A Lattice Approach to the Valuation of Multi-variate Contingent Claims with Regime Switching
A Lattice Approach to the Valuation of Multi-variate Contingent Claims with Regime Switching

Author: Mohamed Wahab Mohamed Ismail

Publisher:

Published: 2006

Total Pages: 238

ISBN-13: 9780494219584

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Various investment and operational practices, such as investing in flexible manufacturing systems and writing contracts to hedge the future risks, increasingly require tools for the valuation of contingent claims whose values depend on multiple underlying stochastic variables. These contingent claims incorporate advanced features, such as the early exercise of options, intermediate decisions, optimal policies, and possible causes of the dynamic behavior of the economic and operational environments. It would be impractical to utilize single-regime models, which specify a given mean and volatility to represent the evolution of an underlying variable, to describe the uncertainties from those economic and operational environments. Therefore, regime-switching models, which allow changes in the mean and volatility of the underlying stochastic variables over time, emerge as an alternative approach. Since the current literature on the regime-switching models mainly focuses on modeling and valuing an option on a single stochastic variable, the existing regime-switching models can not be applied to value options on several financial and non-financial regime-switching variables. Those options are complicated and require the development of a lattice approach, which is a discrete representation of a continuous process. Thus, one of the primary goals of this research is to develop a lattice approach that can be applied to value options on multiple underlying stochastic processes with multiple regimes. In this thesis, the existing lattice approach is extended in two major directions: lattice for a single stochastic process with multiple regimes, and lattice for multiple stochastic processes with multiple regimes. We then present three applications for the proposed lattices. The first application prices swing options under price uncertainty. The second application incorporates the product life cycle in valuing the flexibility of a manufacturing system that has three capacity options: expansion, contraction, and switching. The third application prices European and American rainbow options on correlated multiple regime-switching stochastic processes. We show that when compared with the Monte Carlo simulation, the proposed lattice for multiple stochastic processes with multiple regimes is computationally efficient and converged to the actual value of the options within a smaller number of steps.

Numerical Solution of Stochastic Differential Equations with Jumps in Finance
Numerical Solution of Stochastic Differential Equations with Jumps in Finance

Author: Eckhard Platen

Publisher: Springer Science & Business Media

Published: 2010-07-23

Total Pages: 868

ISBN-13: 364213694X

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In financial and actuarial modeling and other areas of application, stochastic differential equations with jumps have been employed to describe the dynamics of various state variables. The numerical solution of such equations is more complex than that of those only driven by Wiener processes, described in Kloeden & Platen: Numerical Solution of Stochastic Differential Equations (1992). The present monograph builds on the above-mentioned work and provides an introduction to stochastic differential equations with jumps, in both theory and application, emphasizing the numerical methods needed to solve such equations. It presents many new results on higher-order methods for scenario and Monte Carlo simulation, including implicit, predictor corrector, extrapolation, Markov chain and variance reduction methods, stressing the importance of their numerical stability. Furthermore, it includes chapters on exact simulation, estimation and filtering. Besides serving as a basic text on quantitative methods, it offers ready access to a large number of potential research problems in an area that is widely applicable and rapidly expanding. Finance is chosen as the area of application because much of the recent research on stochastic numerical methods has been driven by challenges in quantitative finance. Moreover, the volume introduces readers to the modern benchmark approach that provides a general framework for modeling in finance and insurance beyond the standard risk-neutral approach. It requires undergraduate background in mathematical or quantitative methods, is accessible to a broad readership, including those who are only seeking numerical recipes, and includes exercises that help the reader develop a deeper understanding of the underlying mathematics.

Stochastic Volatility Models for Contingent Claim Pricing and Hedging
Stochastic Volatility Models for Contingent Claim Pricing and Hedging

Author: Muzi Charles Manzini

Publisher:

Published: 2008

Total Pages: 136

ISBN-13:

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The present mini-thesis seeks to explore and investigate the mathematical theory and concepts that underpins the valuation of derivative securities, particularly European plainvanilla options. The main argument that we emphasise is that novel models of option pricing, as is suggested by Hull and White (1987) [1] and others, must account for the discrepancy observed on the implied volatility smile curve. To achieve this we also propose that market volatility be modeled as random or stochastic as opposed to certain standard option pricing models such as Black-Scholes, in which volatility is assumed to be constant.

