Single stock futures trading and stock price volatility: empirical analysis.
Khan, Safi Ullah ; Hijazi, Syed Tahir
This study examines impact of the introduction of single stock
futures contracts on the return volatility of the SSFs-listed underlying
stocks. The study documents a significant decrease in return volatility
for the SSFs-underlying stocks following the introduction of single
stock futures contracts on the Karachi Stock Exchange. The multivariate
analysis in which the spot trading volume, the futures trading volume
and open interest were partitioned into news and informationless
components, the estimated coefficient of expected futures volume
component is statistically significant and negatively related to
volatility, suggesting that equity volatility is mitigated when the
expected level of futures activity is high. The findings of the
decreased spot price volatility of the SSFs-underlying stocks associated
with large expected futures activity is important to the debate of
regarding the role of equity derivatives trading in stock market
volatility. These empirical results for the Pakistan's equity
market support theories implying that equity derivates trading improves
liquidity provision and depth in the equity markets, and appear to be in
contrast to the theories implying that equity derivates markets provide
a medium for destabilising speculation. Finally, the SSFs-listed stocks
were grouped with a sample of non-SSFs stocks to examine cross-sectional
data for comparing changes in return volatility. After controlling for
the effects of a number of determinants of volatility, sufficient
evidence is found to support that, this multivariate test, like the
previous analysis, provides no evidence that the volatility of the
SSFs-underlying stocks is positively related to the introduction of the
single stock futures trading in the Pakistan's stock market.
1. INTRODUCTION
A large number of studies examine the relationship between futures
trading volume and the price volatility in the underlying asset or
market. Conflicting results, however, has been obtained to the effect
that futures trading may increase of decrease volatility in the
underlying market. Among the previous studies on the issue of the
futures market-volume and spot market price volatility, Schwert (1990)
finds that, at the time of high volatility for the S&P500 index,
stock market and futures volume are also found to be high. Smith (1989),
on the other hand, observes no effect by S&P500 futures volume on
the changes in the volatility of S&P500 index returns. Similar
results were also reported by Darat and Rehman (1995) for S&P500
stock index returns. Board, et al. (2001) applied the Stochastic
Volatility (SV) model to the daily stock price data of London Stock
Exchange and the FTSE 100 contracts traded on LIFE. The authors report
evidence contrary to the hypothesis that futures trading volume
destabilises the spot market, of that an increase in trading volume in
one market relative to the other market destabilises the spot market.
Overall, their results indicate that contemporaneous futures trading,
after adjusting for the effects of information arrival and time trends,
does not destabilise the spot market.
Some studies even find a negative relationship between S&P500
futures volume and the spot price volatility [see e.g., Santoni (1987);
Brown-Hruska and Kuserk (1995)]. Bessimender and Seguin (1992) adopted
an estimation procedure proposed by Schwert (1990) by iterating between
a pair of regression equations which describe the evolution of the mean
and volatility of the process in terms of the exogenous and lagged
endogenous variables. The authors include three trading activity
variables (spot trading volume, futures trading volume and open interest
in the augmented conditional return standard deviation (volatility)
equation. The authors observe that the expected (i.e. informationless)
S&P500 futures trading activity is negatively related to equity
volatility, when the spot-trading activity variables were included in
the model. These findings led the authors to conclude that futures
trading improve liquidity provision and depth in the equity markets, and
reject the theories supporting the hypothesis of the destabilising
effect of the futures trading.
