Impact Statement

In the context of climate change, the climate of ocean waves has major socioeconomic and environmental implications. Since ocean waves are generated by the wind blowing at the ocean surface, understanding the relationship between wind and waves is critical to assessing the impact of climate change on ocean waves. This work contributes to understanding the spatiotemporal relationship between wind conditions and ocean waves using deep learning. We propose a fully data-driven empirical wind-wave model that predicts the significant wave height at a location in the Bay of Biscay using the North Atlantic wind conditions. The proposed method is computationally inexpensive and can provide long time series of future significant wave heights or complete historical data if wind data are available.

2. Problem Statement and Related Work

The problem of improving the spatial resolution of climate variables is known under the name of downscaling (Maraun et al., Reference Maraun, Wetterhall, Ireson, Chandler, Kendon, Widmann, Brienen, Rust, Sauter, Themeßl and Venema2010). Downscaling approaches attempt to construct a link, either numerical or statistical, between large-scale and local-scale variables. The advantage of statistical downscaling (SD) over numerical models is primarily in terms of computational efficiency. A rigorous comparison of the two approaches can be found in Wang et al. (Reference Wang, Swail and Cox2010) and Laugel et al. (Reference Laugel, Menendez, Benoit, Mattarolo and Méndez2014).

In the case of ocean waves, wind (Obakrim et al., Reference Obakrim, Ailliot, Monbet and Raillard2022) or sea level pressure (SLP) (Camus et al., Reference Camus, Méndez, Losada, Menéndez, Espejo, Pérez, Rueda and Guanche2014) are commonly used to downscale ocean wave parameters. However, in order to establish a link function between the wind (or SLP) and the local ocean wave parameters, it is necessary to consider a large spatial and temporal coverage and, consequently, a large number of potential explanatory variables that are highly correlated. Some methods determine the wave generation area for any ocean location worldwide. For example, ESTELA (Pérez et al., Reference Pérez, Méndez, Menéndez and Losada2014) is a numerical model that uses spectral information to select the fraction of energy that travels to the target point from selected source points. The ESTELA method can be used to design SD methods. For instance, Camus et al. (Reference Camus, Méndez, Losada, Menéndez, Espejo, Pérez, Rueda and Guanche2014) and Hegermiller et al. (Reference Hegermiller, Antolinez, Rueda, Camus, Perez, Erikson, Barnard and Mendez2017) used the ESTELA method to define the predictors used in their SD model.

Obakrim et al. (Reference Obakrim, Ailliot, Monbet and Raillard2022) proposed a data-driven approach that determines the wave generation area by estimating the travel time of waves, generated in each considered sources point, that reach the target point. Then, the predictors were defined based on the wave generation area and finally, a SD model based on weather types was built.

As far as we know, the existing methods for SD of ocean wave parameters define a priori the spatiotemporal structure of the predictors, and then the SD model is built using these predictors. The aim of this study is to propose a deep learning approach that automatically learns the spatiotemporal relationship between wind and waves.

3. Data Preparation

The Climate Forecast System Reanalysis (CFSR) (Saha et al., Reference Saha, Moorthi, Pan, Wu, Wang, Nadiga, Tripp, Kistler, Woollen, Behringer and Liu2010) hourly wind data is considered in this study as a predictor. CFSR is a global reanalysis developed by the National Centers for Environmental Prediction (NCEP) that covers the period from 1979 to the present with an hourly time step and a spatial resolution of 0.5° by 0.5°. The historical $ {H}_s $ data is extracted from the hindcast database HOMERE (Boudière et al., Reference Boudière, Maisondieu, Ardhuin, Accensi, Pineau-Guillou and Lepesqueur2013) at the target location with spatial coordinates (45.2°N, 1.6°W) located in the Bay of Biscay. The temporal resolution of both wind and $ {H}_s $ data is up-scaled to 3-hourly data. The period from 1994 to 2016 is considered in this study, leading to a dataset with $ n=67,208 $ observations.

