Abstract
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The Effects of Twitter Sentiment on Stock Price Returns

Gabriele Ranco1, Darko Aleksovski2,*, Guido Caldarelli1,3,4, Miha Grčar2, Igor Mozetič2

1 IMT Institute for Advanced Studies, Piazza San Francesco 19, 55100 Lucca, Italy

2 Jožef Stefan Institute, Jamova 39, 1000 Ljubljana, Slovenia

3 Istituto dei Sistemi Complessi (ISC), Via dei Taurini 19, 00185 Rome, Italy

4 London Institute for Mathematical Sciences, 35a South St. Mayfair, London W1K 2XF, UK

* darko.aleksovski@ijs.si

## Introduction

The recent technological revolution with widespread presence of computers and Internet has created an unprecedented situation of data deluge, changing dramatically the way in which we look at social and economic sciences. The constantly increasing use of the Internet as a source of information, such as business or political news, triggered an analogous increasing online activity. The interaction with technological systems is generating massive datasets that document collective behavior in a previously unimaginable fashion [1, 2]. Ultimately, in this vast repository of Internet activity we can find the interests, concerns, and intentions of the global population with respect to various economic, political, and cultural phenomena.

Among the many fields of applications of data collection, analysis and modeling, we present here a case study on financial systems. We believe that social aspects as measured by social networks are particularly useful to understand financial turnovers. Indeed, financial contagion and, ultimately, crises, are often originated by collective phenomena such as herding among investors (or, in extreme cases, panic) which signal the intrinsic complexity of the financial system [3]. Therefore, the possibility to anticipate anomalous collective behavior of investors is of great interest to policy makers [4, 5, 6] because it may allow for a more prompt intervention, when appropriate.

#### State-of-the-art.

We briefly review the state-of-the-art research which investigates the correlation between the web data and financial markets. Three major classes of data are considered: web news, search engine queries, and social media. Regarding news, various approaches have been attempted. They study: (i) the connection of exogenous news with price movements[7], (ii) the stock price reaction to news[8, 9]; (iii) the relations between mentions of a company in financial news [10], or the pessimism of the media[11], and trading volume; (iv) the relation between the sentiment of news, earnings and return predictability[12], (v) the role of news in trading actions [13], especially of short sellers [14]; (vi) the role of macroeconomic news in stock returns [15]; and finally (vii) the high-frequency market reactions to news [16].

There are several analyses of search engine queries. A relation between the daily number of queries for a particular stock, and daily trading volume of the same stock has been studied by [17, 18, 19]. A similar analysis was done for a sample of Russell 3000 stocks, where an increase in queries predicts higher stock prices in the next two weeks [20]. Search engine query data from Google Trends has been used to evaluate stock riskiness [21]. Some other authors used Google trends to predict market movements [22]. Also, search engine query data has been used as a proxy for analyzing investor attention related to initial public offerings (IPOs) [23].

Regarding social media, Twitter is becoming an increasingly popular micro-blogging platform used for financial forecasting [24, 25, 26]. One line of research investigates the relation between the volume of tweets and financial markets. For example, [27] studied whether the daily number of tweets predicts the S&P 500 stock indicators. Another line of research explores the contents of tweets. In a textual analysis approach to Twitter data, the authors find clear relations between the mood indicators and Dow Jones Industrial Average (DJIA) [28, 29, 30]. In [31], the authors show that the Twitter sentiment for five retail companies has statistically significant relation with stock returns and volatility. A recent study [32] compares the information content of the Twitter sentiment and volume in terms of their influence on future stock prices. The authors relate the intra-day Twitter and price data, at hourly resolution, and show that the Twitter sentiment contains significantly more lead-time information about the prices than the Twitter volume alone. They apply stringent statistics which require relatively high volume of tweets over the entire period of three months, and, as a consequence, only 12 financial instruments pass the test.

#### Motivation.

Despite the high quality of the data sets used, the level of empirical correlation between stock price derived financial time series and web derived time series remains limited, especially when a textual analysis of web messages is applied. This observation suggests that the relation between these two systems is more complex and that a simple measure of correlation is not enough to capture the dynamics of the interaction between the two systems. It is possible that the two systems are dependent only at some moments of their evolution, and not over the entire time period.

