Comovement and contagion in commodity markets

Abstract This article investigates comovement and contagions in the commodities markets. We examine the comovement by analyzing the unconditional correlation coefficients. We document that commodities tend to partially integrate. We perform contagion tests by identifying coexceedances and estimating multinomial logit to explain the joint occurrence of those coexceedances. We document that commodities price changes tend to affect the probability of both positive and negative coexceedances. Overall, we conclude that there are comovement and contagions among commodities. However, the degrees of comovement and contagion are different among commodities and between positive and negative extreme returns. The contagion among commodities is asymmetric.


Introduction
There is a tremendous increase in investments in commodity markets. According to Basu and Miffre (2013), institutional investments in commodity markets have increased from $18 billion in 2003 to $250 billion in 2010. Basak and Pavlova (2016) also document that investments in commodity futures have increased from $15 billion in 2003 to over $200 billion in 2008. Overall, we can conclude that commodities markets have transformed into alternative investments (indeed, this perception is similar to Vivian & Wohar, 2012;Algieri & Leccadito, 2017). These ABOUT THE AUTHOR Our major research cluster is financial markets. Specifically, we are interested in analyzing and evaluating portfolios. One of the research subfields is examining the risk and return of commodities portfolios. We have worked and published a research manuscript investigating a risk component -GARCH volatility -in the commodities market. A thorough study of this volatility analysis inspires us to study hedging benefits (a further risk-return analysis) of commodities portfolios. We document that for stock portfolio managers, adding commodities will generate a more conservative strategy, whereas for bond and/or FX portfolio managers, adding commodities will generate a more aggressive strategy. Then, we examine another risk of commoditieswhether there is another independencies riskcomovement and contagions. This manuscript will contribute to our bigger research theme in the commodities portfolio.

PUBLIC INTEREST STATEMENT
We are now living in an interconnected world. A consequence of interconnection is the contagion effect. Like a disease, a commodity could also transmit its properties into another commodity's properties. Using statistical methods inspired by the biological definition of contagion, we investigate contagions in the commodities markets. We find that there are contagions among commodities. However, the degrees of contagion are different and asymmetric among commodities. An investment manager shall carefully weigh this contagion risk when investing funds in the commodity markets.
There are at least two thoughtful risk management questions given the financialization of commodity markets. First, as more investors consider commodities as investments, do commodities integrate? Second, is there any potential diversification benefit by investing among commodities? Those two questions are indeed related. A strong argument explaining the relationship comes from Elliott et al. (2014). They argue that there is no contagion without integration. This implies that integration tends to lead contagion. Therefore, a study assessing the degree of contagion will likely answer whether commodities integrate and possess (or have less) diversification benefits. If the commodities integrate, they tend to be more dependent. This dependence causes high comovement, even contagion, among commodities; thus, there would be less diversification benefits at all.
In financial markets, a number of studies investigate financial networks and financial contagion (see, Aït-Sahalia et al., 2015;Allen & Gale, 2000;Bae et al., 2003;Brusco & Castiglionesi, 2007;Elliott et al., 2014;Kodres & Pritsker, 2002;Leitner, 2005;Pasquariello, 2007). Financial institutions tend to have strong dependencies. Thus, it is intuitive to think that a problem in a financial institution will spread quickly to other financial institutions. Suppose that a bank is suddenly shut down for any reason. Since a bank generally holds many positions with other banks, other banks will be affected and could also experience serious trouble. A recent example is the collapse of Lehman Brothers.
As commodity markets become financialized, the question whether commodities integrate arises. Contagion and integration are closely related. Therefore, we can infer the integration of commodity markets by investigating the contagion in commodity markets. Understanding the degree of contagion in commodity markets is essential because we can explore whether the diversification benefits exist in commodity markets. This knowledge of diversification benefits is essential for investors wishing to develop a portfolio containing commodities.
