Macroscopic and phenomenological versus microscopic and agent-based treatment of the financial markets

It is the natural peculiarity of the social systems to be treated first of all from the macroscopic and phenomenological point of view. In contrast to the natural sciences microscopic treatment of the social systems is ambiguous and hardly can be considered as a starting point for the consistent modeling. The complexity of human behavior leaves us without any opportunity to consider human agent in action as a determined dynamic trajectory. The financial markets as an example of the social behavior first of all are considered as a macroscopic system exhibiting stochastic movement of the variables such as asset price, trading volume or return [10]. Despite lack of knowledge regarding microscopic background of the financial systems there is considerable progress in stochastic modeling producing very practical applications [36], [37]. The standard model of stock prices, , referred to as geometric Brownian process, is widely accepted in financial analysis (1)

In the above Wiener process can be considered as an external information flow noise while accounts for the stochastic volatility. Though one must consider the model of stock prices following geometric Brownian motion as a hypothesis which has to be checked critically, this serves as a background for many empirical studies and further econometric financial market model developments. Acknowledgment that analysis taking and constant have a finite horizon of application has become an important motivation for the study of the ARCH and GARCH processes [38]–[40] as well as for the stochastic modeling of volatility [37].

We acknowledge this phenomenological approach as a good starting point for the macroscopic financial market description incorporating external information flow noise and we will go further by modeling volatility as an outcome of some agent-based herding model. The main purpose of this approach is to demonstrate how sophisticated statistical features of the financial markets can be reproduced by combining endogenous and exogenous stochasticity.

Here we consider only the most simple case, when fluctuations are slow in comparison with external noise . In such case the return, , in the time period can be written as a solution of Eq. (1) (2)

This equation defines instantaneous return fluctuations as a Gaussian random variable with mean and variance . Let us exclude here from the consideration long term price movements defined by the mean as we will define the dynamics of price from microscopic agent-based part of model. This assumption means that we take from phenomenological model only the general idea how to combine exogenous and endogenous noise. Then Eq. (2) simplifies to the instantaneous Gaussian fluctuations with zero mean and variance .

In [41], [42], while relying on the empirical analysis, we have assumed that the return, , fluctuates as instantaneous q-Gaussian noise with some power-law exponent , and driven by some stochastic process defining second parameter of fluctuations . was introduced as a linear function of absolute return moving average calculated from some nonlinear stochastic model [42] (3)where parameter serves as a time scale of exogenous noise and quantifies the relative input of exogenous noise in comparison with endogenous one described by .

A more solid background for this kind of approach can be found in the work by L. Borland [43]. The idea to replace geometric Brownian process of market price by process with statistical feedback [35] leads to the equation of return as function of time interval given by (4)where evolves according to the statistical feedback process [35] (5)and satisfies the nonlinear Fokker-Planck equation (6)

The explicit solution for in the region of values can be written as one of the Tsallis distributions [44] (7)where and are as follows (8)

Assuming as slow stochastic process in comparison with from Eq. (4) one gets that . This sets PDF for the same as for Eq. (7), one just has to replace and, defined in Eqs. (8) by and accordingly. This gives a Tsallis distribution for as (9)where as new parameter related to previous one can be written as (10)(11)

Now we are prepared to combine two phenomenological approaches introduced by Eqs. (2) and (4) with agent-based endogenous three state herding model. serves as a measure of system volatility in both of the phenomenological approaches. It is reasonable to assume that financial market is in the lowest level of possible volatility when assets market value is equal to the it's fundamental value , lets define it as constant . Volatility of financial system increases when market value of the asset deviates from the fundamental value. These deviations can be accounted as . Further in this contribution we will assume that volatility is defined by through the linear relation (12)where parameter serves as a scale of exogenous noise and quantifies the relative input of endogenous noise. Both parameters and have to be defined from empirical data. To complete the model we have to propose agent-based consideration of log price . In the following section we present the three state herding model giving stochastic equations for the log price .

The three state herding model as a source for the endogenous stochastic dynamics

Having discussed a macroscopic view of the financial fluctuations we now switch to the microscopic consideration of the endogenous fluctuations. Let us derive the system of stochastic differential equations defining the endogenous log-price fluctuations from a setup of appropriate agent groups composition. We consider a system of N heterogenous agents - market traders continually changing their trading strategies between three possible choices: fundamentalists, chartists optimists and chartists pessimists. We further develop this commonly used agent group setup [24] by considering all transitions between three agent states to be a result of binary herding interactions between agents during their market transactions.

