Stable limit theorems for Markov chains /

Kimbleton, Stephen Robert

January 1967

No description available.

Mathematics

Markov processes

Efficient sampling plans in a two-state Markov chain /

Bai, Do Sun

January 1971

No description available.

Statistics

Markov processes

The second gap of the Markoff spectrum of Q(i) /

Hansen, Henry Walter

January 1973

No description available.

Mathematics

Markov processes

Contributions to the theory of Markov chains /

Winkler, William E.

January 1973

No description available.

Mathematics

Markov processes

Markov chains and potentials.

Fraser, Ian Johnson.

January 1965

No description available.

Mathematics.

Markov processes.

Text classification using a hidden Markov model

Yi, Kwan, 1963-

January 2005

No description available.

Classification -- Automation

Markov processes.

A functional approach to obtaining weighted Markow-type inequalities

Carley, Holly K.

01 January 1999

No description available.

Markov processes

Mathematics

Decomposing Large Markov Chains for Statistical Usage Testing

Pandya, Chirag

01 January 2000

Finite-state, discrete-parameter Markov chains are used to provide a model of the population of software use to support statistical testing of software. Once a Markov chain usage model has been constructed, any number of statistically typical tests can be obtained from the model. Markov mathematics can be applied to obtain values, such as the long run probabilities, that provide information for test planning and analysis of test results. Because Markov chain usage models of industrial-sized systems are often very large, the time and memory required to compute the long run probabilities can be prohibitive. This thesis describes a procedure for automatically decomposing a large Markov chain model 'into several smaller models from which the original model's long run probabilities can be calculated. The procedure supports both parallel processing to reduce the elapsed time, and sequential processing to reduce memory requirements.

Markov processes

Computer Engineering

Convergence of some stochastic matrices

Wilcox, Chester Clinton.

January 1963

Call number: LD2668 .T4 1963 W66 / Master of Science

Matrices.

Markov processes.

Masters theses

Reinforcement learning applied to option pricing

Martin, K. S.

01 September 2014

A dissertation submitted to the Faculty of Science, University of the Witwatersrand, Johannesburg, in fulfilment of the requirements for the degree of Master of Science. Johannesburg, 2014. / This dissertation considers the pricing of European and American options. European option prices are determined by the market and can be veri ed by a closed-form solution to the Black-Scholes model. These options can only be exercised at the maturity date. American option prices are not derived from the market and cannot be priced using the same closed-form solution as in the case of the European options because American options can be exercised at any time on or before the maturity date. An initial method was investigated in pricing a European option but could not price American options. Improvements were made producing two robust option pricing models. The results of which were compared to the closed-form solution in the case of European options and a numerical approximation solution in the case of American options. The improved models showed two signi cant bene ts. The rst bene t is the ability to price both European and American options and the second is the ability to calibrate the models to market prices using market data. Changes to the parameters of the models showed the limitations of each improved model. In conclusion, the improved methods are e ective procedures for solving the European and American option pricing problem. Keywords: European options, American options, Markov Decision Processes, Kernel-Based Reinforcement Learning, Calibration.

Markov processes.

Calibration.

Kernel functions.