Stochastic Processes and Calculus - Uwe HasslerSource: Hassler, Uwe Stochastic Processes and...
Transcript of Stochastic Processes and Calculus - Uwe HasslerSource: Hassler, Uwe Stochastic Processes and...
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Stochastic Processes and Calculus
An Elementary Introduction with Applications
Uwe Hassler
Springer 2016
Teaching Material
The following figures are from the above book. They are provided to help instructors and students and
may be used for teaching purposes as long as a reference to the book is given in class.
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 3.1 Simulated MA(1) Processes with σ² = 1 and μ = 0
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 3.2 Simulated AR(1) Processes with σ² = 1 and μ = 0
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 3.3 Stationarity Triangle for AR(2) Processes
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 3.4 Autocorrelograms for AR(2) Processes
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 3.5 Autocorrelograms for ARMA(1,1) Processes
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 4.1 Cosine Cycle with Different Frequencies
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 4.2 Spectra (2π f (λ)) of the MA(S) process from Ex. 4.2
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 4.3 Spectrum (2π f (λ)) of Business Cycle with a Period of 8.6 years
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 4.4 AR(1) Spectra (2π f (λ)) with Positive Autocorrelation
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 4.5 AR(1) Spectra (2π f (λ)), cf. Figure 3.2
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 4.6 AR(2) Spectra (2π f (λ)), cf. Figure 3.4
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 4.7 ARMA(1,1) Spectra (2π f (λ)), cf. Figure 3.5
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 4.8 Spectra (2π f (λ)) of Multiplicative Seasonal AR Processess (S = 4)
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 5.1 j d-1 for d = 0.85, 0.65, 0.45, 0.25
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 5.2 g j-1 for g = 0.85, 0.65, 0.45, 0.25
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 5.3 ρ(h) from Prop. 5.1 for d = 0.45, 0.25, -0.25, -0.45
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 5.4 2π f (λ) from Prop. 5.2 for d = 0.45, 0.25, -0.25, -0.45
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 5.5 Simulated Fractional Noise for d = 0.45, 0.25, -0.45
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 5.6 Nonstationary Fractional Noise for d = 1.45, 1.0, 0.55
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 6.1 ARCH(1) with α0 = 1 and α1 = 0.5
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 6.2 ARCH(1) with α0 = 1 and α1 = 0.9
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 6.3 GARCH(1,1) with with α0 = 1 and α1 = 0.3 and β1 = 0.3
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 6.4 GARCH(1,1) with α0 = 1 and α1 = 0.3 and β1 = 0.5
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 6.5 IGARCH(1,1) with α0 = 1 and α1 = 0.3 and β1 = 0.7
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 6.6 GARCH(1,1)-M from (6.11) with α0 = 1 and α1 = 0.3 and β1 = 0.5
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 6.7 EGARCH(1,1) with ω = 1, α1 = 0.3 and β1 = 0.5 and γ1 = -0.5
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 7.1 Step Function from (7.1) on the Interval [0,1]
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 7.2 Simulated Paths of the WP on the Interval [0,1]
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 7.3 WP and Brownian Motion with σ = 0.5
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 7.4 WP and Brownian Motion with Drift, where σ = 1
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 7.5 WP and Brownian Bridge (σ = 1)
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 7.6 WP and reflected WP along with Expectation
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 7.7 WP and Geometric Brownian Motion with μ = -0.5 and σ = 1
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 7.8 Geometric Brownian Motion with μ = 1.5 and σ = 1 along with Expectation
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 7.9 WP and Maximum Process along with Expectation
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 7.10 WP and integrated WP
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 9.1 Standard Ornstein-Uhlenbeck Processes
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 10.1 Sine Cycles of Different Frequencies (Example 10.5)
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 13.1 OUP for c1 = -0.9 (X1) and c1 = -0.1 (X2) (X (0) = μ = 5, σ2 = 0.01)
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 13.2 OUP for c1 = -0.9 and Starting Value X(0) = 5.1 including Expected Value Function (μ =
5, σ2 = 0.01)
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 13.3 Dothan for σ1 = 0.01 (X1) and σ1 = 0.02 (X2) (X (0) = μ = 5)
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 13.4 Brennan-Schwartz for c1 = -0.9 (X1) and c1 = -0.1 (X2) (X (0) = μ = 5, σ1 = 0.01)
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 13.5 CKLS with γ = 0.25 (X1) and γ = 0.75 (X2) for c1 = -0.9 (X (0) = μ = 5, σ1 = 0.01)
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 13.6 OUP and CIR for c1 = -0.9 (X (0) = μ = 5, σ = σ2 = 0.01)
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Source: Hassler, Uwe Stochastic Processes and Calculus: An Elementary Introduction with Applications © Springer-Verlag Berlin Heidelberg 2016 ISBN 978-3-319-23427-4/ ISBN (eBook) 978-3-319-23428-1
Figure 15.1 Linear Time Trend