Fundamentalists are traders with fundamental understanding of the true stock value, which is commonly quantified as the stock's fundamental price, . We exclude from our consideration any movements of the fundamental price. The assumption of constant fundamental price means that we further will consider price fluctuations around its fundamental value. Taking into account a long-term rational expectations of the fundamentalists their excess demand, , might be assumed to be given by [45] (13)where is a number of the fundamentalists inside the market and is a current market price. The rationality of fundamental traders keeps asset price around its fundamental value as they sell when , and buy when .

Short term speculations cause unpredictable price movements. There is a huge variation of speculative trading strategies, so it is rational, from the statistical physics point of view, to consider these variations as statistically irrelevant. We make only two distinctions between chartists: optimists suggest to buy and pessimist suggest to sell at a given moment. Thus the excess demand of the chartist traders, , can be written as: (14)where is a relative impact factor of the chartist trader and further will be integrated into a certain empirical parameter, and are the total numbers of optimists and pessimists respectively. So, as you can see, we replace a big variety of “rational” chartist trading strategies by herding kinetics between just two options: buy or sell.

The proposed system of heterogenous agents defines asset price movement by applying the Walrasian scenario. A fair price reflects the current supply and demand and the Walrasian scenario in its contemporary form may be written as (15)here is a speed of the price adjustment, a total number of traders in the market, and . By assuming that the number of traders in the market is large, , one obtains: (16)

Stochastic dynamics of the proposed agent-based system is defined by the occupations of the three agent states: (17)

One can model the evolution of occupations as a Markov chain with some reasonable assumptions for the sake of simplicity. There are six one agent transition possibilities in three group setup, see Fig. 1 and [34]. Few assumptions are natural for the financial markets as there is some symmetry. With the notation of agent transitions from state to as subscripts to any parameter , where i and j take values from the set , we will use following assumptions, for the rates of spontaneous transitions: , , , and for the herding transitions: . Finally it is reasonable to assume that transitions between chartist states are much faster than between chartists and fundamentalists , , , . Taking into account the restraint and having in mind that transitions are equivalent to , one can can write one step herding transition rates between and groups for given and as [33] (18)

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Figure 1. Schematic representation of the three state herding model, where relevant parameters are shown.

The arrows point in the directions of the possible transitions, each of the transitions pairs is modeled using original Kirman's model.

https://doi.org/10.1371/journal.pone.0102201.g001

Here transition rates have the same form as in Kirman's herding model [46]. Using Eq. (18) one can write the Master equation for PDF and derive Fokker-Planck equation in the limit [33]. One dimensional Fokker-Planck equations has its equivalent stochastic differential equation which for the can be written as (19)

The next step in this approach is to define dynamics of under restraint . An adiabatic approximation assuming variable changes slowly in comparison with or is helpful here. This enables to consider dynamics as one dimensional process as well. Let us write the transition rates for in the same way as in Eq. (18) (20)

As in other similar cases [33] these one step transitions lead to the SDE for (21)

Equations (19) and (21) form a system of coupled SDEs and define the agent population dynamics in three state agent model taking into account the previous assumptions. It is possible to rewrite Eq. (21) in the form without direct dependance on by introducing another variable , average mood of the chartists, instead of . Such variable substitution makes second SDE independent of the first one (22)

Equations (19) and (22) are independent and define occupation dynamics of the same three state agent-based herding model.

In the previous work we considered generalization of the herding model introducing variable interevent time , see [33], [34]. It is a natural feedback of a macroscopic state on the microscopic behavior, activity of agents. Such feedback is an empirically defined phenomena and can be quantified through the relation of trading volume with return [47]. We introduce this feedback into proposed three state herding model as a trading activity, rate of transactions, defined as (23)where empirical parameter is the same as in Eq. (12). Such power-law behavior is consistent with empirical data quantifying relation of short term return with trading volume , , where , [48]–[50]. Notice that for the geometric Brownian motion model of stock price the return as increment of log-price is proportional to the log-price. This is the another reason together with search of simplicity we use log-price instead of return in Eq. (23).

Taking into account the discussed feedback mechanism, introducing scaled time, , and appropriately redefining model parameters: , , , we are able to rewrite stochastic differential equations of endogenous model as (24)(25)

Then log-price defined in Eq. (16) can be expressed through the stochastic variables of the model and (26)

In Eq. (26) and further we omit parameter as consider it integrated into parameter .