In this paper, we study the relation between stock price returns and the sentiment expressed in financial tweets posted on Twitter. We analyze a carefully collected and annotated set of tweets about the previously-mentioned 30 DJIA companies. For each of these companies we build a time series of the sentiment expressed in the tweets, with daily resolution, designed to mimic the wisdom-of-crowd effect, as observed in previous works. As first analysis we compute the Pearson correlation between price return time series and the sentiment time series generated from the tweets. We also run a Granger causality test [33] to study the forecasting power of the Twitter time series. When considering the entire period of 15 months, the values of Pearson correlation are low and only a few companies pass the Granger causality test.

In order to detect the presence of a stronger correlation, at least in some portions of the time series, we consider the relation between the stock price returns and Twitter sentiment through the technique of “event study” [34, 35], known in economics and finance. This technique has been generally used to verify if the sentiment content of earnings announcements conveys useful information for the valuation of companies. Here we apply a similar approach, but instead of using the sentiment of earnings announcement, we use the aggregate sentiment expressed in financial tweets.

#### Contributions.

By restricting our analysis to shorter time periods around the “events” we find a statistically significant relation between the Twitter sentiment and stock returns. These results are consistent with the existing literature on the information content of earnings [34, 35]. A recent related study [36, 37], also applies the “event study” methodology to Twitter data. The authors come to similar conclusions as we do: financial Twitter data, when considering both, the volume and sentiment of tweets, does have a statistically significant impact on stock returns. It is interesting that two independent studies, to the best of our knowledge the first adaptations of “event study” to Twitter data, corroborate the conclusions.

This paper presents a complementary study to [36], and uses a slightly different experimental setup. The studies use disjoint sets of stocks (S&P 500 vs. DJIA 30), non-overlapping time windows (January–June 2010 vs. June 2013–September 2014), different sentiment classification techniques (Naive Bayes vs. Support Vector Machine), different event detection algorithms, and different statistics for significance testing. We point out the differences between the two studies in the appropriate sections of the paper. Despite the methodological differences, we can confirm the main results reported in [36] to a large extent. From this perspective, one of the contributions of this work is in providing even more evidence, over a longer time period, for the conclusions drawn in both studies.

The second contribution is that the Twitter sentiment time series are made publicly available. They can be used not only to validate our results but also to carry out additional studies that do not necessarily follow the same methodology. The dataset allows one to study different sentiment aggregations, different events (points in time), and different post-event effects (such as drifts, reversals, and changes in volatility rather than abnormal returns).

The third contribution, as compared to [36], is the use of a high quality sentiment classifier, and the realistic evaluation of its performance. Our sentiment classifier was trained on a much larger training set (2,500 vs. over 100,000 annotated tweets in our case), and exhaustively evaluated. This resulted in the performance that matches the agreement between financial experts. The human annotation of such large number of tweets is relatively expensive. However, there are several advantages. First, a considerable amount of tweets can be annotated twice, by two different annotators, in order to compute the inter-annotator agreement and thus establish an upper bound on the performance. Second, there is no need to collect domain-specific vocabularies, since the annotation process itself is domain and language specific. Third, once a large enough set of tweets is assigned a sentiment label, the classifier construction is automated and the domain-specific sentiment models are available for real-time processing.

We have already applied the same sentiment classification methodology in various domains, such as: (i) to study the emotional dynamics of Facebook comments on conspiracy theories (in Italian) [38], (ii) to compare the sentiment leaning of different network communities towards various environmental topics [39], and (iii) to monitor the sentiment about political parties before and after the elections (in Bulgarian) [40].

## Data

Our analysis is conducted on 30 stocks of the DJIA index. The stock data are collected for a period of 15 months between 2013 and 2014. The ticker list of the investigated stocks is shown in Table 1. In the analysis we investigate the relation between price/market data, and Twitter data. The details of both are given in the remainder of this section.