Instead of using both zonal and meridional components as a predictor, we use the projected wind (Obakrim et al., Reference Obakrim, Ailliot, Monbet and Raillard2022) defined, at each location $ j $ and time $ t $ , as

(1) $$ {W}_j(t)={U}_j(t)\hskip0.1em {\cos}^2\left(\frac{1}{2}\left({b}_j-{\theta}_j(t)\right)\right), $$

where $ {W}_j(t) $ is the projected wind, $ {U}_j(t) $ the wind speed, $ {\theta}_j(t) $ the wind direction and $ {b}_j $ is the great circle bearing from the source point $ j $ to the target point. Under the assumption that waves travel in great circle paths, grid points whose paths are blocked by land are neglected (Figure 1). Therefore, we define the global predictor at time $ t $ as

(2) $$ {X}^{(g)}(t)=\left({W}_1^2(t),\dots, {W}_p^2(t)\right), $$

where $ p=5,651 $ is total number of grid points.

Figure 1. The projected wind, defined in (1), in January 1, 1994, 00:00 hr. The black point represents the target point.

Following Obakrim et al. (Reference Obakrim, Ailliot, Monbet and Raillard2022), in order to capture the wind sea, we also define the local predictor as

(3) $$ {X}^{\left(\mathrm{\ell}\right)}(t)=\left\{U(t),{U}^2(t),{U}^3(t),{U}^2(t)F(t),U\left(t-1\right),{U}^2\left(t-1\right),{U}^3\left(t-1\right),{U}^2\left(t-1\right)F\left(t-1\right)\right\}, $$

where $ U(t) $ is the wind speed at the target point and $ F(t) $ is the fetch length at time $ t $ , calculated as the minimum of the distance from the target point to shore in the direction from which the wind is blowing and $ 500\;\mathrm{km} $ . The fetch has an important effect on wind sea characteristics (Ardhuin and Orfila, Reference Ardhuin and Orfila2018); therefore, it is commonly used to construct empirical wind wave models.

4. Proposed Methodology

As mentioned in the last section, state of the art statistical methods for downscaling wave parameters usually use a preprocessing step to create features that take into account the wave generation area. In this study, we propose a deep-learning approach that automatically extracts these features. Since waves may take several days to reach the target point, the history and current wind can be used to predict $ {H}_s $ . An example of this type of model could have the following form:

(4) $$ {H}_s(t)=f\left({X}^{(g)}\left(t-{t}_{\mathrm{max}}\right),\dots, {X}^{(g)}(t)\right), $$

where, $ {t}_{\mathrm{max}} $ can be interpreted as the maximum travel time of the waves and will be referred to as such in the following. However, this approach can be computationally challenging given the dimension of the predictor (5,651 in our case). Instead, in this study, we propose to use current wind conditions to estimate current and future $ {H}_s $ .

In order to describe the complex spatiotemporal relationship between wind and $ {H}_s $ , we propose the following two-stage model:

(5) $$ {\displaystyle \begin{array}{ll}\mathrm{First}\ \mathrm{stage}:\hskip0.3em & \left[{H}_s\left(t|{X}^{(g)}(t)\right),\dots, {H}_s\left(t+{t}_{\mathrm{max}}|{X}^{(g)}(t)\right)\right]=f\left({X}^{(g)}(t)\right)+\varepsilon (t),\hskip0.3em f:{\mathrm{\mathbb{R}}}^p\to {\mathrm{\mathbb{R}}}^{t_{\mathrm{max}}}\\ {}\mathrm{Second}\ \mathrm{stage}:\hskip0.3em & {H}_s(t)=g\left({X}^{(g)}(t),f\left({X}^{(g)}\left(t-{t}_{\mathrm{max}}\right)\right),\dots, \hskip0.2em f\left({X}^{(g)}(t)\right)\right)+\varepsilon^{\prime }(t),\hskip0.3em g:{\mathrm{\mathbb{R}}}^{t_{\mathrm{max}}\times {t}_{\mathrm{max}}+8}\to \mathrm{\mathbb{R}}\end{array}}, $$