There are a number of studies on contagion in commodity markets (for instance, Algieri & Leccadito, 2017;Andriosopoulos et al., 2017;Ayadi et al., 2021;Chevallier & Ielpo, 2013;Ferrer et al., 2018;Han et al., 2015;Ignatieva & Ponomareva, 2017;Ji et al., 2017;Kang et al., 2017;Malik & Umar, 2019;Naeem et al., 2020;Nagayev et al., 2016;Nazlioglu et al., 2013;Reboredo et al., 2014;Yip et al., 2017;Zainudin & Mohamad, 2021). However, most of these studies investigate the contagion between commodities and economic variables. None of these studies investigate the contagion among commodities. While recent work from Han et al. (2015) and Zhou and Huang (2020) examine the price link between commodities, their scope is limited to the contagion between energy and/or agriculture commodities. Chevallier and Ielpo (2013) and Ji et al. (2017) also exclusively focus on risk spillover rather than price contagion among commodities. Likewise, recent papers by Adhikari and Putnam (2019) Nguyen et al. (2020) investigate only comovement or dependence (not contagion) among commodities. Umar et al. (2022) examine comovement (but not contagion) between commodities with the focus on energy as the leading series. Balcilar et al. (2021) examine the joint connectedness between oil and other agricultural commodities. This paper fills the research gap by investigating the contagion among commodities. We analyze both comovement and contagion (similar but different concepts) in commodity markets using methods that handle heteroskedasticity bias and resemble the biological definition of contagion.
A simple approach to examine a contagion is calculating the correlation among variables. However, this method is not sufficiently robust (at least according to Bae et al., 2003). Bae et al. (2003) argue that it is not appropriate to use correlations to evaluate the different impacts of large returns. The propagation of large returns is hidden in correlation measures because correlation gives equal weight to small and large returns. Thus, a few days of large returns might be hidden by numerous days of small returns. Furthermore, the definition of contagion is not straightforward (Forbes & Rigobon, 2002), and there were at least 124 empirical studies on financial market contagion in different journals from 1990 to 2016 (Seth & Panda, 2018). These findings demonstrate that investigation contagion is not simple. In this article, we perform the contagion in commodity markets by examining the comovement among commodities and then utilize the contagion test. Our methods in examining the comovement closely follow Forbes and Rigobon (2002) by analyzing the unconditional correlation coefficients and Chan et al. (2007) by comparing the correlations between within-category and outside-category commodities. Our contagion tests closely follow Bae et al. (2003) by performing two steps: i) identifying coexceedances (extreme returns) and ii) performing multinomial logit to explain joint occurrence of those coexceedances. However, our work is different from theirs since we focus on the contagion among commodities, while they focus on the contagion across and within countries.
This paper contributes to the literature by investigating the contagion among commodities. Assessing the contagion in commodity markets enables us to know not only whether commodities The remainder of the paper is organized as follows. Section 2 explains the data. Section 3 describes the method. Section 4 discusses the empirical results. Section 5 concludes.

Data
Our sample includes daily series of sixteen commodity prices. The sixteen commodities were listed in Tang and Xiong (2012). Table 1 describes further details about each commodity used in our sample. We obtained the data from Datastream. Our sample includes the commodities daily series from 1 January 1999 to 1 November 2017. The starting sample period is inspired by the fact that commodity futures have emerged as a popular asset class for many financial institutions (Han et al., 2015;Tang & Xiong, 2012). Tang and Xiong (2012) further noted that commodity markets tended to be fragmented from each other and from outside financial markets before 1999. They also observed that many institutions considered commodities as new asset classes after the 1999ʹs equity market shock. We end our sample in 2017 because we focus on the existence of the long-term impact of exogenous risks in the commodity markets. Those exogenous risks are clearly identified as geopolitical and trade policy uncertainties (see, C. Yang et al., 2022).

Method
There are a number of contagion and cointegration tests, including Bai et al. (2018) Our first focus here is filtering the heteroskedasticity biases in the comovement among commodities. It is not uncommon to find heteroskedasticity in commodity markets (Cavaliere et al., 2015;Liu & Tang, 2011). An appropriate test to filter such biases is Forbes and Rigobon (2002). Our second focus here is to examine financial contagion using the contagion test that is inspired by epidemiology research on contagious diseases. A financial contagion test that is close to the biological contagion analysis is Bae et al. (2003), who use multinomial logistic analysis.

Comovement
The first step of our analysis is calculating the correlation among commodities. Calculating the correlation enables us to examine the linkages among commodities. However, simple correlation coefficients are conditional on market volatility (Forbes & Rigobon, 2002). Therefore, during a high volatility period, estimates of correlation coefficients tend to be biased upward. Forbes and Rigobon (2002) develop a procedure to adjust the bias. Furthermore, Chan et al. (2007) propose a more robust approach to compare the correlations between within-category and outsidecategory commodities.