### Market data

The first source of data contains information on price returns of the stock, with daily resolution. For each stock we extract the time series of daily returns, :

 Rd=pd−pd−1pd−1 (1)

where is the closing price of the stock at day . We use raw-returns, and not the more standard log-returns, to be consistent with the original “event study” [34, 41]. This data is publicly available and can be downloaded from various sources on the Internet, as for example the Nasdaq web site 1.

### Correlation and Granger causality

For an initial investigation of the relation between the Twitter sentiment and stock prices, we apply the Pearson correlation and Granger causality tests. We use the Pearson correlation to measure the linear dependence between and . Given two time series, and , the Pearson’s correlation coefficient is calculated as:

 ρ(X,Y)=⟨XtYt⟩−⟨Xt⟩⟨Yt⟩√(⟨X2t⟩−⟨Xt⟩2)(⟨Y2t⟩−⟨Yt⟩2) (2)

where is the time average value. The correlation quantifies the linear contemporaneous dependence.

We also perform the Granger causality test [33] to check if the Twitter variables help in the prediction of the price returns. The steps of the procedure applied are summarized as follows [50]:

• Determine if the two time series are non-stationary, by the Augmented Dickey-Fuller (ADF) test.

• Build a Vector Autoregressive (VAR) model and determine its optimal order by considering four measures: AIC, BIC, FPE, HQIC.

• Fit the VAR model with the selected order from the previous step.

• Perform the Ljung-box test for no autocorrelation in the residuals of the fit.

• Perform the F-test to detect statistically significant differences in the fit of the baseline and the extended models (Granger causality test).

### Event study

The method used in this paper is based on an event study, as defined in financial econometrics [41]. This type of study analyzes the abnormal price returns observed during external events. It requires that a set of abnormal events for each stock is first identified (using prior knowledge or automatic detection), and then the events are grouped according to some measure of “polarity” (whether the event should have positive, negative or no effect on the valuation of the stock). Then, the price returns for events of each group are analyzed. In order to focus only on isolated events affecting a particular stock, the method removes the fluctuations (influences) of the market to which the stock belongs. This is achieved by using the market model, i.e., the price returns of a selected index.

#### Event window.

The initial task of conducting an event study is to define the events of interest and identify the period over which the stock prices of the companies involved in this event will be examined: the event window, as shown in Figure 1. For example, if one is looking at the information content of an earnings announcement on day , the event will be the earnings announcement and the event window might be . The reason for considering one day before and after the event is that the market may acquire information about the earnings prior to the actual announcement and one can investigate this possibility by examining pre-event returns.

#### Normal and abnormal returns.

To appraise the event’s impact one needs a measure of the abnormal return. The abnormal return is the actual ex-post return of the stock over the event window minus the normal return of the stock over the event window. The normal return is defined as the return that would be expected if the event did not take place. For each company and event date , we have:

 ARi,d=Ri,d−E[Ri,d] (3)

where , , are the abnormal, actual, and expected normal returns, respectively. There are two common choices for modeling the expected normal return: the constant-mean-return model, and the market model. The constant-mean-return model, as the name implies, assumes that the mean return of a given stock is constant through time. The market model, used in this paper, assumes a stable linear relation between the overall market return and the stock return.

#### Estimation of the normal return model.

Once a normal return model has been selected, the parameters of the model must be estimated using a subset of the data known as the estimation window. The most common choice, when feasible, is to use the period prior to the event window for the estimation window (cf. Figure 1). For example, in an event study using daily data and the market model, the market model parameters could be estimated over the 120 days prior to the event. Generally, the event period itself is not included in the estimation period to prevent the event from influencing the normal return model parameter estimates.

#### Statistical validation.

With the estimated parameters of the normal return model, the abnormal returns can be calculated. The null hypothesis, , is that external events have no impact on the returns. It has been shown that under , abnormal returns are normally distributed, [34]. This forms the basis for a procedure which tests whether an abnormal return is statistically significant.

