Main mathematical characteristics of payment functional
(2012) In Bulletin of the Lviv University, Series in Mechanics & Mathematics p.157-164- Abstract
- The aim of our work was to calculate basic mathematical characteristics of payment functional, such as mathematical expectation, variation and expected risk in discrete and continuous market models. In our paper we present a model of financial market in which the entire time interval in the continuous model is divided into steps with exponential distribution, and in the discrete model into steps of length 1. Using the appropriate ergodic theorems for continuous and discrete Markov chains we have found the mathematical expectation, variation and expected risk. The results have theoretical and practical application in verifying the accuracy of modeling prices of derivative securities in the economy and finance.
Please use this url to cite or link to this publication:
https://lup.lub.lu.se/record/8082855
- author
- Yeleiko, Yaroslav ; Lazariv, Taras and Mazur, Stepan LU
- publishing date
- 2012
- type
- Contribution to specialist publication or newspaper
- publication status
- published
- subject
- keywords
- stationary distribution, Markov chain, transition probabilities, option
- categories
- Popular Science
- in
- Bulletin of the Lviv University, Series in Mechanics & Mathematics
- issue
- 18
- pages
- 157 - 164
- publisher
- L'vivs'kyi Natsional'nyi Universytet imeni Ivana Franka. Mekhaniko-Matematychnyi Fakul'tet
- ISSN
- 2078-3744
- language
- Ukranian
- LU publication?
- no
- id
- 86934712-b917-48e5-ad08-7c13911ab8dd (old id 8082855)
- date added to LUP
- 2016-04-01 15:00:04
- date last changed
- 2022-06-21 12:47:07
@misc{86934712-b917-48e5-ad08-7c13911ab8dd, abstract = {{The aim of our work was to calculate basic mathematical characteristics of payment functional, such as mathematical expectation, variation and expected risk in discrete and continuous market models. In our paper we present a model of financial market in which the entire time interval in the continuous model is divided into steps with exponential distribution, and in the discrete model into steps of length 1. Using the appropriate ergodic theorems for continuous and discrete Markov chains we have found the mathematical expectation, variation and expected risk. The results have theoretical and practical application in verifying the accuracy of modeling prices of derivative securities in the economy and finance.}}, author = {{Yeleiko, Yaroslav and Lazariv, Taras and Mazur, Stepan}}, issn = {{2078-3744}}, keywords = {{stationary distribution; Markov chain; transition probabilities; option}}, language = {{ukr}}, number = {{18}}, pages = {{157--164}}, publisher = {{L'vivs'kyi Natsional'nyi Universytet imeni Ivana Franka. Mekhaniko-Matematychnyi Fakul'tet}}, series = {{Bulletin of the Lviv University, Series in Mechanics & Mathematics}}, title = {{Main mathematical characteristics of payment functional}}, year = {{2012}}, }