A Reexamination of Lattice Procedures for Interest Rate-Contingent Claims
A Reexamination of Lattice Procedures for Interest Rate-Contingent Claims

Author: Yisong S. Tian

Publisher:

Published: 1998

Total Pages:

ISBN-13:

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This paper develops a general framework for the construction of simple (or path-independent) multinomial lattice approximations to single-state variable diffusion processes. It reexamines, within this general framework, three simple lattice procedures for the pricing of interest rate-contingent claims. These procedures include the Nelson and Ramaswamy (NR 1990) binomial model, the Tian (1992) simplified binomial (SB) model, and the Hull and White (HW 1990b) trinomial model. Particular attention is paid to the application of these procedures to the pricing of interest rate-contingent claims when the short-term interest rate follows the stochastic process developed by Cox, Ingersoll, and Ross (CIR 1985b). It is argued that the HW and the SB models do not always converge, while the NR model always does. The condition under which the HW and the SB models do converge is also examined. Finally, the numerical accuracy and computational efficiency of the three procedures are investigated through a simulation experiment. These procedures are implemented to value zero-coupon bonds and call options on zero-coupon bonds when the interest rate follows the CIR process. The results have clear implications for users of numerical procedures: When convergence is assured, the HW or SB model is preferred since these models are computationally more efficient than the NR model; otherwise, the NR model should be used. For the CIR process, empirically estimated parameters rarely violate the convergence condition; thus the convergence property of the HW and SB model is moot.

Computational Science and Its Applications – ICCSA 2023
Computational Science and Its Applications – ICCSA 2023

Author: Osvaldo Gervasi

Publisher: Springer Nature

Published: 2023-06-29

Total Pages: 819

ISBN-13: 3031368053

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The two-volume set LNCS 13956 and 13957 constitutes the refereed proceedings of the 23rd International Conference on Computational Science and Its Applications, ICCSA 2023, held at Lesvos Island, Greece, during July 3–6, 2023. The 67 full papers and 13 short papers and 6 PHD showcase papers included in this volume were carefully reviewed and selected from a total of 283 submissions. The contributions are grouped in topics which deal with General Track 1: Computational Methods, Algorithms and Scientific Applications; General Track 2: High Performance Computing and Networks; General Track 3: Geometric Modeling, Graphics and Visualization; General Track 4: Advanced and Emerging Applications; General Track 5: Information Systems and Technologies; General Track 6: Urban and Regional Planning; and PHD Showcase Papers.

Financial Econometrics, Mathematics and Statistics
Financial Econometrics, Mathematics and Statistics

Author: Cheng-Few Lee

Publisher: Springer

Published: 2019-06-03

Total Pages: 655

ISBN-13: 1493994298

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This rigorous textbook introduces graduate students to the principles of econometrics and statistics with a focus on methods and applications in financial research. Financial Econometrics, Mathematics, and Statistics introduces tools and methods important for both finance and accounting that assist with asset pricing, corporate finance, options and futures, and conducting financial accounting research. Divided into four parts, the text begins with topics related to regression and financial econometrics. Subsequent sections describe time-series analyses; the role of binomial, multi-nomial, and log normal distributions in option pricing models; and the application of statistics analyses to risk management. The real-world applications and problems offer students a unique insight into such topics as heteroskedasticity, regression, simultaneous equation models, panel data analysis, time series analysis, and generalized method of moments. Written by leading academics in the quantitative finance field, allows readers to implement the principles behind financial econometrics and statistics through real-world applications and problem sets. This textbook will appeal to a less-served market of upper-undergraduate and graduate students in finance, economics, and statistics. ​