Search results for "Statistical finance"

showing 10 items of 52 documents

Ensemble properties of securities traded in the NASDAQ market

2001

We study the price dynamics of stocks traded in the NASDAQ market by considering the statistical properties of an ensemble of stocks traded simultaneously. For each trading day of our database, we study the ensemble return distribution by extracting its first two central moments. According to previous results obtained for the NYSE market, we find that the second moment is a long-range correlated variable. We compare time-averaged and ensemble-averaged price returns and we show that the two averaging procedures lead to different statistical results.

FOS: Economics and businessStatistics and ProbabilityReturn distributionVariable (computer science)Statistical Finance (q-fin.ST)Statistical Mechanics (cond-mat.stat-mech)EconometricsQuantitative Finance - Statistical FinanceFOS: Physical sciencesSecond moment of areaCondensed Matter PhysicsCondensed Matter - Statistical MechanicsMathematicsPhysica A: Statistical Mechanics and its Applications

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Levels of complexity in financial markets

2001

We consider different levels of complexity which are observed in the empirical investigation of financial time series. We discuss recent empirical and theoretical work showing that statistical properties of financial time series are rather complex under several ways. Specifically, they are complex with respect to their (i) temporal and (ii) ensemble properties. Moreover, the ensemble return properties show a behavior which is specific to the nature of the trading day reflecting if it is a normal or an extreme trading day.

FOS: Economics and businessStatistics and ProbabilityStatistical Finance (q-fin.ST)Statistical Mechanics (cond-mat.stat-mech)Series (mathematics)Work (electrical)Financial marketEconometricsEconomicsFOS: Physical sciencesQuantitative Finance - Statistical FinanceCondensed Matter PhysicsCondensed Matter - Statistical MechanicsPhysica A: Statistical Mechanics and its Applications

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On the interplay between multiscaling and stocks dependence

2019

We find a nonlinear dependence between an indicator of the degree of multiscaling of log-price time series of a stock and the average correlation of the stock with respect to the other stocks traded in the same market. This result is a robust stylized fact holding for different financial markets. We investigate this result conditional on the stocks' capitalization and on the kurtosis of stocks' log-returns in order to search for possible confounding effects. We show that a linear dependence with the logarithm of the capitalization and the logarithm of kurtosis does not explain the observed stylized fact, which we interpret as being originated from a deeper relationship.

Multivariate propertiePhysics::Physics and SocietyStatistical Finance (q-fin.ST)050208 financeUnivariate properties05 social sciencesQuantitative Finance - Statistical FinanceFOS: Economics and businessMultiscalingNonlinear systemUnivariate propertieComputer Science::Computational Engineering Finance and Science0502 economics and businessEconometrics050207 economicsDependenceGeneral Economics Econometrics and FinanceFinanceStock (geology)Mathematics

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Modelling systemic price cojumps with Hawkes factor models

2015

Instabilities in the price dynamics of a large number of financial assets are a clear sign of systemic events. By investigating a set of 20 high cap stocks traded at the Italian Stock Exchange, we find that there is a large number of high frequency cojumps. We show that the dynamics of these jumps is described neither by a multivariate Poisson nor by a multivariate Hawkes model. We introduce a Hawkes one factor model which is able to capture simultaneously the time clustering of jumps and the high synchronization of jumps across assets.

Multivariate statisticsEconomicsSystemic shockPoisson distribution01 natural sciencesSynchronizationEconometrics and Finance (all)2001 EconomicsFOS: Economics and business010104 statistics & probabilitysymbols.namesakeHigh frequency data0502 economics and businessEconomicsEconometricsCojumps0101 mathematicsCojumps; Hawkes processes; High frequency data; Systemic shocks; Finance; Economics Econometrics and Finance (all)2001 Economics Econometrics and Finance (miscellaneous)Time clusteringFactor analysisSettore SECS-S/06 - Metodi mat. dell'economia e Scienze Attuariali e FinanziarieStatistical Finance (q-fin.ST)050208 financeSystemic shocksHawkes processe05 social sciencesQuantitative Finance - Statistical FinanceEconomics Econometrics and Finance (all)2001 Economics Econometrics and Finance (miscellaneous)Econometrics and Finance (miscellaneous)symbolsCojumpHawkes processesGeneral Economics Econometrics and FinanceFinanceSign (mathematics)Quantitative Finance

