Spelling suggestions: "subject:"leva processes."" "subject:"ley processes.""
1 |
The Valuation of Participating Life Insurance Contracts under Levy ProcessesChen, Chih-Hsuan 26 June 2010 (has links)
none
|
2 |
Option Pricing under Stochastic Volatility for Levy Processes: An Empirical Analysis of TAIEX Index OptionsChen, Ju-Ying 17 July 2010 (has links)
none
|
3 |
Applications of Levy processes in finance.Essay, Ahmed Rashid. January 2009 (has links)
The option pricing theory set forth by Black and Scholes assumes that the
underlying asset can be modeled by Geometric Brownian motion, with the
Brownian motion being the driving force of uncertainty. Recent empirical
studies, Dotsis, Psychoyios & Skiadopolous (2007) [17], suggest that the
use of Brownian motion alone is insufficient in accurately describing the
evolution of the underlying asset. A more realistic description of the underlying
asset’s dynamics would be to include random jumps in addition to
that of the Brownian motion.
The concept of including jumps in the asset price model leads us naturally
to the concept of a L'evy process. L'evy processes serve as a building
block for stochastic processes that include jumps in addition to Brownian
motion. In this dissertation we first examine the structure and nature of an
arbitrary L'evy process. We then introduce the stochastic integral for L'evy
processes as well as the extended version of Itˆo’s lemma, we then identify
exponential L'evy processes that can serve as Radon-Nikod'ym derivatives
in defining new probability measures.
Equipped with our knowledge of L'evy processes we then implement
this process in a financial context with the L'evy process serving as driving
source of uncertainty in some stock price model. In particular we look
at jump-diffusion models such as Merton’s(1976) [37] jump-diffusion model
and the jump-diffusion model proposed by Kou and Wang (2004) [30]. As
the L'evy processes we consider have more than one source of randomness
we are faced with the difficulty of pricing options in an incomplete market.
The options that we shall consider shall be mainly European in nature,
where exercise can only occur at maturity. In addition to the vanilla calls
and puts we independently derive a closed form solution for an exchange
option under Merton’s jump-diffusion model making use of conditioning
arguments and stochastic integral representations. We also examine some
exotic options under the Kou and Wang model such as barrier options and
lookback options where the solution to the option price is derived in terms
of Laplace transforms. We then develop the Kou and Wang model to include
only positive jumps, under this revised model we compute the value of a
perpetual put option along with the optimal exercise point.
Keywords
Derivative pricing, L'evy processes, exchange options, stochastic integration. / Thesis (M.Sc.)-University of KwaZulu-Natal, Westville, 2009.
|
4 |
Unimodal Levy Processes on Bounded Lipschitz SetsArmstrong, Gavin 06 September 2018 (has links)
We give asymptotics near the boundary for the distribution of the first exit time of the isotropic alpha-stable Levy process on bounded Lipschitz sets in real euclidean space. These asymptotics bear some relation to the existence of limits in the Yaglom sense of alpha-stable processes. Our approach relies on the uniform integrability of the ratio of Green functions on bounded Lipschitz sets.
We use bounds for the heat remainder to give the first two terms in the small time asymptotic expansion of the trace of the heat kernel of unimodal Levy processes satisfying some weak scaling conditions on bounded Lipschitz domains.
|
5 |
Applications of meromorphic Levy processes on a stochastic gridKleinert, Florian Sebastian January 2015 (has links)
No description available.
|
6 |
Nonparametric estimation of Levy processes with a view towards mathematical financeFigueroa-Lopez, Jose Enrique 08 April 2004 (has links)
Model selection methods and nonparametric estimation of Levy densities are presented. The estimation relies on the properties of Levy processes for small time spans, on the nature of the jumps of the process, and on methods of estimation for spatial Poisson processes. Given a linear space S of possible Levy densities, an asymptotically unbiased estimator for the orthogonal projection of the Levy density onto S is found. It is proved that the expected standard error of the proposed estimator realizes the smallest possible distance between the true Levy density and the linear space S as the frequency of the data increases and as the sampling time period gets longer. Also, we develop data-driven methods to select a model among a collection of models. The method is designed to approximately realize the best trade-off between the error of estimation within the model and the distance between the model and the unknown Levy density. As a result of this approach and of concentration inequalities for Poisson functionals, we obtain Oracles inequalities that guarantee us to reach the best expected error (using projection estimators) up to a constant. Numerical results are presented for the case of histogram estimators and variance Gamma processes. To calibrate parametric models,a nonparametric estimation method with least-squares errors is studied. Comparison with maximum likelihood estimation is provided. On a separate problem, we review the theoretical properties of temepered stable processes, a class of processes with potential great use in Mathematical Finance.
