We discuss various existing models which mimic the herding effect in financial markets and introduce a new model of herding which incorporates both growth and coagulation. In this model, at each time step either (i) with probability p the system grows through the introduction of a new agent or (ii) with probability q=1-p two groups are selected at random and coagulate. We show that the size distribution of these groups has a power law tail with an exponential cut-off. A variant of our basic model is also discussed where rates are proportional to the size of a grou

Amaral

Bikhchandani

Cont

D'Hulst

Eguíluz

G.J. Rodgers

Mandelbrot

Mantegna

Pictet

Rodgers

Rosenberg

S. Rawal

English

S.  Rawal

Crossref

Growth and coagulation in a herding model

Rawal, S

Rodgers, GJ

Brunel University Research Archive

Growth and Coagulation in a Herding ModelS Rawal and G J Rodgers Department of Mathematical Sciences Brunel UniversityUxbridge Middlesex UB PH UKAbstractWe discuss various existing models which mimic the herding eect in nancialmarkets and introduce a new model of herding which incorporates both growthand coagulation In this model at each time step either i with probabilityp the system grows through the introduction of a new agent or ii withprobability q  	  p two groups are selected at random and coagulate Weshow that the size distribution of these groups has a power law tail with anexponential cuto A variant of our basic model is also discussed where ratesare proportional to the size of a groupPACS cw a HcKeywords Herding growth coagulation powerlaws Corresponding author Tel 	 fax 	Email address GJRodgersbrunelacuk GJRodgersI INTRODUCTIONFrom the empirical analysis of nancial pricedata on short time scales it appears that theprice variations of many assets indices and currencies deviate from the Gaussian distributionand have fattails 	 Exceptionally large uctuations are distributed according to anexponentially truncated power law  and it is believed that this behaviour is broughtabout by a herding eectThe term herding can be described as a group of agents sharing the same informationor the same rumour and imitating each other when making trading decisions  Thesegroups or herds of agents are thought to be responsible for the large uctuations in pricesHerding coupled with supply and demand can cause sudden rises or falls when the groupsall decide to buysell The large groups have a strong impact on the supply and demandequilibrium hence the larger the group the bigger the impact they have on the marketSeveral models have been proposed recently to mimic and investigate the herding behaviour in nancial markets 	 In these models a cluster is a connected group of agentswho can exchange information and make the same decisions from a choice of buying sellingor doing nothing If we assume that the traded amount is proportional to the number ofagents in a cluster  then the cluster size distribution can correspond to the distribution ofreturns ie the relative dierence between the number of buyers and the number of sellersor alternatively the supply and demand balance  at a particular timeCont and Bouchaud  introduced a model in which the network of agents was consideredto be a diluted regular lattice where the vertices were agents and edges were channels ofcommunication In this model any agents were connected with probability p and agents ina connected cluster formed a group which shared information and made the same decisionsA power law distribution with an exponential cuto of group sizes which corresponds toa distribution of returns was obtained when the parameter p was close to the percolationthresholdTo further investigate the herding eect Eguluz and Zimmermann  put forward akinetic version of the above model in which instead of being static the network of agentsevolved dynamically as decisions were being made or as agents exchanged information Theyobtained numerically the same power law distribution for returns as Cont and Bouchaud An exact analytical expression was found for this model in Ref  and since thenalternative kinetic models have been introduced 	 These three models 	 are veryclosely related as they incorporate only two phenomena from either growth fragmentationcoagulation addition or attachment however it is the combination of these ingredientswhich cause the models to dierThe model proposed in Ref  is one where groups of agents can either coagulate orfragment at each time step The model introduced in Ref  is a combination of attachmentand fragmentation and the third model 	 incorporates both growth and additionIn this paper we introduce an alternative kinetic model in which either the system growsthrough the