In contrast to these studies, Yang, Balyeat, and Leatham (2005)
find that unexpected futures trading volume is positively related to
price volatility in the underlying market for most of commodity futures
markets selected. Using a GARCH model, Kyriacou and Sarno (1999) finds
that contemporaneous and lagged futures volume for the FTSE 100 has
increased spot market volatility. Ellueca and Lafuente (2003) examine
the contemporaneous relations between trading volume and return in the
Spanish stock index futures market, using a non-parametric approach for
hourly return and futures trading activity variables. The total futures
volume were decomposed in to expected (informationless trading activity)
and unexpected (shocks in trading activity) components. The study
documents a positive relation between price volatility and unexpected
component of trading volume. The authors attribute this relationship to
the arrival of new information (unexpected trading activity). This paper
tests whether trading in SSFs contracts has an impact on price
volatility of the underlying stocks following the introduction of the
SSFs trading in the Pakistan's stock market. This study presents
fresh evidence on the futures trading-volatility relationship in
Pakistan's equity market using the most recent data of the single
stock futures contracts introduced on the Karachi Stock Exchange.
Specifically, the study examines the impact of futures trading on the
level of price volatility of the underlying stocks. Specifically, single
stock futures trading activity variables namely SSFs volume and open
interest were included in the analysis to examine whether these futures
trading activity variables have any role on the return volatility of the
underlying stocks. The study documents a significant decrease in return
volatility for the SSFs- underlying stocks following the introduction of
single stock futures contracts on the Karachi Stock Exchange. The
multivariate analysis in which the spot trading volume, the futures
trading volume and open interest were partitioned into news and
informationless components, the estimated coefficient of expected
futures volume component is statistically significant and negatively
related to volatility, suggesting that equity volatility is mitigated
when the expected level of futures activity is high. The findings of the
decreased spot price volatility of the SSFs-underlyned stocks associated
with large expected futures activity is important to the debate of
regarding the role of equity derivatives trading in stock market
volatility. These empirical results for the Pakistan's equity
market support theories implying that equity derivates trading improves
liquidity provision and depth in the equity markets, and appear to be in
contrast to the theories implying that equity derivates markets provide
a medium for destabilising speculation.
Finally, the SSFs-listed stocks are grouped with a sample non-SSFs
stocks to conduct cross-sectional analysis for comparing return
volatility behaviour in the post-futures period. After accounting for
the effects of a number of determinants of volatility, sufficient
evidence is found to support that, this multivariate test, like the
previous analysis, provides no evidence that the volatility of the
SSFs-underlying stocks is positively related to the introduction of the
single stock futures trading in the Pakistan's stock market.
Rather, the negative binary coefficient indicates that, overall, there
is a decrease in return volatility for the SSFs-underlying stocks in the
post-futures period.
The rest of the paper is organised as follows. Second section
describes the data, followed by the description of the control group.
The fourth section provides an in-depth analysis of the methodology used
in the paper. The last section will provide an analysis of the data and
conclude the paper.
2. DATA DESCRIPTION
Trading in SSFs on the KSE commenced in July 2001. The sample
period of this study begins June 1, 1999 and ends June, 2008. (1)
Presently, 44 stocks have SSFs contracts written on them and traded on
the Karachi Stock Exchange. The final data sample consists of 28 stocks,
which possesses a complete set of two years data of daily price
observations and trading volume on either side of the futures listing
dates. Daily closing share prices are obtained from the online database
of Karachi Stock Exchange for each stock for a period of two years on
either side of the SSFs listing date, yielding more than 500 daily
observations per stock for each of the sub-periods.
3. CONTROL PORTFOLIO
There may be other factors, besides the SSFs listing, that have
also affected the price performance characteristics of the stocks. Such
factors may include, for instance, that firm-specific and/or
industry-specific factors or changes in the macroeconomic factors that
may have occurred at the time of SSFs initiation of during the sample
period that have changed the dynamics of the market. Our tests,
therefore, may mistakenly attribute such a change, if it occurred, to
the introduction of SSFc contracts. It is therefore, necessary to study
a sample of non-SSFs stocks to separate the effects of SSFS-initiation
from other effects of other factors. Following the methodology of
Mckenzie, Brailsford and Faff (2001), such a control mechanism is
undertaken using control portfolio of similar stocks that did not have
SSF introduced. In case the SSFs-introduced stocks behave differently to
the control portfolio in the post SSFs period, this mechanism will
strengthen the conclusions drawn in respect of the impact of
introduction of SSFs contracts. The control group sample consisted of 28
stocks.