This concludes the definition of consentaneous agent-based and stochastic model of the financial markets as Eq. (26) defines joint endogenous and exogenous volatility introduced by Eq. (12).

Numerical algorithm

We solve Eqs. (24) and (25) by using Euler-Maruyama method [51] with variable time step, . Namely we have transformed a set of stochastic differential equations into a set of difference equations: (27)(28)(29)

In the above we have changed the notation, , to improve readability of the difference equations. While stands for the uncorrelated normally distributed random variables with zero mean and unit variance. Also note that in the difference equations above we have introduced additional parameter , which is responsible for the precision of the numerical results. The smaller value gets, the more precise numerical simulations are, but the longer computation time grows. During the numerical simulations we found to be the optimal value precision-wise and time-wise.

In order to keep and well defined we introduce absorbing boundaries near the edges of the intervals in which these variables are defined. Namely, we require that each belongs to and belongs to . In other words before using and obtained from the Eqs. (27) and (28), we apply and functions on them: (30)(31)

The new and are certainly well defined and may be used in further simulations. In our simulations we have used .

Next step in our numerical simulation is to obtain time series of , discretized at one minute time periods, and apply -Gaussian, (32)or, in certain cases, Gaussian, (33)noise on it. Afterwards we normalize the obtained one minute return time series so in the end it would have unit variance.

Finally we add as many one minute returns as we need to obtain the final return time series at a desired discretization intervals. In the second section we analyze empirical data from New York, Warsaw and NASDAQ OMX Vilnius Stock Exchanges and reproduce it's statistical properties in the numerical simulation.

Comparison of model simulation and empirical data

Now we will adjust model parameters to reproduce empirical data of the return in three different markets. The model return in the time interval can be written as (34)for the Gaussian external noise, see Eq. (2), and (35)for the q-Gaussian one, see Eq.(9). Here denotes normally distributed random variable with zero mean and unit variance, and denotes Tsallis random variable distributed as defined by Eq.(9). We choose as primary sufficiently short time interval where fluctuations are negligible and solve equations (24) and (25) numerically in successive time intervals to get 1 minute time series of , Eq. (26). From the price time series one can produce time series for the volatilities and returns using Eq. (34) or Eq. (35).

We compare model return series with empirical return time series extracted from high frequency trading data on New York, Warsaw, and NASDAQ OMX Vilnius Stock Exchanges. These series were transformed into successive sequences of empirical 1 minute returns. Produced empirical return series were normalized by standard deviation calculated on the entire time sequence of selected stock. For this comparison with empirical data we select only a few stocks from each stock exchange, which have more or less constant long term average trading activity to avoid considerable input of possible trend into time series statistics. From NYSE data we have selected stocks: BMY, GM, MO, T, traded for 27 months from January, 2005. From Warsaw SE stocks: TPSA, KGHM, traded from Novemver 2000 to January 2014, and PZU traded from May 2010 to January 2014. From NASDAQ OMX Vilnius data stocks: APG1L, IVL1L, PTR1L, SAB1L, TEO1L, traded from May 2005 to December 2013. We do not extend this analysis into more wide representation of stocks as only few stocks from NASDAQ OMX Vilnius are liquid enough for such analysis. Comparable demonstration of general features across markets is the main purpose of this consideration. In every stock group series of different stocks are considered as separate realizations of the same stochastic process and so we present empirical statistical information as average over realizations (stocks).

In order to compare scaling of the statistics with increasing time interval of return definition we just sum 1 minute returns of model and empirical time series in successive intervals of 3 minutes, of 10 minutes or 30 minutes. For each stock exchange considered and each time interval we calculate absolute return probability density function (PDF) and power spectral density (PSD). Both PDF and PSD are obtained by averaging over stocks in the considered stock exchanges. Results are presented in four figures: Fig. 2 - for NYSE data; Fig. 3 - for NYSE data with Gaussian noise; Fig. 4 - for Warsaw Stock Exchange data; Fig. 5 - for NASDAQ OMX Vilnius data. In figures: Fig. 2, Fig. 4, Fig. 5 empirical data (red lines) are compared with model statistics (black line) calculated with the same choice of parameters: , , , , , , , , .

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Figure 2. Probability density function (PDF) and power spectral density (PSD) of return with -Gaussian noise for NYSE stocks: BMY, GM, MO, T.