|
7 |
American Monte Carlo option pricing under pure jump levy modelsWest, Lydia 03 1900 (has links)
Thesis (MSc)--Stellenbosch University, 2013. / ENGLISH ABSTRACT: We study Monte Carlo methods for pricing American options where the stock price dynamics follow
exponential pure jump L évy models. Only stock price dynamics for a single underlying are considered.
The thesis begins with a general introduction to American Monte Carlo methods. We then consider two
classes of these methods. The fi rst class involves regression - we briefly consider the regression method of
Tsitsiklis and Van Roy [2001] and analyse in detail the least squares Monte Carlo method of Longsta and
Schwartz [2001]. The variance reduction techniques of Rasmussen [2005] applicable to the least squares
Monte Carlo method, are also considered. The stochastic mesh method of Broadie and Glasserman [2004]
falls into the second class we study. Furthermore, we consider the dual method, independently studied
by Andersen and Broadie [2004], Rogers [2002] and Haugh and Kogan [March 2004] which generates a
high bias estimate from a stopping rule. The rules we consider are estimates of the boundary between the
continuation and exercise regions of the option. We analyse in detail how to obtain such an estimate in
the least squares Monte Carlo and stochastic mesh methods.
These models are implemented using both a pseudo-random number generator, and the preferred choice
of a quasi-random number generator with bridge sampling. As a base case, these methods are implemented
where the stock price process follows geometric Brownian motion.
However the focus of the thesis is to implement the Monte Carlo methods for two pure jump L évy
models, namely the variance gamma and the normal inverse Gaussian models. We first provide a broad
discussion on some of the properties of L évy processes, followed by a study of the variance gamma model
of Madan et al. [1998] and the normal inverse Gaussian model of Barndor -Nielsen [1995]. We also provide
an implementation of a variation of the calibration procedure of Cont and Tankov [2004b] for these models.
We conclude with an analysis of results obtained from pricing American options using these models. / AFRIKAANSE OPSOMMING: Ons bestudeer Monte Carlo metodes wat Amerikaanse opsies, waar die aandeleprys dinamika die patroon
van die eksponensiële suiwer sprong L évy modelle volg, prys. Ons neem slegs aandeleprys dinamika vir 'n
enkele aandeel in ag.
Die tesis begin met 'n algemene inleiding tot Amerikaanse Monte Carlo metodes. Daarna bestudeer
ons twee klasse metodes. Die eerste behels regressie - ons bestudeer die regressiemetode van Tsitsiklis
and Van Roy [2001] vlugtig en analiseer die least squares Monte Carlo metode van Longsta and Schwartz
[2001] in detail. Ons gee ook aandag aan die variansie reduksie tegnieke van Rasmussen [2005] wat van
toepassing is op die least squares Monte Carlo metodes. Die stochastic mesh metode van Broadie and
Glasserman [2004] val in die tweede klas wat ons onder oë neem. Ons sal ook aandag gee aan die dual
metode, wat 'n hoë bias skatting van 'n stop reël skep, en afsonderlik deur Andersen and Broadie [2004],
Rogers [2002] and Haugh and Kogan [March 2004] bestudeer is. Die reëls wat ons bestudeer is skattings
van die grense tussen die voortsettings- en oefenareas van die opsie. Ons analiseer in detail hoe om so 'n
benadering in die least squares Monte Carlo en stochastic mesh metodes te verkry.
Hierdie modelle word geï mplementeer deur beide die pseudo kansgetalgenerator en die verkose beste
quasi kansgetalgenerator met brug steekproefneming te gebruik. As 'n basisgeval word hierdie metodes
geï mplimenteer wanneer die aandeleprysproses 'n geometriese Browniese beweging volg.