4. EMPIRICAL ANALYSIS
This section tests the hypothesis that trading activity in the
single stock futures contracts has an impact on the spot market price
volatility of the underlying stocks following the SSFs trading
initiation in the Pakistan's stock market. To this end, we use a
measure of daily stock return volatility by adopting a procedure
introduced by Schwert (1989), and further followed by other studies
[e.g., Bessimender and Seguin (1992, 1993); Wang (2002)]. The method
entails iterating between the following two sets of equations. The
conditional mean and conditional volatility equations are given by:
[MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] (1)
[MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] (2)
Where R, is the daily stock return, [d.sub.i] corresponds to the
four dummies for days of the week to account for the extensively
documented phenomenon of differing mean daily returns [French (1980);
Gibson and Hess (1984); Keim and Stambausgh (1984)]. (2) [U.sub.t] is
the residuals (unexpected returns) form Equation (1), [sigma] is the
estimated conditional volatility of returns at time t, and given by;
[sigma] = [absolute value of ([U.sub.t])][square root of ([pi]/2)]
(3)
[R.sub.t-i] (lagged returns) in Equation (2) as regressors allows
for short term shifts in expected returns. Equation (2) estimates
conditional standard deviation (volatility) by regressing it on daily
dummies (for days of the week), lagged volatility estimates and lagged
raw residuals from Equation (1). Lagged standard deviation estimates in
the Equation (2) accounts for the persistence of volatility shocks
[French, Schwert, and Stambaugh (1987); Bessimender and Seguin (1992);
Wang (2002)].
To obtain volatility estimates, Equation (1) is first estimated
without the lagged standard deviation estimates to obtain residuals from
the regression. The residuals obtained are the unexpected returns. These
residuals are transformed by Equation (3) to obtain estimates of
conditional volatility, and then we estimate Equation (2). The process
is then iterated with volatility estimates (lagged) as regressors in
Equation (1).
To examine relation between volatility and trading activity, we
include spot trading volume, futures trading volume and open interest as
activity variables. Open interest provides an additional measure of
trading activity. Iteration is, therefore, between Equation (1) and an
augmented Equation (4): (3)
[MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] (4)
Where [A.sub.k] is the m trading activity variables, i.e., spot
trading volume, SSFs volume and open interest.
Many studies [e.g. Chen, Firth and Rui (2001) and Gallent, Rossi,
and Tauchman (1992)] document evidence of time trends in trading volumes
series. To mitigate any effects, therefore, of secular growth in volume,
we first generate a "detrended" activity series by deducting
100-day moving average from the original series. (4) Each
"detrended" activity series is then decomposed into expected
(fitted values from ARIMA model) and unexpected (Actual minus expected
values) components using an appropriate ARIMA (p, I, q) specification.
The number of lags for ARIMA model were selected for each activity
series on the basis of Akaike information criterion and Schwarz
information criterion. The decomposition of each activity series into
expected and unexpected components helps us to evaluate the effect of
each component separately on the price volatility. The unexpected
component of the deterended series represents daily activity shock,
whereas, the expected component represents activity which can be
forecasted, though highly variable across days. Slower adjustment
changes are captured by the 100-day moving average series. Partitioning
the spot trading volume, futures trading volume and open interest into
expected, unexpected and moving average series result in nine variables,
which were included in the augmented Equation (4).
4.1. Spot Trading Volume and Stock Return Volatility
Initially, we estimate Equations (1) and (4) with the spot trading
volumes as the only activity variable. These empirical results are
reported in the first column of the Table 1. As the table reports that
all of the estimated coefficients for daily dummies are significant,
indicating that the model has adequately captured the seasonal effects.