Empirical (red) and model (black) PDF (first column) and PSD (second column). (a) and (b) - 1 minute; (c) and (d) - 3 minutes; (e) and (f) - 10 minutes; (g) and (h) - 30 minutes. Model parameters are as follows: , , , , , , , , .

https://doi.org/10.1371/journal.pone.0102201.g002

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Figure 3. Probability density function (PDF) and power spectral density (PSD) of return with Gaussian noise for NYSE stocks: BMY, GM, MO, T.

Empirical (red) and model (black) PDF (first column) and PSD (second column). (a) and (b) - 1 minute; (c) and (d) - 3 minutes; (e) and (f) - 10 minutes; (g) and (h) - 30 minutes. Model parameters are as follows: , , , , , , , .

https://doi.org/10.1371/journal.pone.0102201.g003

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Figure 4. Probability density function (PDF) and power spectral density (PSD) of return with -Gaussian noise for Warsaw Stock Exchange stocks: KGHM, PZU, TPSA.

Empirical (red) and model (black) PDF (firs column) and PSD (second column). (a) and (b) - 1 minute; (c) and (d) - 3 minutes; (e) and (f) - 10 minutes; (g) and (h) - 30 minutes. Model parameters are the same as in Fig. 2.

https://doi.org/10.1371/journal.pone.0102201.g004

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Figure 5. Probability density function (PDF) and power spectral density (PSD) of return with -Gaussian noise for NASDAQ OMX Vilnius stocks: APG1L, IVL1L, PTR1L, SAB1L, TEO1L.

Empirical (red) and model (black) PDF (first column) and PSD (second column). (a) and (b) - 1 minute; (c) and (d) - 3 minutes; (e) and (f) - 10 minutes; (g) and (h) - 30 minutes. Model parameters are the same as in Fig. 2.

https://doi.org/10.1371/journal.pone.0102201.g005

From our point of view the achieved coincidence of empirical and model statistics is better than expected. PDF and PSD coincide almost for all markets and all time scales. q-Gaussian noise suites much better for this model, compare Fig. 2 calculated with q-Gaussian noise and Fig. 3 calculated with Gaussian one. The use of q-Gaussian noise can be confirmed by more detailed study of empirical data as well.

There are some observed discrepancies of empirical and model results, which have reasonable explanations. For example, spikes observed in empirical PSD are related with one trading day seasonality, this is not included in the presented model and not observed in the model PSD. Thanks to reviewer, who has stimulated us to think how could be empirically observed intra-day pattern of return volatility and trading activity introduced into our model. The answer is not so simple as one could expect because we use simplified, assumed as only statistically valid, relation between log price and trading activity, see Eq.(23). The proposed model does not include trading activity as independent dynamic variable and this makes introduction of discussed seasonality regarding trading activity not straightforward. Nevertheless, this intraday seasonality first of all has to be reflected in volatility pattern of total return fluctuations quantified by parameter . Let us to replace constant value of by some intra-day exponential variation (36)where quantifies in minutes the width of variation and time is closed in the circle of total duration of NYSE trading day equal to 390 minutes, note or corresponds to the middle point of trading day. In Fig. 6 we present results of such numerical experiment, where power spectral density of absolute return for NYSE stocks is compared with model accounting for seasonality, Eq. (36). As one can see, such a simple introduction of volatility seasonality reproduces empirical resonance structure of absolute return very well.

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Figure 6. Power spectral density (PSD) of return with -Gaussian noise and seasonality accounted for NYSE stocks: BMY, GM, MO, T.

Empirical (red) and model (black) PSD accounting for parameter's seasonality Eq. (36). (a) - 1 minute; (b) - 3 minutes; (c) - 10 minutes; (d) - 30 minutes. Other model parameters are the same as in Fig. 2.

https://doi.org/10.1371/journal.pone.0102201.g006

For such emerging markets as Baltic region the intensity of stock trading is up to 50 time lower than in NYSE. This makes a considerable impact on return in such short time interval as 1 minute PDF as for over 90% of time intervals no transactions are registered. Consequently, one observes considerable discrepancy in PDF for low return values as main part of returns are equal to zero. Nevertheless, it is worth to notice that power law part of PDF and PSD is in pretty good agreement with model one. Mentioned discrepancy disappears with increasing or for the markets with a more intensive trading. Some PDF discrepancy for low returns values is observed for NYSE and Warsaw stocks as well and this is related with some impact of discrete nature of price values measured in cents, namely on the discrete tick size. Certainly, prices are smooth in the model.

Finally we can conclude that three state herding model of absolute return in financial markets works very well and explains general origins of power law statistics for very different markets starting from most developed to emerging.