E-Book, Englisch, 384 Seiten
Lindström / Madsen / Nielsen Statistics for Finance
1. Auflage 2018
ISBN: 978-1-315-36021-8
Verlag: Taylor & Francis
Format: EPUB
Kopierschutz: Adobe DRM (»Systemvoraussetzungen)
E-Book, Englisch, 384 Seiten
Reihe: Chapman & Hall/CRC Texts in Statistical Science
ISBN: 978-1-315-36021-8
Verlag: Taylor & Francis
Format: EPUB
Kopierschutz: Adobe DRM (»Systemvoraussetzungen)
Statistics for Finance develops students’ professional skills in statistics with applications in finance. Developed from the authors’ courses at the Technical University of Denmark and Lund University, the text bridges the gap between classical, rigorous treatments of financial mathematics that rarely connect concepts to data and books on econometrics and time series analysis that do not cover specific problems related to option valuation.
The book discusses applications of financial derivatives pertaining to risk assessment and elimination. The authors cover various statistical and mathematical techniques, including linear and nonlinear time series analysis, stochastic calculus models, stochastic differential equations, Ito’s formula, the Black–Scholes model, the generalized method-of-moments, and the Kalman filter. They explain how these tools are used to price financial derivatives, identify interest rate models, value bonds, estimate parameters, and much more.
This textbook will help students understand and manage empirical research in financial engineering. It includes examples of how the statistical tools can be used to improve value-at-risk calculations and other issues. In addition, end-of-chapter exercises develop students’ financial reasoning skills.
Zielgruppe
Senior undergraduate and graduate students in statistics and mathematics; researchers in statistics, mathematics, economics, and finance.
Autoren/Hrsg.
Fachgebiete
Weitere Infos & Material
IntroductionIntroduction to financial derivatives Financial derivatives—what’s the big deal? Stylized factsOverview
Fundamentals Interest rates Cash flows Continuously compounded interest rates Interest rate options: caps and floors
Discrete-Time Finance The binomial one period model The one period model The multi period model
Linear Time Series Models Introduction Linear systems in the time domain Linear stochastic processes Linear processes with a rational transfer functionAutocovariance functions Prediction in linear processes
Non-Linear Time Series Models Introduction The aim of model buildingQualitative properties of the models Parameter estimationParametric models Model identification Prediction in non-linear models Applications of non-linear models
Kernel Estimators in Time Series Analysis Non-parametric estimation Kernel estimators for time series Kernel estimation for regression Applications of kernel estimators
Stochastic Calculus Dynamical systems The Wiener process Stochastic Integrals Ito stochastic calculus Extensions to jump processes
Stochastic Differential Equations Stochastic differential equations Analytical solution methods Feynman–Kac representation Girsanov measure transformation
Continuous-Time Security Markets From discrete to continuous time Classical arbitrage theoryModern approach using martingale measures Pricing Model extensions Computational methods
Stochastic Interest Rate Models Gaussian one-factor models A general class of one-factor models Time-dependent models Multifactor and stochastic volatility models
The Term Structure of Interest Rates Basic concepts The classical approach The term structure for specific models Heath–Jarrow–Morton framework Credit models Estimation of the term structure—curve-fitting
Discrete-Time Approximations Stochastic Taylor expansionConvergence Discretization schemes Multilevel Monte Carlo Simulation of SDEs
Parameter Estimation in Discretely Observed SDEsIntroduction High frequency methods Approximate methods for linear and non-linear modelsState dependent diffusion term MLE for non-linear diffusionsGeneralized method of moments (GMM) Model validation for discretely observed SDEs
Inference in Partially Observed Processes IntroductionThe model Exact filtering Conditional moment estimators Kalman filter Approximate filters State filtering and predictionThe unscented Kalman filter A maximum likelihood method Sequential Monte Carlo filters Application of non-linear filters
Appendix A: Projections in Hilbert Spaces Appendix B: Probability Theory
Bibliography
Problems appear at the end of each chapter.