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Evolution of worldwide stock markets, correlation structure and correlation based graphs

2011

We investigate the daily correlation present among market indices of stock exchanges located all over the world in the time period Jan 1996 - Jul 2009. We discover that the correlation among market indices presents both a fast and a slow dynamics. The slow dynamics reflects the development and consolidation of globalization. The fast dynamics is associated with critical events that originate in a specific country or region of the world and rapidly affect the global system. We provide evidence that the short term timescale of correlation among market indices is less than 3 trading months (about 60 trading days). The average values of the non diagonal elements of the correlation matrix, corre…

NETWORK STRUCTUREPhysics - Physics and SocietyStatistical Finance (q-fin.ST)CROSS-CORRELATIONSCovariance matrixINDEXESFOS: Physical sciencesQuantitative Finance - Statistical FinanceScale (descriptive set theory)Physics and Society (physics.soc-ph)Mutual informationNOISEFOS: Economics and businessCorrelationMINIMUM SPANNING-TREESDYNAMIC ASSET TREESStock exchangeOrder (exchange)EconometricsEQUITY MARKETSMATRICESStock (geology)Eigenvalues and eigenvectorsMathematics

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Role of noise in a market model with stochastic volatility

2006

We study a generalization of the Heston model, which consists of two coupled stochastic differential equations, one for the stock price and the other one for the volatility. We consider a cubic nonlinearity in the first equation and a correlation between the two Wiener processes, which model the two white noise sources. This model can be useful to describe the market dynamics characterized by different regimes corresponding to normal and extreme days. We analyze the effect of the noise on the statistical properties of the escape time with reference to the noise enhanced stability (NES) phenomenon, that is the noise induced enhancement of the lifetime of a metastable state. We observe NES ef…

Noise inducedProbability theory stochastic processes and statisticFOS: Physical sciencesEconomicFOS: Economics and businessStochastic differential equationStatistical physicsMarket modelCondensed Matter - Statistical MechanicsEconomics; econophysics financial markets business and management; Probability theory stochastic processes and statistics; Fluctuation phenomena random processes noise and Brownian motion; Complex SystemsMathematicsFluctuation phenomena random processes noise and Brownian motionStatistical Finance (q-fin.ST)Stochastic volatilityStatistical Mechanics (cond-mat.stat-mech)Cubic nonlinearityQuantitative Finance - Statistical FinanceComplex SystemsWhite noiseDisordered Systems and Neural Networks (cond-mat.dis-nn)Condensed Matter - Disordered Systems and Neural NetworksCondensed Matter PhysicsSettore FIS/07 - Fisica Applicata(Beni Culturali Ambientali Biol.e Medicin)Electronic Optical and Magnetic MaterialsHeston modelVolatility (finance)econophysics financial markets business and management

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Correlation, hierarchies, and networks in financial markets

2010

We discuss some methods to quantitatively investigate the properties of correlation matrices. Correlation matrices play an important role in portfolio optimization and in several other quantitative descriptions of asset price dynamics in financial markets. Specifically, we discuss how to define and obtain hierarchical trees, correlation based trees and networks from a correlation matrix. The hierarchical clustering and other procedures performed on the correlation matrix to detect statistically reliable aspects of the correlation matrix are seen as filtering procedures of the correlation matrix. We also discuss a method to associate a hierarchically nested factor model to a hierarchical tre…

Organizational Behavior and Human Resource ManagementEconomics and EconometricsPhysics - Physics and SocietyCorrelation based networkKullback–Leibler divergenceStability (learning theory)FOS: Physical sciencesKullback–Leibler distancePhysics and Society (physics.soc-ph)computer.software_genreHierarchical clusteringFOS: Economics and businessCorrelationMultivariate analysis Hierarchical clustering Correlation based networks Bootstrap validation Factor models Kullback–Leibler distancePortfolio Management (q-fin.PM)Bootstrap validationQuantitative Finance - Portfolio ManagementMathematicsFactor analysisStatistical Finance (q-fin.ST)Covariance matrixMultivariate analysiQuantitative Finance - Statistical FinanceHierarchical clusteringFactor modelTree (data structure)Physics - Data Analysis Statistics and ProbabilityData miningPortfolio optimizationcomputerData Analysis Statistics and Probability (physics.data-an)