#### Event detection using Twitter activity peaks.

This part first discusses the algorithm used to detect Twitter activity peaks, which are then treated as events. Next, it describes the method used to assign a polarity to the events, using the Twitter sentiment. Finally, it discusses a specific type of events for the companies studied, called earnings announcement events, which are already known to produce abnormal price jumps.

Detection of Twitter peaks. To identify Twitter activity peaks, for every company we use the time series of its daily Twitter volume, . We use a sliding window of days () centered at day , and let slide along the time line. Within this window we evaluate the baseline volume activity as the median of the window [51]. Then, we define the outlier fraction of the central time point as a relative difference of the activity with respect to the median baseline : . Here, is a minimum activity level used to regularize the definition of for low activity values. We say that there is an activity peak at if , where . The threshold determines the number of detected peaks and the overlaps between the event windows — both increase with larger . One should maximize the number of detected peaks, and minimize the number of overlaps [41]. We have analyzed the effects of varying from to (as in [51]). The decrease in the number of overlaps is substantial for ranging from to , for larger values the decrease is slower. Therefore, we settled for . As a final step we apply filtering which removes detected peaks that are less then 21 days (the size of the event window) apart from the other peaks.

As an illustration, the resulting activity peaks for the Nike company are shown in Figure 2. After the peak detection procedure, we treat all the peaks detected as events. These events are then assigned polarity (from Twitter sentiment) and type (earnings announcement or not).

Polarity of events. Each event is assigned one of the three polarities: negative, neutral or positive. The polarity of an event is derived from the sentiment polarity of tweets for the peak day. From our data we detected 260 events. The distribution of the values for the 260 events is not uniform, but prevailingly positive, as shown in Figure 3. To obtain three sets of events with approximately the same size, we select the following thresholds, and define the event polarity as follows:

• If the event is a negative event,

• If the event is a neutral event,

• If the event is a positive event.

Putting thresholds on a signal is always somewhat arbitrary, and there is no systematic treatment of this issue in the event study [41]. The justification for our approach is that sentiment should be regarded in relative terms, in the context of related events. Sentiment polarity has no absolute meaning, but provides just an ordering of events on the scale from (negative) to (positive). Then, the most straightforward choice is to distribute all the events uniformly between the three classes. Conceptually similar approaches, i.e., treating the sentiment in relative terms, were already applied to compare the sentiment leaning of network communities towards different environmental topics [39], and to compare the emotional reactions to conspiracy and science posts on Facebook [38]. Additionally, in the closely related work by Sprenger et al. [36], the authors use the percentage of positive tweets for a given day , to determine the event polarity. Since they also report an excess of positive tweets, they use the median share of positive tweets as a threshold between the positive and negative events.

Event types. For a specific type of events in finance, in particular quarterly earnings announcements (EA), it is known that the price return of a stock abnormally jumps in the direction of the earnings [34, 35]. In our case, the Twitter data shows high posting activity during the EA events, as expected. However, there are also other peaks in the Twitter activity, which do not correspond to EA, abbreviated as non-EA events. See Figure 2 for an example of Nike.

The total number of peaks that our procedure detects in the period of the study is 260. Manual examination reveals that in the same period, there are 151 EA events (obtained from http://www.zacks.com/). Our event detection procedure detects 118 of them, the rest are non-EA events. This means that the recall (the fraction of all EA events that were correctly detected as EA) of our peak detection procedure is 78%. In contrast, Sprenger et al. [36] detect 224 out of 672 EA events, yielding the recall of 33%. They apply a simpler peak detection procedure: a Twitter peak is defined as one standard deviation increase of the tweet volume over the previous five days.

The number of the detected peaks indicates that there is a large number of interesting events on Twitter which cannot be explained by earnings announcement. The impact of the EA events on price returns is already known in the literature, and our goal is to reconfirm these results. On the other hand, the impact of the non-EA events is not known, and it is interesting to verify if they have similar impact on prices as the EA events.

Therefore, we perform the event study in two scenarios, with explicit detection of the two types of events, all the events (including EA) and non-EA events only:

1. Detecting all events from the complete time interval of the data, including the EA days. In total, 260 events are detected, 118 out of these are the EA events.

