Abstract
The stochastic Lagrange wave model is a realistic alternative to the Gaussian linear wave model, which has been successfully used in ocean engineering for more than half a century. This paper presents the slope distributions and other characteristic distributions at level crossings
for asymmetric Lagrange time waves, i.e. what can be observed at a fixed measuring station, thereby extending results previously given for space waves. The distributions are given as expectations in a multivariate normal distribution, and they have to be evaluated by simulation or numerical integration. Interesting characteristic variables are: slope in time, slope in space, and vertical particle velocity when the waves are observed close to instances when the water level crosses a predetermined level.
The theory has been made possible by recent generalizations of
Rice's formula for the expected number of marked crossings in random
fields.
for asymmetric Lagrange time waves, i.e. what can be observed at a fixed measuring station, thereby extending results previously given for space waves. The distributions are given as expectations in a multivariate normal distribution, and they have to be evaluated by simulation or numerical integration. Interesting characteristic variables are: slope in time, slope in space, and vertical particle velocity when the waves are observed close to instances when the water level crosses a predetermined level.
The theory has been made possible by recent generalizations of
Rice's formula for the expected number of marked crossings in random
fields.
| Original language | English |
|---|---|
| Pages (from-to) | 489-508 |
| Journal | Advances in Applied Probability |
| Volume | 42 |
| Issue number | 2 |
| DOIs | |
| Publication status | Published - 2010 |
Subject classification (UKÄ)
- Probability Theory and Statistics
Free keywords
- Palm distribution
- Crossing theory
- Rice formula
- Slepian model
- wave steepness
- Gaussian process