Die fokus van die tesis is om die Monte Carlo metodes vir twee suiwer sprong L évy modelle, naamlik
die variance gamma en die normal inverse Gaussian modelle, te implimenteer. Eers bespreek ons in breë
trekke sommige van die eienskappe van L évy prossesse en vervolgens bestudeer ons die variance gamma
model soos in Madan et al. [1998] en die normal inverse Gaussian model soos in Barndor -Nielsen [1995].
Ons gee ook 'n implimentering van 'n variasie van die kalibreringsprosedure deur Cont and Tankov [2004b]
vir hierdie modelle. Ons sluit af met die resultate wat verkry is, deur Amerikaanse opsies met behulp van
hierdie modelle te prys.
|
8 |
Model risk for barrier options when priced under different lévy dynamicsMbakwe, Chidinma 12 1900 (has links)
Thesis (MSc)--Stellenbosch University, 2011. / ENGLISH ABSTRACT: Barrier options are options whose payoff depends on whether or not the underlying asset
price hits a certain level - the barrier - during the life of the option. Closed-form solutions
for the prices of these path-dependent options are available in the Black-Scholes
framework. It is well{known, however, that the Black-Scholes model does not price even
the so-called vanilla options correctly. There are a number of popular asset price models
based on exponential Lévy dynamics which are all able to capture the volatility smile, i.e.
reproduce market-observed prices of vanilla options.
This thesis investigates the potential model risk associated with the pricing of barrier
options in several exponential Lévy models. First, the Variance Gamma, Normal Inverse
Gaussian and CGMY models are calibrated to market-observed vanilla option prices. Barrier
option prices are then evaluated in these models using Monte Carlo methods. The
prices obtained are then compared to each other, as well as the Black-Scholes prices. It
is observed that the different exponential Lévy models yield barrier option prices which
are quite close to each other, though quite different from the Black-Scholes prices. This
suggests that the associated model risk is low. / AFRIKAANSE OPSOMMING: Versperring opsies is opsies met 'n afbetaling wat afhanklik is daarvan of die onderliggende
bateprys 'n bepaalde vlak - die versperring - bereik gedurende die lewe van die opsie,
of nie. Formules vir die pryse van sulke opsies is beskikbaar binne die Black-Scholes
raamwerk. Dit is egter welbekend dat die Black-Scholes model nie in staat is om selfs die
sogenaamde vanilla opsies se pryse korrek te bepaal nie. Daar bestaan 'n aantal populêre
bateprysmodelle gebaseer op eksponensiële Lévy-dinamika, wat almal in staat is om die
mark-waarneembare vanilla opsie pryse te herproduseer.
Hierdie tesis ondersoek die potensiële modelrisiko geassosieer met die prysbepaling van
versperring opsies in verskeie eksponseniële Lévy-modelle. Eers word die Variance
Gamma{, Normal Inverse Gaussian- en CGMY-modelle gekalibreer op mark-waarneembare
vanilla opsiepryse. Die pryse van versperring opsies in hierdie modelle word dan bepaal
deur middel van Monte Carlo metodes. Hierdie pryse word dan met mekaar vergelyk,
asook met die Black-Scholespryse. Dit word waargeneem dat die versperring opsiepryse in
die verskillende eksponensiële Lévymodelle redelik na aan mekaar is, maar redelik verskil
van die Black-Scholespryse. Dit suggereer dat die geassosieerde modelrisiko laag is.
|
9 |
Fourier methods for pricing early-exercise options under levy dynamicsFadina, Tolulope Rhoda 12 1900 (has links)
Thesis(MSc)--Stellenbosch University, 2012. / ENGLISH ABSTRACT: The pricing of plain vanilla options, including early exercise options, such as Bermudan
and American options, forms the basis for the calibration of financial models.
As such, it is important to be able to price these options quickly and accurately.