2. Detecting non-EA events from a subset of the data. For each of the 151 EA events, where is the event day, we first remove the interval , and then perform the event detection again. This results in 182 non-EA events detected.

We report all the detected peaks, for the EA and non-EA events, with the dates and their polarity, in Supporting Information.

The first scenario allows to compare the results of the Twitter sentiment with the existing literature in financial econometrics [34]. It is worth noting, however, that the variable used to infer “polarity” of the events there is the difference between the expected and announced earnings. The analysis of the non-EA events in the second scenario tests if the Twitter sentiment data contains useful information about the behavior of investors for other types of events, in addition to the already well-known EA events.

#### Estimation of normal returns.

Here we briefly explain the market model procedure for estimation of normal returns. Our methodology follows the one presented in [34] and [52]. The market model is a statistical model which relates the return of a given stock to the return of the market portfolio. The model’s linear specification follows from the assumed joint normality of stock returns. We use the DJIA index as a normal market model. This choice helps us avoid adding too many variables to our model and simplifies the computation of the result. The aggregated DJIA index is computed from the mean weighted prices of all the stocks in the index. For any stock , and date , the market model is:

 Ri,d = αi+βiRDJIA,d+ϵi,d (4) E(ϵi,d) = 0,var(ϵi,d)=σ2ϵi,d (5) E[Ri,d] = ^αi+^βiRDJIA,d (6)

where and are the returns of stock and the market portfolio, respectively, and is the zero mean disturbance term. are the parameters of the market model. To estimate these parameters for a given event and stock, we use an estimation window of days, according to the hint provided in [34]. Using the notation presented in Figure 1 for the time line, the estimated value of is:

 ^σ2ϵi,d=1L−2T1∑d=T0+1(Ri,d−^αi−^βiRDJIA,d)2 (7)

where are the estimated parameters following the OLS procedure[34]. The abnormal return for company at day is the residual :

 ARi,d=Ri,d−^αi−^βiRDJIA,d. (8)

#### Statistical validation.

Our null hypothesis, , is that external events have no impact on the behavior of returns (mean or variance). The distributional properties of the abnormal returns can be used to draw inferences over any period within the event window. Under , the distribution of the sample abnormal return of a given observation in the event window is normal:

 ARi,τ∼N(0,σ2AR). (9)

Equation 9 takes into account the aggregation of the abnormal returns.

The abnormal return observations must be aggregated in order to draw overall conclusions for the events of interest. The aggregation is along two dimensions: through time and across stocks. By aggregating across all the stocks [52], we get:

 ¯¯¯¯¯¯¯¯ARτ=(1/N)N∑i=1ARi,τ. (10)

The cumulative abnormal return () from time to is the sum of the abnormal returns:

 CAR(τ1,τ2)=τ2∑τ=τ1¯¯¯¯¯¯¯¯ARτ. (11)

To calculate the variance of the , we assume (shown in e.g., [34, 52]):

 var(CAR(τ1,τ2))=(1/N2)N∑i=1(τ2−τ1+1)σ2ϵi (12)

where is the total number of events. Finally, we introduce the test statistic . With this quantity we can test if the measured return is abnormal:

 CAR(τ1,τ2)2√var(CAR(τ1,τ2))=^θ∼N(0,1) (13)

where is the time index inside the event window, and is the total length of the event window.

## Results

This section first presents an exhaustive evaluation of the Twitter sentiment classification model. Then it shows the correlation and Granger causality results over the entire time period. Finally, it shows statistically significant results of the event study methodology as applied to Twitter data.

In machine learning, a standard approach to evaluate a classifier is by cross-validation. We have performed a 10-fold cross-validation on the set of 103,262 annotated tweets. The whole training set is randomly partitioned into 10 folds, one is set apart for testing, and the remaining nine are used to train the model and evaluate it on the test fold. The process is repeated 10 times until each fold is used for testing exactly once. The results are averaged over 10 tests and from standard deviations the 95% confidence intervals are computed. The results are given in Table 2.