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Cluster analysis for portfolio optimization

2005

We consider the problem of the statistical uncertainty of the correlation matrix in the optimization of a financial portfolio. We show that the use of clustering algorithms can improve the reliability of the portfolio in terms of the ratio between predicted and realized risk. Bootstrap analysis indicates that this improvement is obtained in a wide range of the parameters N (number of assets) and T (investment horizon). The predicted and realized risk level and the relative portfolio composition of the selected portfolio for a given value of the portfolio return are also investigated for each considered filtering method.

Physics - Physics and SocietyEconomics and EconometricsControl and OptimizationMathematics::Optimization and ControlFOS: Physical sciencesStatistics::Other StatisticsPhysics and Society (physics.soc-ph)random matrix theoryportfolio optimizationcorrelation matriceRate of return on a portfolioFOS: Economics and businessComputer Science::Computational Engineering Finance and ScienceEconometricsEconomicsCluster analysisModern portfolio theoryStatistical Finance (q-fin.ST)Covariance matrixApplied MathematicsQuantitative Finance - Statistical FinanceCondensed Matter - Other Condensed MatterPortfolioPortfolio optimizationVolatility (finance)clustering methodRandom matrixOther Condensed Matter (cond-mat.other)

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There's more to volatility than volume

2006

It is widely believed that fluctuations in transaction volume, as reflected in the number of transactions and to a lesser extent their size, are the main cause of clustered volatility. Under this view bursts of rapid or slow price diffusion reflect bursts of frequent or less frequent trading, which cause both clustered volatility and heavy tails in price returns. We investigate this hypothesis using tick by tick data from the New York and London Stock Exchanges and show that only a small fraction of volatility fluctuations are explained in this manner. Clustered volatility is still very strong even if price changes are recorded on intervals in which the total transaction volume or number of…

Physics - Physics and SocietyEconomicsvolatilityFOS: Physical sciencessubordinated processesPhysics and Society (physics.soc-ph)FOS: Economics and businessStock exchangeddc:330EconometricsEconomicsVolatility Modelling; Transaction Frequency; Trading Volume; Market StructurevolumeStatistical Finance (q-fin.ST)Financial marketVolume (computing)WirtschaftQuantitative Finance - Statistical FinancePolitical EconomyVolkswirtschaftslehrefinancial marketVolatility (finance)Constant (mathematics)General Economics Econometrics and FinanceDatabase transactionFinance

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Scaling and data collapse for the mean exit time of asset prices

2005

We study theoretical and empirical aspects of the mean exit time of financial time series. The theoretical modeling is done within the framework of continuous time random walk. We empirically verify that the mean exit time follows a quadratic scaling law and it has associated a pre-factor which is specific to the analyzed stock. We perform a series of statistical tests to determine which kind of correlation are responsible for this specificity. The main contribution is associated with the autocorrelation property of stock returns. We introduce and solve analytically both a two-state and a three-state Markov chain models. The analytical results obtained with the two-state Markov chain model …

Physics - Physics and SocietyFísica matemàticaFOS: Physical sciencesMarkov processPhysics and Society (physics.soc-ph)FOS: Economics and businessFINANCEsymbols.namesakeFRACTIONAL CALCULUSQuadratic equationEconometricsNonlinear systemsApplied mathematicsDISTRIBUTIONSTime seriesScalingBrownian motionMathematicsStatistical hypothesis testingRANDOM-WALKSStatistical Finance (q-fin.ST)Series (mathematics)Markov chainStochastic processSistemes no linealsPhysicsAutocorrelationQuantitative Finance - Statistical FinanceFísicaFLUCTUATIONSMathematical physicssymbolsContinuous-time random walk

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