We follow Forbes and Rigobon (2002) in calculating the adjusted correlation coefficient as follows ρ A ¼ ρ ffi ffi ffi ffi ffi ffi ffi ffi ffi ffi ffi ffi ffi ffi ffi ffi ffi ffi ffi ffi ffi ffi ffi ffi ffi ffi ffi where ρ A refers to the adjusted correlation coefficient, ρ refers to the unadjusted correlation coefficient, σ h denotes the average standard deviation (volatility) of two commodities during a high variance period, and σ l denotes the average standard deviation (volatility) of two commodities during a low-variance period. The low-variance period refers to the period of relative market stability, and the high-variance period refers to the period of market turmoil directly after a shock or crisis. Following their definition, we defined the high-variance period as the period from 15 September 2008 to 16 October 2012. The high-variance period reflects the highest observed volatility in commodity markets (Han et al., 2015). Then, we use t-tests to evaluate whether there is a significant increase of both unadjusted and adjusted correlation coefficients during the highvariance period as follows: If both the null hypotheses are not rejected, we conclude that there is no contagion, only interdependence.
Then, we follow Chan et al. (2007) in comparing the correlations between within-category and outside-category commodities. First, we calculate the average pairwise correlations between commodity c's return and the return on each of the other commodities of its category (CAT): where ρ ci,cj is the time-series correlation between the return on commodity i (ci) and commodity j (cj), and N denotes the number of commodities in the category. Then, the average pairwise correlation between commodity i's return and the return of all other commodities in different categories is calculated as follows: where K denotes the number of all commodities in our sample. We then calculate the average within-category correlation over all commodities in the sample as follows: The average correlation between a commodity and other commodities in different categories is calculated as follows Finally, similar to the hypotheses in equation (2), we compare the values of and assess the degree to which the commodity category distinguishes between similar and dissimilar commodities: If the null hypothesis is not rejected, we conclude that there is no comovement difference between within-category and outside-category commodities.

Contagion
The second step in our analysis is performing the contagion test. Our contagion test here follows Bae et al. (2003). First, we identify the extreme returns, i.e., exceedances, of the commodities in a category. We define the extreme return, or exceedance, as a return either below (above) the 5 th (95 th ) quantile of the commodity's return distribution. Note that two exceedances mean one coexceedances, three exceedances mean 2 coexceedances, and so on. We should note that the exceedances in terms of extreme positive or negative returns in a particular commodity can be modeled as a dichotomous variable. However, our analysis investigating the coexceedances to capture contagion among commodities requires classification as a polychotomous variable. A popular approach to estimate the probabilities associated with events captured in a polychotomous variable is the multinomial logistic regression model (Bae et al., 2003). Equation (8) is our model investigating the contagion among commodities.
where P(COECO t = X) refers to the X number of coexceedances (in our case, X equals 0, 1, 2 . . . m), RET t;CATy denotes the average return of commodities in different categories at time t. Then, equation (8) is estimated using the following maximum likelihood expression (Hill et al., 2011;Greene, 2017): where L is the log-likelihood function for a sample of q observations, and d pX refers to an indicator variable where alternative X occurs at observation p. We follow Kleiber and Zeileis (2008) and Bilder and Loughin (2015) for the estimation procedure of the multinomial logit model and the postestimation analysis. Note that if the numbers of coexceedances are only 0 and 1, we use the logistic regression instead. Table 2 presents the descriptive statistics of daily price changes for the sixteen commodities.

Empirical results
We find that the averages of daily price changes range from 0.0236 percent (cotton) to 0.1970 percent (natural gas). The volatilities of the daily price changes range from 0.0645 (natural gas) to 0.010 (gold). We can see that natural gas has the highest average return followed by crude oil, while that for cotton has the lowest. Note that the averages of daily price changes for the commodities tend to be zero. Regarding risk, as measured in the standard deviation of returns, the natural gas return also has the highest value followed by heating oil, while that for gold return has the lowest. This finding implies that gold was the superior investment asset of the six commodities due to possessing a higher risk reward ratio during the sample period. The skewness and kurtosis measures demonstrate that all the distributions of returns exhibit fat tails. All of the Jarque-Bera statistics for returns are positive and statistically significant, indicating non-normalities. Overall, the descriptive statistics of our sample commodities are similar to other papers on commodities (for example, Algieri & Leccadito, 2017; Han et al., 2015;Nagayev et al., 2016). Table 3 presents the estimated conditional (unadjusted) correlation coefficients, whereas Table 4 presents the estimated unconditional (adjusted-equation (1)) correlation coefficients for commodities daily returns. Overall, the conditional correlation coefficients tend to be positive, and the highest value is noted for the correlation between gold and silver (0.6837) followed by that between platinum and palladium (0.5865). Likewise, the unconditional correlation coefficients tend to be positive, and the highest is the correlation between gold and silver (0.6142) followed by that between platinum and palladium (0.5526). We should note that only those two correlations are greater than 0.5 for both conditional and unconditional correlations. We also note that there is no significant difference between conditional and unconditional correlations. These findings indicate that 1) the dependence among commodities are not so strong and 2) the heteroskedasticity biases are not so high at least compared with the biases in the stock markets (as observed by Forbes & Rigobon, 2002).