Estimated coefficient on the unexpected component of the trading volume
is positive and highly significant. Moreover, this coefficient is also
larger than the estimated coefficients on the expected trading volume
and the moving average volume. This implies that surprises (unexpected
component) in the spot trading volume convey more information, and thus
are more important in explaining equity volatility than either the
variations in the anticipated (expected trading volume and moving
average) level of trading activity. These results are in line with the
findings of many empirical studies conducted in other markets. For
instance, Patti (2008) finds positive relation of price volatility to
expected ah unexpected components of trading volume for the Indian stock
market. The author also documents that an unexpected component of
trading volume has greater impact on trading volume than the expected
volume.
4.2. SSFs Trading and Stock Price Volatility
As an initial econometric examination of the single stock futures
trading on the equity volatility of the underlying stocks in the spot
market, we include a dummy variable in Equation (4) that takes on a
value equal to one for post-SSFs period (two years time period, with
almost 500 observations for each stock), and equal to zero for the
pre-SSFs period, containing almost same number of observations compared
to post- SSFs period. We also allow the regression intercept and the
slope coefficients
on volume variables to shift subsequent to the introduction of the
SSFs trading.
Empirical results of Equation (4) are reported in the second column
of Table I. Notable result of this analysis is that the observed change
in the slope coefficient associated with the unanticipated spot trading
volume is negative and highly significant (at I percent significance
level). This implies that the spot volume shocks are associated with
smaller price movements subsequent to the introduction of the SSFs
trading. Similarly, the estimated coefficient for the slope dummy on the
moving average volume is negative though it is not statistically
significant. Again, this also implies a reduction in the magnitude of
the relation subsequent to the introduction of the SSFs. In contrast,
the estimated coefficient for the shift in the regression intercept
subsequent to the introduction of SSFs trading is negative and
statistically significant.
These findings are consistent with the view that stock return
volatility (equity volatility) has been reduced, and market depth (as
measured by the volume of shares required to move prices) has been
increased by the introduction of SSFs trading. There may have been other
changes in the overall financial and capital markets in Pakistan, or
even some of the sectors/stock specific factors, during the period
examined in the study, and these reductions in equity volatility need
not be solely attributable to the introduction of SSFs trading in
Pakistan's stock market.
4.3. SSFs Trading Activity Variables and Stock Price Volatility
Evidence on the relation between Single Stock Futures trading and
stock price volatility reported in the prior section is not entirely
conclusive, at least in part, because the introduction of single stock
futures trading constitutes but a single event. To further augment the
specificity of the evidence, this study further examines the relation
between stock price volatility and levels of futures trading activity by
including SSFs trading volume and open interest. (5) Following the
methodology adopted by Besseminder and Seguin (1992), for each trading
date, futures volume and open interest are summed across contracts to
obtain aggregate futures activity.
We again decompose each trading activity (spot trading volume, SSFs
trading volume and open interest) in to three additive components namely
moving average, expected and unexpected components using the same
methodology as discussed in the previous section. Empirical results of
estimating (4) with these activity series are reported in the Table 2.
Inclusion of SSFs-trading variables does not change the sign of
coefficient estimates on the expected and unexpected components of the
spot-trading variables. The coefficient estimate for unexpected
SSFs-trading volume, like that for unexpected spot-trading volume, is
positive and significant, and is larger in magnitude that the
spot-trading volume coefficient. As Besseminder and Seguin (1992) points
out that, this positive coefficient implies that information shocks move
prices and generate trading in both markets.
Unlike the results for the expected (i.e., informationless)
component of the spot volume, the coefficient estimate for the expected
SSFs-volume is negative and significant, indicating decreased stock
price volatility when expected SSFs- volume is high. On the other hand,
coefficient estimates on the expected and unexpected components of the
open interest are negative, but neither is statistically different from
zero. These empirical results are in line with the study of Besseminder
and Seguin (1992) for S&P500 Index. Contrary to the findings of
their study in case of moving average, estimated coefficient on all
three moving average series (spot-trading volume, SSFs-volume and open
interest) are statistically insignificant, indicating that long-term
variations may not be relevant for explaining volatility in
Pakistan's equity market.
