Parameter Identification for a Stochastic Partial Differential Equation in the Nonstationary Case
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- TypeE-Books
- LanguageEnglish
- Total size5.6 MB
- Uploaded Byfreecoursewb
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- Last checkedJan. 27th '26
- Date uploadedJan. 26th '26
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Parameter Identification for a Stochastic Partial Differential Equation in the Nonstationary Case
https://WebToolTip.com
English | 2026 | ISBN: 3658503432 | 82 Pages | PDF EPUB (True) | 4.4 MB
This thesis investigates the mathematical problem of parameter identification in an equation arising from the study of how cells move on an embryo during its development. The motion of the cells can be modeled as particles evolving on a two-dimensional manifold according to a stochastic differential equation. The specific focus here is on estimating the drift parameter of this equation by observing the positions of a finite number of particles at different points in time. The general approach to approximate the solution of this ill-posed problem is to minimize a Tikhonov functional based on a regularized log-likelihood.
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