependence) with another one.

Recalling that a safe-haven asset is uncorrelated or negatively associated with the benchmark series during financial downturns, the corresponding CQG requirement is zero or negative correlation for the ESG at the lower quantile hits for the stock or commodity asset. More formally, we inspect the quantile hits in all combinations of deciles for the two assets, and we deem a series y_ESG,t to have safe-haven properties with respect to the concurring series y_{non−ESG,t−k} at time lag k, if ρ^(αESG,αnon−ESG)(k)≤0 for α_non−ESG = 0.10 versus any α_ESG. This categorization extends the one proposed by Shahzad et al. (2019), Cho and Han (2021) and Ji et al. (2020), which relies only upon extreme quantile combinations such as (α_ESG = 0.10, α_non−ESG = 0.10). The reasoning can be easily understood via an example: the quantile hit combination (α_ESG = 0.10, α_non−ESG = 0.10) signals, in case of negative correlation, that a downturn in non-ESG returns is followed by ESG returns falling above the 0.10 quantile. This case contains potential above-median returns but also some below-median ones which clearly cannot properly convey safe-haven qualities. On the other hand, considering all the combinations in α_ESG rules out this possibility. Moreover, we expect that an ideal safe-haven asset would exhibit increasing negative correlations (in absolute terms) moving from (α_ESG = 0.10, α_non−ESG = 0.10) to (α_ESG = 0.90, α_non−ESG = 0.10).

By contrast, a diversifier or hedge asset requires, respectively, small positive or null-negative dependence in “normal times”: a diversifier behavior can be acknowledged for y_ESG,t with respect to y_{non−ESG,t−k} when small positive correlations ( 0<ρ^(αESG,αnon−ESG)(k)<0.50) are detected along most of the quantile combinations; a hedge, conversely, should mainly report ρ^(αESG,αnon−ESG)(k)≤0. Finally, an asset is a diversifier/hedge/safe haven in the strict sense only when the above classifications are consistent and compatible for different k of the non-ESG series [6].

3.4 Safe-haven, hedge and diversifier asset with the DCC model

Aligning the previous definitions with the DCC model is more immediate; in particular, the estimate of Γ from equation (3) conveys (static) information on the correlation pattern of the series y_t = (y_ESG1,t; y_ESG2,t; …; y_non−ESG1,t; y_non−ESG2,t; …) over the whole sample period. This provides hints for judging the diversifying or hedging nature of a couple (y_ESG,t; y_non−ESG,t) when mild positive or null-negative effects are spotted, similarly to CQG analysis. In the same way, the estimated dynamic correlation R^t should display an analogous overall tendency. Safe-haven qualities may be indirectly recognized by identifying temporary null or negative correlation peaks in R^t during financial downturn events.

However, to further improve upon the previous classification, we introduce two regression models derived from the DCC results: the first one borrowed from Baur and McDermott (2010) and Ratner and Chiu (2013) postulates:

In the second regression framework, we propose the following modification:

To summarize, while the interpretation of γ₀ and γ₁ remains mostly the same, if γ₂ and γ₃ are negative or null may indicate a temporary hedging (γ₂) or safe haven (γ₃) property when |γ₂| and/or |γ₃| are large enough to induce a huge negative variation in the correlation pattern.

4.1 Cross-quantilogram results

We report the results of the CQG approach in the form of heatmaps, where we consider the y_ESG,t on the x-axis and the concurring y_{non−ESG,t−k} on the y-axis; as previously mentioned, all deciles combinations are explored. Red tones identify positive correlations, blue ones negative, while white is associated with uncorrelation. We consider lags k = (0,1) to capture the immediate ESG return adjustment with respect to the stock-commodity benchmark; we do not account for major order lags since the main portfolio reallocations are expected to occur near the event.

Figure 3 displays the quantile cross-correlations considering k = 0 for the non-ESG asset: the DJSI shows a high positive correlation along the main diagonal with respect to DJ, suggesting a strong comovement not only in adverse market conditions (bottom-left corner) but also in normal and favorable times. In this sense, the DJSI does not seem to belong to any previously defined category. The comparison with the SPCM reveals again an overall positive correlation, but smaller in magnitude. On this basis, one could possibly classify the DJSI as a diversifier for the commodity index. Milder correlations are spotted with respect to GLD. The SPCL pattern replicates the DJSI one: high positive quantile correlations are reported versus the equity index along most quantile combinations, while softer tones are detected when considering the commodity or the gold series. The SPGB, by contrast, exhibits much weaker positive correlations with respect to DJ: this may be a weak hint for a diversifier nature. This line of reasoning becomes even more appealing when considering quantile dependency with the SPCM. The comparison with GLD is close in spirit; however, it is worth mentioning that the SPGB manifests a more marked positive correlation with this commodity with respect to the other two ESG assets. Safe-haven qualities, represented by white-blue tones in the bottom line, are absent for all ESGs under investigation.