To summarise, empirical evidence indicates that equity volatility
is positively related to spot-trading activity, whether expected
(informationless trading) or unexpected, and to the contemporaneous
futures trading shocks. Whereas, the partial effects on equity
volatility of expected and moving average (though insignificant in case
of moving average) are negative, suggesting that equity volatility is
mitigated when the expected level of futures activity is high. The
findings of the decreased spot price volatility associated with large
expected futures activity is important to the debate of regarding the
role of equity derivatives trading in stock market volatility. These
empirical results for the Pakistan's equity market support theories
implying that equity derivates trading improves liquidity provision and
depth in the equity markets, and appear to be in contrast to the
theories implying that equity derivates markets provide a medium for
destabilising speculation.
4.4. Cross-sectional Analysis
Finally, following the methodology of Galloway and Miller (1997),
SSFs-listed stocks are grouped with non-SSFs stocks and the behaviour of
the return volatility is examined surrounding the introduction of single
stock futures trading. The regression model takes the following form:
[MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII] (5)
where [[??].sub.t] is the post-futures period daily volatility
estimate; LN(Firm) is the natural logarithm of equity value of the firm;
LNVOL is the natural logarithm of spot trading volume, coefficients for
days of the week, lagged volatility estimates and a binary variable
(FUTDUMY) that is equal to one for the SSFs-listed stocks and 0 for the
non-SSFs stocks.
We are mainly interested in estimating [[beta].sub.4] regression
coefficient in Equation (5) which would indicate whether the stock price
volatility of the SSFs-underlying stocks behaves in a different way than
that of non-SSFs stocks in the post-SSFs trading period, while
accounting for other factors known to influence stock price volatility.
When this coefficient is negative (positive), this implies that the
average stock price volatility of the SSFs-listed stock is lower
(higher) than that of the matching non-SSFs listed stocks in the
post-futures period.
In addition to the binary variable, three control variables were
also incorporated in the Equation (5). First, as argued by Galloway and
Miller (1997), if the introduction of futures trading improves the
liquidity of the underlying stocks with a resulting decline in stock
price volatility, this effect is more evident in case of smaller firms
with less liquid stocks. In this case, the estimated coefficient,
[[beta].sub.3], is expected to be negative (i.e., [[beta].sub.3] <
0). Consequently, the firm's market value of equity is included in
the model to account for this "size effect". Second, a
voluminous body of literature exists that documents a positive
contemporaneous relationship between trading volume and stock return
volatility. We therefore, expect the coefficients on expected
(informationless) and unexpected trading volumes to be positive (i.e.,
[[beta].sub.2] > 0). Thus the expected and unexpected components of
spot trading volume of the underlying stocks and that of control group
stocks is employed to control for this positive return volatility-
volume effect. Table 3 presents results for the regression Equation (5).
The estimated coefficients for the control variables have the expected
signs and are statistically significant. However, our primary interest
lies in the coefficient estimate, [[beta].sub.4], of the binary
variable. The coefficient estimate ([[beta].sub.4]) is negative and
highly statistically significant. This multivariate test, like the
previous analysis, provides no evidence that the volatility of the
SSFs-underlying stocks is positively related to the introduction of the
single stock futures trading in the Pakistan's stock market.
Rather, the negative binary coefficient indicates that, overall, there
is a decrease in return volatility for the SSFs-underlying stocks in the
post- futures period. Thus the evidence tends to support the notion that
the single stock futures trading had a negative impact on the level of
price volatility for the underlying stocks.
5. CONCLUSION
This study tests the hypothesis that increases in futures market
trading activity has an impact on the equity volatility of the
underlying stocks by using a measure of daily stock return volatility by
following a procedure suggested by Schwert (1989). Spot trading volume,
SSFs trading volume and open interest analyse the relation between stock
price volatility and trading activity variables. The data consists of
daily closing prices of the underlying stocks, spot trading volume, SSFs
volume and open interest for the period July, 2001 to February, 2008.