Empirical studies suggest that asset dynamics have jump components which can be
modelled by exponential Lévy processes. As such models often have characteristic
functions available in closed form, it is possible to use Fourier transform methods,
and particularly, the Fast Fourier Transform, to price such options efficiently. In
this dissertation we investigate and implement four such methods, dubbed the Carr-
Madan method, the convolution method, the COS method and the Fourier spacetime
stepping method. We begin by pricing European options using these Fourier
methods in the Black-Scholes, Variance Gamma and Normal Inverse Gaussian models.
Thereafter, we investigate the pricing of Bermudan and American options in
the Black-Scholes and Variance Gamma models. Throughout, we compare the four
Fourier pricing methods for accuracy and computational efficiency. / AFRIKAANSE OPSOMMING: Die prysbepaling van gewone vanilla opsies, insluitende opsies wat vroeg uitgeoefen
kan word, soos Bermuda-en Amerikaanse opsies, is grondliggend vir die kalibrering
van finansiële modelle. Dit is daarom belangrik dat die pryse van sulke opsies vinnig
en akkuraat bepaal kan word. Empiriese studies toon aan dat batebewegings
sprongkomponente besit, wat gemodelleer kan word met behulp van exponensiëele
Lévyprosesse. Aangesien hierdie modelle dikwels karakteristieke funksies het wat
beskikbaar is in geslote vorm, is dit moontlik om Fourier-transform metodes, en
in besonders die vinnige Fourier-transform, te gebruik om opsiepryse doeltreffend
te bepaal. In hierdie proefskrif ondersoek en implementeer ons vier sulke metodes,
genaamd die Carr-Madan metode, die konvolusiemetode, die COS-metode en die
Fourier ruimte-tydstap metode. Ons begin deur die pryse van Europese opsies
in die Black-Scholes, Gammavariansie (Engels: Variance gamma) en Normaal Invers
Gauss (Engels: Normal Inverse Gaussian)-modelle te bepaal met behulp van
die vier Fourier-metodes. Daarna ondersoek ons die prysbepaling van Bermuda-en
Amerikaanse opsies in die Black-Scholes en Gammavariansiemodelle. Deurlopend
vergelyk ons die vier Fourier-metodes vir akkuraatheid en berekeningsdoeltreffendheid.
|
10 |
Pricing models for inflation linked derivatives in an illiquid marketTakadong, Thibaut Zafack 15 September 2009 (has links)
Recent nancial crises have highlighted the sensitivity and vulnerability of nancial markets
to in
ation, which reduces the value of money and a ects the net returns of nancial instruments.
In response to this, investors who are concerned with maintaining their investment's
purchasing power rather than its market value are resorting to in
ation linked (IL) products
to hedge their in
ation risk. Consequently, the in
ation market has been rapidly growing for
the last decade and has further great potential growth worldwide. It is highly probable that
in
ation linked derivatives will eventually be as common as conventional products. Another
cause of the in
ation market boost is the growing extension of the time frame of nancial
transactions, which has generated an increase in in
ation expectation; since 1980 the average
time to maturity of long-dated transactions went from one decade to three decades.
This is, in part, due to the ageing population in the developed world. This research investigates
some alternative models in order to improve the match between model prices and
observed prices in the American and South African in
ation markets. It takes into account
the relative illiquidity of IL products. The main tools used are L evy distributions, macroeconomic
factors, no-arbitrage and pricing kernel models. L evy processes can replicate the
behaviour of the return innovations of a wide range of nancial securities. Adding a stochastic
time change to the L evy process randomises the market clock, thus generating stochastic
volatilities, higher stochastic return moments and eventually stochastic skewness. These are
observed stylised facts most conventional models do not achieve. Moreover, in contrast to
the hidden factor approach, each L evy process component and its stochastic time change
can readily be assigned an economic meaning. This explicit economic mapping facilitates
the interpretation of current models and provides a more intuitive approach to building
new models that capture other observed behaviours. Finally, L evy processes also provide
tractable formulas for derivative pricing and market estimations. In general, in
ation is a
consequence of macroeconomic factors. Exogenous dynamics of the most signi cant of these
factors are used to deduce the endogenous in
ation dynamics in some of the considered
models. In these cases, the calibration of the pricing kernel models requires little historical data on IL derivatives. In fact, the required macroeconomic historical data is easily available
because of the current national and international legislation.
|
Page generated in 0.0688 seconds