Cross-validation gives an estimate of the sentiment classifier performance on the application data, assuming that the training set is representative of the application set. However, it does not provide any hint about the highest performance achievable. We claim that the agreement between the human experts provides an upper bound that the best automated classifier can achieve. The inter-annotator agreement is computed from a fraction of tweets annotated twice. During the annotation process, 6,143 tweets were annotated twice, by two different annotators. The results were used to compute various agreement measures.

There are several measures to evaluate the performance of classifiers and compute the inter-annotator agreement. We have selected the following three measures to estimate and compare them: , , and . () is the fraction of correctly classified examples for all three sentiment classes. This is the simplest and most common measure, but it doesn’t take into account the ordering of the classes. On the other extreme, () (a shorthand for Accuracy within 1 neighboring class) completely ignores the neutral class. It counts as errors just the negative sentiment examples predicted as positive, and vice versa. is the average of for the negative and positive class. It does not account for the misclassification of the neutral class since it is considered less important than the extremes, i.e., negative or positive sentiment. However, the misclassification of the neutral sentiment is taken into account implicitly as it affects the precision and recall of the extreme classes. is the harmonic mean of   and   for each class.   is a fraction of correctly predicted examples out of all the predictions of a particular class.   is a fraction of correctly predicted examples out of all actual members of the class. is a standard measure of performance for sentiment classifiers[53].

Table 2 gives the comparison of the inter-annotator agreement and the classifier performance. The classifier has reached the annotator agreement in all three measures. In a closely related work by Sprenger et al. [36], they use Naive Bayes for sentiment classification. Their classifier is trained on 2,500 examples, and the 10-fold cross-validation yields   of 64.2%.

We argue that in our case, there is no need to invest further work to improve the classifier. Most of the hypothetical improvements would likely be the result of overfitting the training data. We speculate that the high quality of the sentiment classifier is mainly the consequence of a large number of training examples. In our experience in diverse domains, one needs about 50,000 – 100,000 labeled examples to reach the inter-annotator agreement.

If we compare the measures, we observe a difference in the respective   and . For both classes, and , the sentiment classifier has a considerably higher , at the expense of a lower . This means that tweets, classified into extreme sentiment classes ( or ) are likely indeed negative or positive (  about 70%), even if the classifier finds only a smaller fraction of them (  about 40%). This suits well the purpose of this study. Note that it is relatively easy to modify the SVM classifier, without retraining it, to narrow the space of the neutral class, thus increasing the recall of the negative and positive classes, and decreasing their precision. One possible criterion for such a modification is to match the distribution of classes in the application set, as predicted by the classifier, to the actual distribution in the training set.

### Correlation and Granger causality

Correlation. Table 3 shows the computed Pearson correlations, as defined in the Methods section. The computed coefficients are small, but are in line with the result of [30]. In our opinion, these findings and the one published in [30] underline that when considering the entire time period of the analysis, days with a low number of tweets affect the measure.

Granger causality. The results of the Granger causality tests are also in Table 3. They show the results of the causality test in both directions: from the Twitter variables to the market variables and vice versa. The table gives the Granger causality links per company between a) sentiment polarity and price return, and b) the volume of tweets and absolute price return. The conclusions that can be drawn are:

• The polarity variable is not useful for predicting the price return, as only three companies pass the Granger test.

• The number of tweets for a company Granger-causes the absolute price return for one third of the companies. This indicates that the amount of attention on Twitter is useful for predicting the price volatility. Previously, this was known only for an aggregated index, but not for individual stocks [30, 28].

### Cumulative abnormal returns

The results of the event study are shown in Figures 4 and 5, where the cumulative abnormal returns () are plotted for the two types of events defined earlier. The results are largely consistent with the existing literature on the information content of earnings [34, 35]. The evidence strongly supports the hypothesis that tweets do indeed convey information relevant for stock returns.