introduction of a new agent or two groups of agents coagulate In Section  wereview the three existing kinetic models 	 and the main results obtained In Section	 we present our main model and show that the size distribution of groups of agents hasa power law tail with an exponential cuto We assume that rates are independent ofgroup sizes In Section  we study a variant of the model in which groups are selected forcoagulation with a rate proportional to group sizes In this case large groups grow morequickly than small ones This seems reasonable as it is more likely that two agents fromlarger groups would come into contact with each other In the nal section we discuss ourwork and draw some conclusionsII EXISTING MODELSModel A Fragmentation and CoagulationIn the model proposed by DHulst and Rodgers  with probability p a cluster isselected at random for fragmentation That is a group of agents trade by using their sharedinformation and the group is then broken up into individual agents With a probability  p	two clusters are selected at random and coagulated This means that two groups decide toshare information and form a new larger group As a chemical process this can be writtenas Br rB with probability p and Br Bs Brswith probability    p All rates areproportional to group sizesThis model was solved exactly and it was found that nswhich is the number of clustersof size s obeysns  ps s    ps sNwhere Nis the total number of agents For large s it was found thatns N   p  psswhich is power law with an exponent  with an exponential cuto that vanishes whenp   This shows that the model is not selforganised as a powerlaw distribution for largetransactions only appears when the parameter p is tuned to a low valueThe variance of the distribution of returns  which is given by M M  p   pp	whereMiNXs sinsis the ith moment of ns was obtained The kurtosis was also computed which indicatesthat there are heavy tails for every value of p This shows that the model deviates fromGaussian behaviourModel B Attachment and FragmentationIn the model introduced by Rodgers and Zheng  at each time step with probabilityp an incoming agent joins an existing cluster of size k with a rate proportional to k and withprobability   p a cluster is selected at random and fragmented As a chemical process thiscan be written as B Br Br with probability p and Br rB with probability   pIn this model for large t nkt which is the number of clusters with size k isnkt p   pkk  t As k nkt  tkwhere     p qp   p  qp   p     Hence this model gives a power law distribution of groups of agents for all parametervalues with an exponent which can take any value greater than Model C Growth and AdditionIn the model presented by Rodgers and Yap 	 at each time step with probabilityp the system grows through the introduction of a new agent and with probability    p afree agent already in the system is added at random to a group of size k with rate k Asa chemical process this can be written as   B with probability p and Br B  Br with probability    pBy using a similar method to that of the above model it was found that when p  nkt  pp       pkk   pt where as k nkt  tk   p In summary exact analytical expressions were obtained for the above models It wasfound that whilst one has a power law distribution for group sizes with a tuneable exponentothers have exponents that are determined by the model as universal exponentsIII A MODEL WITH GROWTH AND COAGULATIONWe introduce a model in which at each time step one of the two events chosen at randomcan occur With probability p an agent joins the group but remains free Alternativelywith probability    p two groups are selected for coagulation with a rate independent togroup sizes As a chemical process this can be written as   B with probability p andBrBs Brswith probability   p Consequently the number nst of clusters of size sat time t evolves likednstdtqNts Xr nrnsr qnsNt ps  In this equationNt Xs nst represents the number of groups andMt Xs snst is the number of agents in the system The rst term on the righthand side of Eq describes the creation of a new cluster of size s by coagulation of two clusters of size r ands   r with r 	 s The second term describes the disappearance of a cluster of size s bycoagulation with another cluster and the nal term represents the arrival of new agents inthe system Using rate equation  it is a simple matter to show thatdNtdt p    	anddMtdt p Eq 	 represents the fact that with probability p   on average the number of groupsincreases by  Similarly Eq  indicates that with probability p the number of agentsincreases by  The form of Eqs  	 and  suggests that the solution for nst fors     is linear in time for large t when p   In