446 research outputs found
Fractional Black-Scholes equations and their robust numerical simulations
Philosophiae Doctor - PhDConventional partial differential equations under the classical Black-Scholes approach
have been extensively explored over the past few decades in solving option
pricing problems. However, the underlying Efficient Market Hypothesis (EMH) of
classical economic theory neglects the effects of memory in asset return series, though
memory has long been observed in a number financial data. With advancements in
computational methodologies, it has now become possible to model different real life
physical phenomenons using complex approaches such as, fractional differential equations
(FDEs). Fractional models are generalised models which based on literature have
been found appropriate for explaining memory effects observed in a number of financial
markets including the stock market. The use of fractional model has thus recently
taken over the context of academic literatures and debates on financial modelling. Fractional
models are usually of a non-linear and complex nature, which pose a considerable
amount of computational and theoretical difficulties in deriving their analytical solutions.
To the best of our knowledge, currently, there exist no tractable exact/analytical
solution methods for solving fractional Black-Scholes equations, and as such, numerical
solution methods become of a vital importance in understanding nature of solutions
to such models. This thesis therefore, serves to derive some Generalised (fractional)
Black-Scholes Partial Differential Equations (fBS-PDEs), as well as, propose their
respective tractable, efficient and robust numerical simulation methods
FIGURE 2 in Date and place of publication and author attribution of the combination Kalanchoe sect. Raveta (Crassulaceae subfam. Kalanchooideae)
FIGURE 2. Like most of the plant parts, the flowers of Kalanchoe thyrsiflora are covered in a white-waxy substance. Flowers are densely carried in club-shaped inflorescences. Photograph: Gideon F. Smith.Published as part of Smith, Gideon F., 2022, Date and place of publication and author attribution of the combination Kalanchoe sect. Raveta (Crassulaceae subfam. Kalanchooideae), pp. 131-134 in Phytotaxa 560 (1) on page 133, DOI: 10.11646/phytotaxa.560.1.12, http://zenodo.org/record/703115
FIGURE 1 in Date and place of publication and author attribution of the combination Kalanchoe sect. Raveta (Crassulaceae subfam. Kalanchooideae)
FIGURE 1. Kalanchoe thyrsiflora, the type of K. sect. Raveta, in the vegetative growing phase. The leaves are obovate to round and borne in pseudo-rosettes. Photograph: Gideon F. Smith.Published as part of Smith, Gideon F., 2022, Date and place of publication and author attribution of the combination Kalanchoe sect. Raveta (Crassulaceae subfam. Kalanchooideae), pp. 131-134 in Phytotaxa 560 (1) on page 132, DOI: 10.11646/phytotaxa.560.1.12, http://zenodo.org/record/703115
The Byzantine-Islamic transition in Palestine : an archaeological approach /
Using recent archaeological findings, Gideon Avni addresses the transformation of local societies in Palestine and Jordan between the 6th and 11th centuries AD, arguing that the Byzantine-Islamic transition was a much slower and gradual process than previously thought.Includes bibliographical references and index.Using recent archaeological findings, Gideon Avni addresses the transformation of local societies in Palestine and Jordan between the 6th and 11th centuries AD, arguing that the Byzantine-Islamic transition was a much slower and gradual process than previously thought.Description based on online resource; title from home page (viewed on March 14, 2014)
Optimal provisioning for deposit withdrawals and loan losses in the banking industry
Thesis (Ph.D. (Computer, Statistical and Mathematical Sciences))--North-West University, Potchefstroom Campus, 2008.With the acceptance of the new Basel II banking regulation (implemented in South Africa in January 2008) the search for improved ways of modeling the most important banking activities has become very topical. Since the notion of Levy-process was introduced, it has emerged as an important tool for modeling economic variables in a Basel II framework. In this study, we investigate the stochastic dynamics of banking items that are driven by such processes. In particular, we discuss bank provisioning for loan losses and deposit withdrawals.
The first type of provisioning is related to the earnings that the bank sets aside in order to cover loan defaults. In this case, we apply principles from robustness to a situation where the decision maker is a bank owner and the decision rule determines the optimal provisioning strategy for loan losses. In this regard, we formulate a dynamic banking loan loss model involving a provisioning portfolio consisting of provisions for expected losses and loan loss reserves for unexpected losses. Here, unexpected loan losses and provisioning for expected losses are modeled via a compound Poisson process and an exponential Levy process, respectively. We use historical evidence from OECD (Organization for Economic Corporation and Development) countries to support the fact that the provisions for loan losses-to-total assets ratio is negatively correlated with aggregate asset prices and the private credit-to-GDP ratio.