We argue that the lower biases in commodities are due to the heterogeneity characteristics.
Unlike financial assets, commodities tend to be heterogenous (Ausubel, 2006;Fleurbaey & Tadenuma, 2007;Pereira et al., 2017) and more independent (Fleurbaey & Tadenuma, 2007). We should also note that commodities are not only representatives of market relations but also nonmarket relations (Lapavitsas, 2004). Nonmarket relations do not shrink inexorably, thus reducing the biases. The estimated conditional correlation coefficients for the high-variance (from 15 September 2008 to 16 October 2012) and low-variance (from 4 January 1999 to 12 September 2008 and from 17 October 2012 to 1 November 2017) periods are shown in Tables 5 and 6, respectively. Table 7 reports the t-values for one-tailed t-tests examining whether the cross-commodity conditional correlation coefficient during the high-variance period is significantly greater than that during the low-variance period (hypotheses in equation (2)).
We can observe several apparent patterns here. First, the significant increase in the conditional correlation coefficient during the high variance period occurs only in 63 (or 52.5 percent) pairs of commodities. This finding implies that financial contagion occurred only to (slightly above) half of the commodities. This finding also indicates that commodities tend to be resilient assets during a highly volatile market. We document that commodities have better diversification benefits than stocks given the following reasons: 1) stock markets experience significant dependences during global financial crisis (Wang et al., 2017), and 2) commodities exhibit low synchronization with the stock market (Pereira et al., 2017). Second, platinum and palladium tend to be the most contagious commodities because the 13 (out of other 15) other commodities experience significant increase in the conditional correlation coefficient during the high-variance period when paired with them. The next contagious commodity is oat (11 out of other 15) followed by corn and cotton (10 out of other 15). Third, natural gas (4 out of other 15), followed by gold and coffee (5 out of other 15), tends to be the least contagious. We can conclude that 1) commodities tend to partially integrate, 2) natural gas, gold and coffee are good portfolio diversifiers because they experience few significant increases in the conditional correlation coefficient, even during highly volatile markets, and 3) platinum and palladium are bad portfolio diversifiers because they experience many significant increases in the conditional correlation coefficient during highly volatile markets. There are two practical implications here. First, as a portfolio manager, I would use different commodities as diversifiers because commodities are partially integrated. Second, I would add a kind of commodity to our existing portfolio depending on our portfolio's objectives, whether an aggressive or conservative strategy.
As noted in our discussion in section 3.1, these contagion tests may be inaccurate due to heteroskedasticity bias in the correlation coefficient. According to Forbes and Rigobon (2002), the estimated increases in the conditional correlation coefficient could reflect either an increase in cross-market linkages and/or increased market volatility. In our analysis, the market refers to commodity market. To control the heteroskedasticity bias, we repeat our analysis but use the correction in equation (1)   shown in Tables 8 and 9, respectively. Table 10 reports the t-values for one-tailed t-tests examining whether the cross-commodity unconditional correlation coefficient during the high-variance period is significantly greater than that during the low-variance period (hypotheses in equation (2)).
We observe similar apparent patterns here. First, the significant increase in the conditional correlation coefficient during the high-variance period occurs only in 60 (or 50 percent) pairs of commodities. This finding implies that financial contagion occurred only to (slightly above) half of the commodities. This finding also indicates that commodities tend to be resilient assets during highly volatile markets. Our analysis reveals no significant difference between conditional and unconditional correlation coefficients. This finding implies that the heteroskedasticity bias is not significant, at least compared with the bias in the stock market. This finding is consistent with our argument stating that the lower biases in commodities are due to the heterogeneity characteristics. Second, palladium tends to be the most contagious commodity because the 13 (out of other 15) other commodities experience significant increases in the unconditional correlation coefficient during the high variance period when paired together. The next contagious commodity is platinum (12 out of other 15) followed by oat and cotton (10 out of other 15). Third, natural gas and gold (4 out of other 15) followed by coffee (5 out of other 15) tend to be the least contagious commodities. We can conclude that 1) commodities tend to partially integrate, 2) natural gas, gold and coffee are good portfolio diversifiers because they experience few significant increases in the conditional correlation coefficient, even during highly volatile markets, and 3) platinum and palladium are bad portfolio diversifiers because they experience many significant increases in the conditional correlation coefficient during highly volatile markets. There are two practical implications here. First, as a portfolio manager, I would use different commodities as diversifiers because commodities are partially integrated. Second, I might use a commodity to reduce the heteroskedasticity bias in our existing stock portfolio.