The study examines whether the effect of spot volume, futures volume and
open interest on the spot price volatility of the underlined is
homogeneous by partitioning the three trading activity variables into
expected and unexpected components by an appropriate ARMA specification
and allowing each component (expected, unexpected and moving average
series) to have a separable effect on observed spot price volatility of
the underling stocks.
We adopt Schwert's (1989) procedure for volatility estimation
and including the trading activity variables of the two markets in the
volatility regression equation. The results show that stock price
volatility of the underlying stocks is positively related to both the
expected and unexpected components of the spot trading volume. However,
the unexpected component of the volume has a greater impact on the
equity volatility than the expected (informationless) volume. This
analysis confirms the findings of many other studies showing a positive
relationship between spot trading volume and spot price volatility.
Equity volatility is also positively related to the contemporaneous
futures shocks (unexpected component of futures volume). Expected
futures volume is statistically significant and negatively related to
volatility, suggesting that equity volatility is mitigated when the
expected level of futures activity is high. The findings of the
decreased spot price volatility associated with large expected futures
activity is important to the debate of regarding the role of equity
derivatives trading in stock market volatility. These empirical results
for the Pakistan's equity market support theories implying that
equity derivates trading improves liquidity provision and depth in the
equity markets, and appear to be in contrast to the theories implying
that equity derivates markets provide a medium for destabilising
speculation.
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(1) Selection of data from two years prior to the commencement of
SSFs trading constitutes the pre-SSFs period for those stocks for which
SSFs were introduced in July 2001. There ten such stocks. Moreover,
other stocks that had SSFs introduced on different dates for which
pre-SSFs and post- SSFs periods were selected at different time periods
during the sample interval, stretching up to June 2008.f
(2) The day-of-the week effect refers to returns not being
homogenously distributed over the trading days of the week. The main
findings have been lowest and on average negative returns on Mondays and
large returns on Fridays as compared to other days of the week [French
(1980)].
(3) Besseminder and Seguin (1992) also included these three
activity variables.
(4) The same procedure was also followed by Bessimender and Seguin
(1992).
(5) Open interest is the sum total of all outstanding long and
short positions of futures contracts that have not been closed out, at
the end of the trading day.
Safi Ullah Khan <safiullah75@yahoo.com> is Assistant
Professor, Institute of Management Sciences, Kohat University of Science
and Technology, Kohat. Syed Tahir Hijazi <info@ucp.edu.pk> is
Pro-Rector and Dean, University of Central Punjab, Lahore.
Table 1
Regression of Daily Return Standard Deviation Estimates
on Spot Trading Volume and Futures Trading Dummy
FUTDUMY denotes a dummy variable which is equal to one for post-
SSFs period and zero otherwise, for each stock. The table reports
results for two regressions. Column (1) contains results for the
regression model without dummy variable and the column (2)
reports results for the dummy variable regression model.
(1)
Variable Coefficient t-Statistic
Intercept 0.014 22.65
FUTDUMY
Daily Dummies
Tuesday 0.011 18.90 *
Wednesday 0.009 15.69 *
Thursday 0.010 15.88 *
Friday 0.009 14.85 *
Trading Volumes
Expected 0.024 7.98 *
Expected*FUTDUMY
Unexpected 0.043 17.32 *
Unexpected*FUTDUMY
Moving Average -0.021 -1.20
Moving Average*FUTDUMY
10 Lagged Volatility Estimates 0.377 23.08 *
Lagged Unexpected Returns 0.041 5.57 *
Durbin Watson 2.00
Adjusted [R.sup.2] 0.11
Diagnostic Checks Estimate P-value
LB-Q(36) 34.379 0.546
LB-[Q.sup.2] (36) 25.226 0.91
(2)
Variable Coefficient t-Statistic
Intercept 0.014 20.98 *
FUTDUMY -0.001 -1.77 **
Daily Dummies
Tuesday 0.012 17.65 *
Wednesday 0.010 14.66 *
Thursday 0.010 14.81 *
Friday 0.009 14.00 *
Trading Volumes
Expected 0.027 5.48 *
Expected*FUTDUMY -0.065 -1.03
Unexpected 0.059 15.21 *
Unexpected*FUTDUMY -0.027 -5.53 *
Moving Average -0.039 -1.44
Moving Average*FUTDUMY 0.028 0.78
10 Lagged Volatility Estimates 0.176 22.92 *
Lagged Unexpected Returns 0.021 2.95 *
Durbin Watson 2.00
Adjusted [R.sup.2] 0.11
Diagnostic Checks
LB-Q(36)
LB-[Q.sup.2] (36)
Note: * (**) represents statistical significance at 0.01 (0.05)
level, LB-Q(k) and LB-Q-(k) are the portmanteau Ljung Box Q
test statistics for testing the joint significance of
autocorrelation of standardised residuals and squared residuals
for lags 1 to k respectively.
