| Title |
Limit theorems for random walk in a mixing random environment |
| Publication Type |
dissertation |
| School or College |
College of Science |
| Department |
Mathematics |
| Author |
Schoening, Anna |
| Date |
2012-08 |
| Description |
We consider a random walk on d+1 in a cone-mixing space-time random environment. We give a condition for a law of large numbers to hold. Furthermore, assuming an exponentially decreasing spatial-mixing condition, as well as an exponentially decreasing cone-mixing condition, an almost-sure quenched functional central limit theorem is proved by using a martingale approach. |
| Type |
Text |
| Publisher |
University of Utah |
| Subject |
Probability; Random walk in random environment |
| Dissertation Institution |
University of Utah |
| Dissertation Name |
Doctor of Philosophy |
| Language |
eng |
| Rights Management |
Copyright © Anna Schoening 2012 |
| Format |
application/pdf |
| Format Medium |
application/pdf |
| Format Extent |
1,095,440 bytes |
| Identifier |
etd3/id/3410 |
| ARK |
ark:/87278/s6hq776n |
| Setname |
ir_etd |
| ID |
196974 |
| Reference URL |
https://collections.lib.utah.edu/ark:/87278/s6hq776n |