We can see that the analysis using unconditional correlation coefficients is similar with that of using conditional correlation coefficients. Overall, we can conclude that 1) commodities tend to partially integrate, and 2) natural gas, gold and coffee are good portfolio diversifiers, whereas platinum and palladium are bad portfolio diversifiers. Platinum is not only a bad portfolio diversifier but also demonstrated a speculative bubble (Emekter et al., 2012). Palladium is similar to platinum given their similar chemical characteristics (Kotzé et al., 2019;Rane, 2019). Gold is proven as a safe haven nature because gold protects investors by providing a fall back during harsh investment periods (Pereira et al., 2017).
Natural gas and coffee are good portfolio diversifiers because they have small net spillover (Chevallier & Ielpo, 2013). Coffee is also a good portfolio diversifier because it exhibits stationarity after multiple structural breaks (C. H. Yang et al., 2012).
We then compare the correlations between within-category and outside-category commodities using Equations (3), (4), (5), (6) and (7). Table 11 reports the conditional and unconditional correlations within a category (as expressed in Equation (3)), outside a category (as expressed in Equation (4)), the average within a category (as expressed in Equation (5)), the average outside a category (as expressed in Equation (6)), and the t-values for one-tailed t-tests examining whether the average within category correlation coefficient is significantly greater than the average outside category correlation coefficient. There are several patterns according to Table 11. First, almost all metals and grains (silver is the exception) have higher correlation coefficients within category than outside category correlation coefficients. Second, on the other hand, all energies have lower within category than outside category correlation coefficients. Third, regarding softs, coffee and cocoa have lower whereas cotton and sugar have higher within category than outside category correlation coefficients. Fourth, although the average within category correlation coefficient is greater than the average  outside category correlation coefficient, the one-tailed t-tests reveal that the differences are not statistically significant for both conditional and unconditional correlation coefficients. We can conclude that 1) metal and grain commodities tend to integrate, whereas energy commodities do not tend to integrate; 2) the integration of soft commodities is inconclusive; 3) there is no significant difference of comovement between within a category and outside a category in commodity markets; 4) (again) the heteroskedasticity bias is not significant for commodities.
Our results in Table 11 can be explained as follows. First, recall that commodities are heterogeneous (Ausubel, 2006;Fleurbaey & Tadenuma, 2007;Pereira et al., 2017). Second, metal commodities offer much less diversification potential for equity investors (Pereira et al., 2017). Third, grain commodities have spillover risks (Ji et al., 2017) and the highest directional spillover effects (Chevallier & Ielpo, 2013). This property of commodities is due to seasonality factors (Pereira et al., 2017) or is highly dependent on climate (Adhikari & Putnam, 2019). Fourth, both metal and grain commodities have strong correlations (Cai et al., 2019). Fifth, energy commodities have different behaviors on spillover effects (Uddin et al., 2018). Sixth, we should note that i) soft commodities showed no jump comovement and ii) jumps for many soft commodities are even negatively correlated to Goldman Sachs Commodity Index jumps (Nguyen & Prokopczuk, 2019). Seventh, our insignificant difference of comovement between within category and outside category commodity markets is somewhat significant in light of the results of Adhikari and Putnam (2019) who also reported statistical insignificance. The next step is performing a multinomial logit analysis. First, the exceedance and coexceedances were identified as defined in section 3.2. We then estimated a multinomial logit model as expressed in Equation (8). Recall that if the numbers of coexceedances are only 0 and 1, we use logistic regression instead. Table 12 reports the multinomial logit (or logit) regression results for positive coexceedances in the four different commodity categories. According to Table 12, slightly more covariates (14 out of 27-excluding intercepts) tend to be statistically significant. This finding demonstrates that the probability of positive coexceedances is somewhat affected by the other categories price changes in the commodity markets. We can also see that softs tend to be contagious to metals and grains, metals tend to be contagious to energies, and energies and grains tend to be contagious to softs. However, energies do not tend to be contagious to grains. Table 13 reports the multinomial logit (or logit) regression results for negative coexceedances in the four different commodity categories. According to Table 13, most of the covariates (17 out of 27-excluding intercepts) tend to be statistically significant. This finding demonstrates that the probability of negative coexceedances is affected by the other categories price changes in the commodity markets. We can also see that softs tend to be contagious to grains, metals tend to be contagious to energies, and grains tend to be contagious to softs. However, energies do not tend to be contagious to grains.