Secondly, we construct models for provisioning for deposit withdrawals. In particular, we build stochastic dynamic models which enable us to analyze the interplay between deposit withdrawals and the provisioning for these withdrawals via Treasuries and reserves. Further insight is gained by considering a numerical problem and a simulation of the trajectory of the stochastic dynamics of the sum of the Treasuries and reserves. Since managing the risk that depositors will exercise their withdrawal option is an important aspect of this thesis, we consider the idea of a hedging provisioning strategy for deposit withdrawals in an incomplete market setting. In this spirit, we discuss an optimal risk management problem for a commercial bank whose main activity is to obtain funds through deposits from the public and use the Treasuries and reserves to cater for the resulting withdrawals. Finally, we provide a brief analysis of some of the issues arising from the dynamic models of the banking items derived.Doctora
A Classification of Fuzzy Subgroups of Finite Abelian Groups
The knowledge of fuzzy sets and systems has become a considerable aspect to apply in various mathematical systems. In this paper, we apply a knowledge of fuzzy sets to group structures. We consider a fuzzy subgroups of finite abelian groups, denoted by G = Zpn +Zqm , where Z is an integer, p and q are distinct primes and m;n are natural numbers. The fuzzy subgroups are classified using the notion of equivalence classes. In essence the equivalence relations of fuzzy subsets X is extended to equivalence relations of fuzzy subgroups of a group G. We then use the notion of flags and keychains as tools to enumerate fuzzy subgroups of G. In this way, we characterized the properties of the fuzzy subgroups of G. Finally, we use maximal chains to construct a fuzzy subgroups-lattice diagram for these groups of G
A Classification of Fuzzy Subgroups of Finite Abelian Groups
The knowledge of fuzzy sets and systems has become a considerable aspect to apply in various mathematical systems. In this paper, we apply a knowledge of fuzzy sets to group structures. We consider a fuzzy subgroups of finite abelian groups, denoted by G = Zpn +Zqm , where Z is an integer, p and q are distinct primes and m;n are natural numbers. The fuzzy subgroups are classified using the notion of equivalence classes. In essence the equivalence relations of fuzzy subsets X is extended to equivalence relations of fuzzy subgroups of a group G. We then use the notion of flags and keychains as tools to enumerate fuzzy subgroups of G. In this way, we characterized the properties of the fuzzy subgroups of G. Finally, we use maximal chains to construct a fuzzy subgroups-lattice diagram for these groups of G
A Classification of Fuzzy Subgroups of Finite Abelian Groups
The knowledge of fuzzy sets and systems has become a considerable aspect to apply in various mathematical systems. In this paper, we apply a knowledge of fuzzy sets to group structures. We consider a fuzzy subgroups of finite abelian groups, denoted by G = Zpn +Zqm , where Z is an integer, p and q are distinct primes and m;n are natural numbers. The fuzzy subgroups are classified using the notion of equivalence classes. In essence the equivalence relations of fuzzy subsets X is extended to equivalence relations of fuzzy subgroups of a group G. We then use the notion of flags and keychains as tools to enumerate fuzzy subgroups of G. In this way, we characterized the properties of the fuzzy subgroups of G. Finally, we use maximal chains to construct a fuzzy subgroups-lattice diagram for these groups of G
It’s not cricket!
"An Author event presented by The Friends of the University of Adelaide Library, 19 April 2012, Ira Raymond Room, Barr Smith Library." Recorded at the University of Adelaide, 19 April 2012.Gideon Haig
A study of fuzzy sets and systems with applications to group theory and decision making
In this study we apply the knowledge of fuzzy sets to group structures and also to decision-making implications. We study fuzzy subgroups of finite abelian groups. We set G = Z[subscript p[superscript n]] + Z[subscript q[superscript m]]. The classification of fuzzy subgroups of G using equivalence classes is introduced. First, we present equivalence relations on fuzzy subsets of X, and then extend it to the study of equivalence relations of fuzzy subgroups of a group G. This is then followed by the notion of flags and keychains projected as tools for enumerating fuzzy subgroups of G. In addition to this, we use linear ordering of the lattice of subgroups to characterize the maximal chains of G. Then we narrow the gap between group theory and decision-making using relations. Finally, a theory of the decision-making process in a fuzzy environment leads to a fuzzy version of capital budgeting. We define the goal, constraints and decision and show how they conflict with each other using membership function implications. We establish sets of intervals for projecting decision boundaries in general. We use the knowledge of triangular fuzzy numbers which are restricted field of fuzzy logic to evaluate investment projections
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