Global ETD Search

1	Understanding approximate Bayesian computation(ABC) Lim, Boram 16 March 2015 (has links) The Bayesian approach has been developed in various areas and has come to be part of main stream statistical research. Markov Chain Monte Carlo (MCMC) methods have freed us from computational constraints for a wide class of models and several MCMC methods are now available for sampling from posterior distributions. However, when data is large and models are complex and the likelihood function is intractable we are limited in the use of MCMC, especially in evaluating likelihood function. As a solution to the problem, researchers have put forward approximate Bayesian computation (ABC), also known as a likelihood-free method. In this report I introduce the ABC algorithm and show implementation for a stochastic volatility model (SV). Even though there are alternative methods for analyzing SV models, such as particle filters and other MCMC methods, I show the ABC method with an SV model and compare it, based on the same data and the SV model, to an approach based on a mixture of normals and MCMC. / text ABC MCMC Stochastic volatility
2	Pricing equity derivatives under stochastic volatility : A partial differential equation approach Sheppard, Roelof 20 October 2008 (has links) NO ABSTRACT PRESENT ON CD. Pricing equity derivatives stochastic volatility
3	Option Pricing with Long Memory Stochastic Volatility Models Tong, Zhigang 06 November 2012 (has links) In this thesis, we propose two continuous time stochastic volatility models with long memory that generalize two existing models. More importantly, we provide analytical formulae that allow us to study option prices numerically, rather than by means of simulation. We are not aware about analytical results in continuous time long memory case. In both models, we allow for the non-zero correlation between the stochastic volatility and stock price processes. We numerically study the effects of long memory on the option prices. We show that the fractional integration parameter has the opposite effect to that of volatility of volatility parameter in short memory models. We also find that long memory models have the potential to accommodate the short term options and the decay of volatility skew better than the corresponding short memory stochastic volatility models. Long Memory Option Pricing Stochastic Volatility
4	A Preliminary View of Calculating Call Option Prices Utilizing Stochastic Volatility Models shen, karl 29 April 2009 (has links) We will begin with a review of key financial topics and outline many of the crucial ideas utilized in the latter half of the paper. Formal notation for important variables will also be established. Then, a derivation of the Black-Scholes equation will lead to a discussion of its shortcomings, and the introduction of stochastic volatility models. Chapter 2 will focus on a variation of the CIR Model using stock price in the volatility driving process, and its behavior to a greater degree. The key area of discussion will be to approximate a hedging function for European call option prices by Taylor Expansion. We will apply this estimation to real data, and analyze the behavior of the price correction. Then make conclusions about whether stock price has any positive effects on the model. Option Pricing Stochastic volatility CIR Model
5	Pricing variance swaps by using two methods : replication strategy and a stochastic volatility model Petkovic, Danijela January 2008 (has links) <p>In this paper we investigate pricing of variance swaps contracts. The</p><p>literature is mostly dedicated to the pricing using replication with</p><p>portfolio of vanilla options. In some papers the valuation with stochastic</p><p>volatility models is discussed as well. Stochastic volatility is becoming</p><p>more and more interesting to the investors. Therefore we decided to</p><p>perform valuation with the Heston stochastic volatility model, as well</p><p>as by using replication strategy.</p><p>The thesis was done at SunGard Front Arena, so for testing the replica-</p><p>tion strategy Front Arena software was used. For calibration and testing</p><p>of the Heston model we used MatLab.</p> Variance swaps Heston model Stochastic volatility
6	Pricing variance swaps by using two methods : replication strategy and a stochastic volatility model Petkovic, Danijela January 2008 (has links) In this paper we investigate pricing of variance swaps contracts. The literature is mostly dedicated to the pricing using replication with portfolio of vanilla options. In some papers the valuation with stochastic volatility models is discussed as well. Stochastic volatility is becoming more and more interesting to the investors. Therefore we decided to perform valuation with the Heston stochastic volatility model, as well as by using replication strategy. The thesis was done at SunGard Front Arena, so for testing the replica- tion strategy Front Arena software was used. For calibration and testing of the Heston model we used MatLab. Variance swaps Heston model Stochastic volatility
7	Option Pricing with Long Memory Stochastic Volatility Models Tong, Zhigang 06 November 2012 (has links) In this thesis, we propose two continuous time stochastic volatility models with long memory that generalize two existing models. More importantly, we provide analytical formulae that allow us to study option prices numerically, rather than by means of simulation. We are not aware about analytical results in continuous time long memory case. In both models, we allow for the non-zero correlation between the stochastic volatility and stock price processes. We numerically study the effects of long memory on the option prices. We show that the fractional integration parameter has the opposite effect to that of volatility of volatility parameter in short memory models. We also find that long memory models have the potential to accommodate the short term options and the decay of volatility skew better than the corresponding short memory stochastic volatility models. Long Memory Option Pricing Stochastic Volatility
8	Option Pricing under Stochastic Volatility for Levy Processes: An Empirical Analysis of TAIEX Index Options Chen, Ju-Ying 17 July 2010 (has links) none Levy Processes Fourier Transform Stochastic Volatility
9	Option Pricing with Long Memory Stochastic Volatility Models Tong, Zhigang January 2012 (has links) In this thesis, we propose two continuous time stochastic volatility models with long memory that generalize two existing models. More importantly, we provide analytical formulae that allow us to study option prices numerically, rather than by means of simulation. We are not aware about analytical results in continuous time long memory case. In both models, we allow for the non-zero correlation between the stochastic volatility and stock price processes. We numerically study the effects of long memory on the option prices. We show that the fractional integration parameter has the opposite effect to that of volatility of volatility parameter in short memory models. We also find that long memory models have the potential to accommodate the short term options and the decay of volatility skew better than the corresponding short memory stochastic volatility models. Long Memory Option Pricing Stochastic Volatility
10	Estimating Stochastic Volatility Using Particle Filters Chen, Huaizhi 03 August 2009 (has links) No description available. Finance Mathematics Stochastic Volatility Particle Filters

Search results