Overall, we document that commodity price changes tend to affect the probability of both positive and negative coexceedances. We also observe that a positive daily change tends to increase the probability of positive coexceedances, and a negative daily change tends to increase the probability of negative coexceedances. This finding indicates that contagion exists in both directions, i.e., positive and negative extreme events. Therefore, there is a contagion in the commodity markets. As a portfolio manager, I would need to carefully evaluate the commodities' diversification benefits and contagion costs as financial instruments. On one side, commodities bring diversification benefits. On the other side, commodities have contagion effects.
Further analysis based on AIC values and the multinomial (or merely) logit models demonstrate that the contagion is stronger for negative coexceedances. This finding implies that commodities tend to be contagious in negative rather than positive extreme returns. This asymmetric contagion is somewhat similar to that reported by Amonlirdviman and Carvalho (2010). They find that Table 11. The conditional and unconditional correlations within a category (as expressed in equation (3)), outside a category (as expressed in equation (4)), the average within a category (as expressed in equation (5)), the average outside a category (as expressed in equation (6)), and the t-values for one-tailed t-tests examining whether the average within category correlation coefficient is significantly greater than the average outside category correlation coefficient   correlations are higher in market downturns than in upturns. Furthermore, the asymmetric dependence is also addressed by Hameed et al. (2015) and Malceniece et al. (2019).

Conclusion
This article investigates comovement and contagions in the commodities markets. A simple approach to examine a contagion is calculating the correlation among variables. However, this method is neither robust nor appropriate. We examine the comovement by analyzing both the conditional and unconditional correlation coefficients and comparing the correlations between within-category and outside-category commodities. We perform contagion tests by identifying coexceedances and estimating multinomial logit to explain joint occurrence of those coexceedances.
Analyzing both conditional and unconditional (after correcting the heteroskedasticity bias) correlation coefficients, we find that 1) commodities tend to partially integrate; 2) natural gas, gold and coffee are good portfolio diversifiers, whereas platinum and palladium are bad portfolio diversifiers. We also demonstrate that our analysis using unconditional correlation coefficients is similar with that of using conditional correlation coefficients. This finding implies that the heteroskedasticity biases tend to be insignificant in commodity markets, which is different from the biases in the stock markets.
Comparing the correlations between within-category and outside-category commodities, we find that 1) metal and grain commodities tend to integrate, whereas energy commodities do not tend to integrate, 2) the integration of soft commodities is inconclusive, 3) there is no significant difference between within category and outside category comovement in commodity markets, and 4) the heteroskedasticity bias is not significant for commodities.
Estimating the multinomial logit, we find that commodity price changes tend to affect the probability of both positive and negative coexceedances. We also document that a positive daily change tends to increase the probability of positive coexceedances, and a negative daily change tends to increase the probability of negative coexceedances.
Overall, we conclude that there are comovement and contagions among commodities. The degrees of comovement and contagion however are different among categories and between positive and negative extreme returns. This difference is due to heterogeneity in commodity markets. The contagion among commodities is asymmetric and worse during negative extreme returns. These results suggest that the diversification benefit from commodities market is limited. Different type of commodity might give a different level of diversification benefit since the integration level among commodities are different. The financialization seems to drive the commodity markets to be more integrated, thus reduce the diversification benefit.
As a portfolio manager, I would need to carefully evaluate the commodities' diversification benefits and contagion costs as financial instruments. On one side, commodities bring diversification benefits. On the other side, commodities have contagion effects. This cost-benefit analysis of commodities could be interesting future research. Our study is limited to the comovement test focusing only on heteroskedasticity biases control and contagion test focusing on biological contagion (multinomial logistic analysis). A broad analysis of different focuses can contribute to the literature by analyzing comovement and contagion using different methods.