Table 2
Regression of Daily Return Standard Deviation Estimates
on Spot Trading Volume and Futures Trading Volume.
Both spot and futures trading volumes for each stock are
de-trended by subtracting 100 day moving average volume from
each series before partitioning into expected and
unexpected components. Test statistics are in parenthesis.
Variable Coefficient t-Statistic Prob.
Intercept 0.012559 (5.84) * 0.000
Daily Dummies
Tuesday 0.008801 (4.16) * 0.000
Wednesday 0.00912 (4.40) * 0.000
Thursday 0.007306 (3.43) * 0.001
Friday 0.004645 (2.08) ** 0.038
Trading Activity
Spot Volumes
Expected 0.0223 (5.95) * 0.000
Unexpected 0.0317 (12.07) * 0.000
Moving Average 0.0381 (0.98) 0.327
SSFs Futures Volume
Expected -0.0190 (3.27) * 0.001
Unexpected 0.0456 (3.12) * 0.002
Moving Average -0.0194 (0.02) 0.983
SSFs Open Interest
Expected -0.0264 (-0.54) 0.587
Unexpected -0.0370 -0.32 0.748
Moving Average 0.0654 0.84 0.401
Lagged Volatility Estimates 0.254868 (5.42) * 0.000
Lagged Unexpected Return 0.141833 (3.48) * 0.001
Durbin-Watson 2.03 Adj. [R.sup.2] 0.25
Table 3
Cross-sectional Analysis: OLS Regression Results
Dependent variable is the post-futures stock price volatility.
Explanatory variables are: the natural logarithm of the firm's
market value equity value, the natural logarithm of the spot trading
volume for both SSFs-listed and sample of control group stocks,
coefficients for daily dummies, lagged volatility estimates, and a
binary variable equal to one if the firm is SSFs-listed, and zero if
the firm belongs to a control group.
Variable Coefficient t-Stat p-value
Intercept 0.027 10.401 * 0.000
Daily Dummies
D2 0.024 9.274 * 0.000
D3 0.023 9.042 * 0.000
D4 0.023 8.965 * 0.000
D5 0.022 8.447 * 0.000
FUTDUMY -0.006 -9.603 * 0.000
LOGVOL 0.001 11.267 * 0.000
LNFV -0.001 -9.085 * 0.000
Lagged Volatility
[sigma] (-1) 0.184 21.729 * 0.000
[sigma] (-2) 0.088 10.191 * 0.000
[sigma] (-3) 0.094 10.890 * 0.000
[sigma] (-4) 0.048 5.537 * 0.000
[sigma] (-5) 0.030 3.492 * 0.001
[sigma] (-6) 0.018 2.073 * 0.038
[sigma] (-7) 0.036 4.155 * 0.000
[sigma] (-8) 0.028 3.277 * 0.001
[sigma] (-9) 0.029 3.418 * 0.001
[sigma] (-10) 0.034 4.061 * 0.000
Lagged Unexpected (-1) 0.026 3.54 *
Adj. R 0.14 D-Watson 2.006