Figure 4 shows for all the detected Twitter peaks, including the EA events (45% of the detected events are earnings announcements). The average for the events is abnormally increasing after the positive peaks and decreasing after the negative sentiment peaks. This is confirmed with details in Table 4. The values of are significant at the 1% level for ten days after the positive sentiment events. Given this result, the null hypothesis that the events have no impact on price returns is rejected. The same holds for negative sentiment events, but the (actually loss) is twice as large in absolute terms. The after the neutral events is very low, and barely significant at the 5% level at two days; at other days one cannot reject the null hypothesis. We speculate that the positive values for the neutral events, barely significant, are the result of the uniform distribution of the Twitter peaks into three event classes (see Figure 3). An improvement over this baseline approach remains a subject of further research.

A more interesting result concerns the non-EA events in Figure 5. Even after removing the earnings announcements, with already known impact on price returns, one can reject the null hypothesis. In this case, the average of the non-EA events is abnormally increasing after the detected positive peaks and decreasing after the negative peaks. Table 4 shows that after the event days the values of remain significant at the 1% level for four days after the positive events, and for eight days after the negative events. The period of impact of Twitter sentiment on price returns is shorter when the EA events are removed, and the values of are lower, but in both cases the impact is statistically significant. The for the neutral events tend to be slightly negative (in contrast to the EA events), albeit are not statistically significant. However, this again indicates that the distribution of Twitter peaks into the event classes could be improved.

These results are similar to the ones reported by Sprenger at al. [36]. In addition, the authors show statistically significant increase in the values even before the positive event days. They argue that this is due to the information leakage before the earnings announcements. We observe a similar phenomena, but with very low values, and not statistically significant (cf. the positive events at day in Figure 4).

## Discussion

In this work we present significant evidence of dependence between stock price returns and Twitter sentiment in tweets about the companies. As a series of other papers have already shown, there is a signal worth investigating which connects social media and market behavior. This opens the way, if not to forecasting, then at least to “now-casting” financial markets. The caveat is that this dependence becomes useful only when data are properly selected, or different sources of data are analyzed together. For this reason, in this paper, we first identify events, marked by increased activity of Twitter users, and then observe market behavior in the days following the events. This choice is due to our hypothesis that only at some moments, identified as events, there is a strong interaction between the financial market and Twitter sentiment. Our main result is that the aggregate Twitter sentiment during the events implies the direction of market evolution. While this can be expected for peaks related to “known” events, like earnings announcements, it is really interesting to note that a similar conclusion holds also when peaks do not correspond to any expected news about the stock traded.

Similar results were corroborated in a recent, independent study by Sprenger et al. [36]. The authors have made an additional step, and classified the non-EA events into a comprehensive set of 16 company-specific categories. They have used the same training set of 2,500 manually classified tweets to train a Naive Bayesian classifier which can then reasonably well discriminate between the 16 categories. In our future work, we plan to identify topics, which are not predefined, from all the tweets of non-EA events. We intend to apply standard topic detection algorithms, such as Latent Dirichlet allocation (LDA) or clustering techniques.

Studies as this one could be well used in order to establish a direct relation between social networks and market behavior. A specific application could, for example, detect and possibly mitigate panic diffusion in the market from social network analysis. To such purpose there is some additional research to be done in the future. One possible direction is to test the presence of forecasting power of the sentiment time series. Following an approach similar to the one presented by Moat et al. [54] one can decide to buy or sell according to the presence of a peak in the tweet volume and the level of polarity in the corresponding direction. However, detection of Twitter events should rely just on the current and past Twitter volume.

Also, during the events, we might move to a finer time scale, e.g., from daily to hourly resolution, as done by [32]. Finally, our short term plan is to extend the analysis to a larger number of companies with high Twitter volume, and over longer period of time.

## Acknowledgments

The authors would like to thank Sowa Labs for providing the raw Twitter data and the annotated tweets of the DJIA 30 stocks for this research, and to Sašo Rutar for running the annotator agreement and sentiment classification evaluations.

## Supporting Information

S1 Appendix. Event dates and polarity. Detailed information about the detected events from the Twitter data and their polarity. We show the 118 detected EA events and 182 detected non-EA events.

### Footnotes

1. http://www.nasdaq.com/symbol/nke/historical for the “Nike” stock

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