Moving to the CQG with k = 1 for the non-ESG series, Figure 4 reports how most ESG assets hugely reduce the correlation magnitude, hinting at diversifying properties with reference to both stock and commodity markets. The DJSI shows small positive (and sometimes null) correlations over most quantile combinations when coupled with DJ. The same applies to both SPCL and SPGB. The comparisons with the commodity index reveal a similar tendency, strengthening the evidence of ESG indices having a diversifying nature. Interestingly, we detect some negative correlations as well, especially in the bottom right corner (note that this result does not contradict the possible positive correlation in the opposite corner). This is, however, rather limited evidence for hedging or safe-haven qualities. Finally, null quantile cross-correlation (with both positive and negative peaks) appears when considering DJSI and SPCL with respect to GLD; the sole exception is SPGB, which exhibits an overall positive correlation.

Combining these facts with the heatmap findings of lag k = 0 leads us to the conclusion that SPGB acts as a diversifier in the strict sense for the equity and the commodity market, while DJSI and SPCL have this property for the sole commodity. The comparison with GLD shows, again, diversification effects for all ESG indices. We refer, however, to Appendix 1 for a more detailed and comprehensive analysis of the GLD role. In Appendix 2, we present an extension of our framework based on the partial CQG so as to control for the effects of external variables on cross-quantile dependence.

4.2 Quantile cross-dependence using rolling windows

To strengthen the validity of our results and to further explore the ESG investment properties, in this subsection, we report the result of the quantile cross-dependence using rolling windows. As pointed out by Shahzad et al. (2019) and Uddin et al. (2019), the CQG analysis over a specific time span is a static picture of reality and does not account for time-varying dynamics. To overcome this issue, we undertake the following exercise: the CQG is computed over recursive samples of 261 days (a single year), obtained by simply shifting the window by a single day ahead until the end of the sample (November 1, 2021).

Rather than evaluate all quantiles, we opt for simplicity and consider the quantile combinations (α_ESG = 0.1; α_{Not ESG} = 0.1), (α_ESG = 0.5; α_{Not ESG} = 0.1) and (α_ESG = 0.9; α_{Not ESG} = 0.1) using again lag k = 0, 1. This choice reflects our interest in discovering temporary safe-haven properties that may not be visible in “static” representations. Moreover, we solely focus on the equity (Figures 5–6) and commodity index (Figures 7 – 8).

All the figures display the dynamic CQG for the related quantile combinations under the blue line; the red ones, instead, represent the 95% confidence interval limits. We derive these values using the stationary bootstrap with 5,000 replications. The columns report the quantile combinations following the order of appearance presented above. The result for the couple (ESG_t; DJ_t−k) at k = 0 is presented in Figure 5: for the quantile combination (α_ESG = 0.1; α_DJ = 0.1), both DJSI and SPCL reveal a strong positive correlation with some marked fluctuation during the major financial shock events. The SPGB displays again milder correlations with negative peaks appearing during market turmoil, such as the case of the COVID-19 pandemic (the window January–March 2020, corresponding to the first outbreak, is an example). The combinations (α_ESG = 0.5; α_{Not ESG} = 0.1) and (α_ESG = 0.9; α_{Not ESG} = 0.1) produce similar conclusions: all ESG series, except for the SPGB, are mostly positively correlated. SPGB, instead, shows null or negative trends after 2014, with outliers occurring during both the sovereign debt crisis and the COVID-19 pandemic.

When considering a day lag (k = 1) as in Figure 6, all ESGs exhibit overall smaller correlations: DJSI and SPCL display negative fluctuations with peaks occurring more frequently the further we move from (α_ESG = 0.1; α_{Not ESG} = 0.1) to the other two quantiles (especially during COVID-19). The same is partly true for SPGB: as reported in the first column, negative correlations appear, but a marked positive break is present at the end of the sample. Columns 2 and 3 are in line with the other ESGs. An interpretation of this dual behavior of ESGs versus DJ moving from k = 0 to k = 1 could be the following: when the equity market is shocked, the impact is immediately transmitted to the ESG market with an analogous effect (positive correlation). However, with a one-day lag, investors move to the ESG market expecting more profitability and resiliency (decreasing positive and negative correlation).