this limit we can solve Eqs 	and  to yieldNt  p   t and Mt  pt Writingnst  tcswe nd thatcs  pp  s Xr crcsr    pcsp    ps  Introducing the generating functiong Xs csswe ndg p      p  q      pp giving a size distribution for clusters ofcsp   ps  ps s  ss   Using Stirlings formula to expand this for large s we havecs p   pss Hence this model presents a power law distribution with an exponent 	 for the size distribution of clusters with an exponential cuto When p   the exponential cutovanishesIV SIZE DEPENDENT RATESWe can introduce a version of the above model in which the rates are proportional tothe size of a group In this case the rate equation for the system isdnstdtqMts Xr rnrs  rnsr qsnsMt ps  Using a similar method to that used in the previous section but with an alternative generating function it is simple to show that for large scs p   pss 	Thus although we do not nd an exact analytical solution for this variant of the model wend that large groups are approximately power law distributed with an exponential cutowith an exponent  As p  the exponential cuto vanishesV DISCUSSIONWe have discussed various dierent kinetic models of herding 	 and have introducedan alternative kinetic model which incorporates both growth and coagulation The systemgrows as new agents are introduced and coagulation allows groups of agents to be formedThis is in contrast to the models proposed in Refs  where there are a xed numberof agentsWe have presented an exact solution to this model and found that it exhibits a powerlaw distribution with an exponential cuto for the size distribution of clusters and hencefor the distribution of returns The model is not selforganised as the parameter p has to beclose to  to ensure the appearance of groups of all sizes and only when p is close to thisvalue the system displays a power law distribution for large groups where the exponent is	We have also considered a variant of the model where rates are proportional to the sizeof a group Although we do not obtain an exact solution we nd that for large s only thesystem displays a power law distribution with an exponential cuto In this case whenp   the system gives a power law distribution for large groups but with an exponentThese results agree to those found in Refs  where the models exhibit a power lawdistribution of returns with an exponential cuto and in order to obtain a power law theparameters require tuning However other models 	 exhibit a power law distributionof returns for all its parameter values and the exponent of the power law distribution ineach model can be varied continuously as it is dependent on the parameter p Hence whilstsome models have a power law distribution of group sizes with a tuneable exponent othershave exponents that are determined by the model as universal exponentsIn conclusion there seems to be a number of dierent processes that can give a powerlaw distribution for group sizes It seems as though the precise details of the processesare unimportant and the essential universal important ingredient for these models is themeaneld long ranged interaction nature of all these systems This can be related to themodern highly connected world we live in where social interactions are also considered tobe meaneld and nonlocal in character Models of this type can be expected to mimicsimple processes in social networks nancial and economic phenomena where individualsshare information by forming groups and break up when the information has been usedProcesses for which this approach can be used range from information or rumour spreadingparticularly in nancial markets through the take up of the latest craze such as videophones or The Lord of the Rings to epidemiological studies of disease and epidemic spreadREFERENCES B Mandelbrot J Business 	 	 	 RN Mantegna HE Stanley An Introduction to Econophysics Correlations and Complexity in Finance Cambridge University Press Cambridge 	 LAN Amaral V Plerou P Gopikrishnan M Meyer HE Stanley Int J TheorAppl Finance 	  	 OV Pictet M Dacorogna UA Muller RB Olsen JR Ward J Banking and Finance    S Bikhchandani S Sharma IMF Sta Papers    K Kim SM Yoon Y Kim Herd behavior of returns in the futures exchange marketcondmat		 R Cont JP Bouchaud Macroeconomic Dynamics    VM Eguluz MG Zimmermann Phys Rev Lett    R DHulst GJ Rodgers Physica A    R DHulst GJ Rodgers Eur Phys J B    R DHulst GJ Rodgers Int J Theor Appl Finance 	   GJ Rodgers D Zheng Physica A 	  		 GJ Rodgers YJ Yap Eur Phys J B    B Rosenberg JA Ohlson J Fin Quant Analysis   		

Growth and Coagulation in a Herding Model

Growth and Coagulation in a Herding Model

Abstract

Similar works

Full text

Available Versions

Crossref

Brunel University Research Archive