where the notation $ {H}_s\left({t}_1|{X}^{(g)}\left({t}_2\right)\right) $ represents the contribution of wind conditions at time $ {t}_2 $ in $ {H}_s $ at time $ {t}_1 $ . $ \varepsilon $ and $ \varepsilon^{\prime } $ are the errors of the first stage and second stage, respectively. The first stage estimates the current and future $ {H}_s $ using current wind conditions. The second stage estimates $ {H}_s $ using the past predictions obtained from the first stage. Along with the local predictor $ {X}^{(g)} $ , the input for the second stage is a $ {t}_{\mathrm{max}}\times {t}_{\mathrm{max}} $ matrix of the form

(6) $$ \left(\begin{array}{ccc}{\hat{H}}_s\left(t-{t}_{\mathrm{max}}|{X}^{(g)}\left(t-{t}_{\mathrm{max}}\right)\right)& \dots & {\hat{H}}_s\left(t|{X}^{(g)}\left(t-{t}_{\mathrm{max}}\right)\right)\\ {}\vdots & \ddots & \vdots \\ {}{\hat{H}}_s\left(t|{X}^{(g)}(t)\right)& \dots & {\hat{H}}_s\left(t+{t}_{\mathrm{max}}|{X}^{(g)}(t)\right)\end{array}\right), $$

where $ {\hat{H}}_s\left({t}_1|{X}^{(g)}\left({t}_2\right)\right) $ represents the prediction, obtained from the first stage, of the contribution of wind conditions at time $ {t}_2 $ in the $ {H}_s $ at time $ {t}_1 $ . When $ {t}_1={t}_2 $ , this prediction represents the wind sea (first column of the matrix in equation (6)); for $ {t}_1>{t}_2 $ , on the other hand, the prediction represents the $ {H}_s $ caused by swells.

The general structure of the model is shown in Figure 2. The first stage consists of a series of 3 × 3 convolutions followed by the ReLU activation function, 2 × 2 max pooling layer, Batch Normalization, then a flatten followed by a dense layer. The second stage starts with an LSTM layer that learns the long-term dependencies of the $ \left(t-{t}_{\mathrm{max}},\dots, t\right) $ outputs of the first stage. The output of the LSTM layer is then concatenated with the local predictor $ {X}^l $ and fed into two fully connected layers. The dropout layer is used in both stages to prevent the network from overfitting. The loss function choosed in this study is the mean squared error (MSE) which is expressed as

(7) $$ {\displaystyle \begin{array}{l}\mathrm{MSE}\left(\mathrm{First}\ \mathrm{stage}\right)=\frac{1}{t_{\mathrm{max}}}\sum \limits_{i=0}^{t_{\mathrm{max}}}\frac{1}{n-{t}_{\mathrm{max}}-1}\sum \limits_{t=1}^{n-{t}_{\mathrm{max}}}{\left({H}_s\left(t+i\right)-{\hat{H}}_s\left(t+i|{X}^{(g)}(t)\right)\right)}^2,\\ {}\mathrm{MSE}\left(\mathrm{Second}\ \mathrm{stage}\right)=\frac{1}{n}\sum \limits_{t=1}^n{\left({H}_s(t)-{\hat{H}}_s(t)\right)}^2,\end{array}} $$

where $ n $ is the total number of observations and $ {\hat{H}}_s $ is the prediction of $ {H}_s $ . The Keras framework with Tensorflow backend (Chollet et al., Reference Chollet2015) is used in this work to train the model, on a Nvidia K80s GPU using the Adam optimizer (Kingma and Ba, Reference Kingma and Ba2017) and mini batches of 64.

Figure 2. Architecture of the two-stage model in equation (5).