Figure 7 reports the analysis with respect to the SPCM at lag k = 0: this time, the instantaneous response at (α_ESG = 0.1; α_{Not ESG} = 0.1) shows less pronounced correlations, with some null or even negative events for the DJSI and more markedly for SPCL. This result is even clearer moving to (α_ESG = 0.9; α_{Not ESG} = 0.1). SPGB once again reflects better performance in terms of smaller positive correlations and null-negative ones over the different quantile combinations. With k = 1 (Figure 8), the ESGs manifest a clearer tendency for negative correlations aligning with the previous analysis versus DJ.

To sum up, the time dynamics of CQG suggest that quantile dependence is actually affected by the time span. In this regard, we observe plausible safe-haven conditions for SPGB versus DJ and SPCM: all the considered quantile combinations simultaneously experienced null or negative correlations at both k = 0 and k = 1, with an increasing magnitude from (α_ESG = 0.1; α_{Not ESG} = 0.1) to (α_ESG = 0.9; α_{Not ESG} = 0.1). The SPCL and DJSI share some similarities only at k = 1 and in the commodity market.

4.3 DCC GARCH analysis

For our design, we assume a DCC model with normal innovations where y_t = y_DJSI,t, y_SPClean,t, y_GreenBond,t, y_DJ,t, y_Comm,t, y_Gold,t), v_t modeled as GARCH(1,1) and A and B as scalars. The sample ranges from January 1, 2009 to November 1, 2021 [7].

The estimates for Γ, A, B are reported in Table 3: the coefficients for Γ are all positive and significative, signaling the absence of hedging properties. However, the magnitude of the correlation between the SPGB and DJ may suggest a diversifying nature; the same finding arises when comparing the correlation of all ESGs with the commodity ones. The inspection of R^ in Figures 9–10 reveals similar conclusions. Figure 9 displays the dynamic correlation between the three ESGs with respect to DJ: only the SPGB case shows a moderate-small correlation compatible with diversifying qualities. Moreover, note that a few negative peaks are also reported during the main financial turmoil events, hinting at potential safe-haven properties. Figure 10, instead, compares the correlations of ESGs versus SPCM: in this case, all three series seem to act as diversifiers, with some potential safe-haven properties for the SPGB.

To further deepen the analysis, Table 4 collects the estimation results from equation (4), where we regress R^(ESG,DJ),t for the various ESG indices on a constant and on a 0.1-quantile hit for the DJ index: all coefficients appear positive and significant, excluding both hedging and safe-haven possibilities. The SPGB confirms to be a diversifier for the equity market as suggested by the intercept coefficient. Table 5 reports instead the linear model for R^(ESG,SPCM),t with a constant and a commodity market quantile hit: all ESG series confirm the diversifying nature.

Finally, the extension as in equation (5) is reported in Table 6 for R^(ESG,DJ),t and in Table 7 for R^(ESG,SPCM),t where the temporal dummy C_t is set to 1 during the first COVID-19 outbreak (from January 1, 2020, to March 31, 2020) [8]. In Table 6, we find that the estimated coefficients for γ₂ and γ₃ are statistically null for both DJSI and SPCL, as opposed to γ₀ and γ₁, which are positive. It is reasonable to conclude that despite the null coefficients for the temporal dummy and the interaction term, the overwhelming effect of γ₀ rules out the possibilities for any hedge or safe-haven property. The SPGB case, instead, manifests not only negative and significant γ₂ and γ₃, but their magnitude is large enough to counter the positive effect of γ₀. Overall, the SPGB seems to be a diversifier for the stock market, but during the COVID-19 period, it temporally evolves into a hedge and safe haven, a finding which is confirmed by the rolling window experiment in Section 4.2. In Table 7, all ESGs seem to act as diversifiers for the commodity index, with the SPGB manifesting once again hedging and safe-haven qualities.

Concluding, the regression experiments confirm the results of Sections 4.1–4.2 to the extent that SPGB works as a diversifier for both stock and commodity markets, showing safe-haven (and hedging) quality in peculiar timeframes. DJSI and SPCL, instead, belong only to the first category when compared to the commodity index.