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Validity of the wave stationarity assumption on estimates of wave attenuation in sea ice: toward a method for wave–ice attenuation observations at global scales

Published online by Cambridge University Press:  18 November 2022

Joey J. Voermans*
Affiliation:
Department of Infrastructure Engineering, University of Melbourne, Melbourne, Australia
Xingkun Xu
Affiliation:
Department of Infrastructure Engineering, University of Melbourne, Melbourne, Australia
Alexander V. Babanin
Affiliation:
Department of Infrastructure Engineering, University of Melbourne, Melbourne, Australia
*
Author for correspondence: Joey J. Voermans, E-mail: jvoermans@unimelb.edu.au
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Abstract

In situ observations of wave attenuation by sea ice are required to develop and validate wave–ice interaction parameterizations in coupled wave models. To estimate ice-induced wave attenuation in the field, the wave field is typically assumed to be stationary. In this study we investigate the validity of this assumption by creating a synthetic wave field in sea ice for different attenuation rates. We observe that errors in estimates of the wave attenuation rates are largest when attenuation rates are small or temporal averaging periods are short. Moreover, the adoption of the wave stationarity assumption can lead to negative estimates of the instantaneous wave attenuation rate. These apparent negative values should therefore not be attributed to wave growth or erroneous measurements a priori. Surprisingly, we observe that the validity of the wave stationarity assumption is irrelevant to the accuracy of estimates of wave attenuation rates as long as the temporal averaging period is taken sufficiently long. This may provide opportunities in using satellite-derived products to estimate wave attenuation rates in sea ice at global scales.

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This is an Open Access article, distributed under the terms of the Creative Commons Attribution licence (http://creativecommons.org/licenses/by/4.0/), which permits unrestricted re-use, distribution and reproduction, provided the original article is properly cited.
Copyright
Copyright © The Author(s), 2022. Published by Cambridge University Press on behalf of The International Glaciological Society

Introduction

Waves play a critical role in the coupled air-sea system and the mechanisms governing its dynamics thus require accurate representation in forecasting models. One of these dynamical impacts is the attenuation of wave energy by sea ice (Shen, Reference Shen2019; Squire, Reference Squire2020).

Many processes have been identified that contribute to the attenuation of wave energy in sea ice and are typically categorized as either a conservative, such as wave scattering (Kohout and Meylan, Reference Kohout and Meylan2008; Montiel and others, Reference Montiel, Squire and Bennetts2016), or non-conservative process, such as the dissipation of energy by ice-floe collisions (Herman and others, Reference Herman, Cheng and Shen2019; Rabault and others, Reference Rabault, Sutherland, Jensen, Christensen and Marchenko2019; Løken and others, Reference Løken, Ellevold, de la Torre, Rabault and Jensen2021), under-ice friction (Kohout and others, Reference Kohout, Meylan and Plew2011; Voermans and others, Reference Voermans, Babanin, Thomson, Smith and Shen2019), overwash (Nelli and others, Reference Nelli, Bennetts, Skene and Toffoli2020) and viscous properties of the sea ice (Weber, Reference Weber1987; Wang and Shen, Reference Wang and Shen2010). Some of these processes and derived models have been developed, tested and calibrated through carefully designed laboratory experiments (e.g. Toffoli and others, Reference Toffoli2015; Sree and others, Reference Sree, Law and Shen2018; Sutherland and others, Reference Sutherland, Rabault, Christensen and Jensen2019), and since implemented in operational wave forecasting models. However, a major concern is that most of these theories and models struggle to replicate observed attenuation trends from the field (Rogers and others, Reference Rogers, Meylan and Kohout2021). Thus, while there is theoretical and experimental support that each of these processes contribute to the attenuation of wave energy in sea ice, consensus is yet to be reached on the practical significance of each of these processes in the field and, importantly, under what environmental conditions these processes play a relevant role.

The most likely source of the discrepancy between theory and field observations is that sea ice is highly inhomogeneous (e.g. Shen, Reference Shen2019), dynamic and changes rapidly in time due to, for instance, sea-ice break-up (e.g. Voermans and others, Reference Voermans2020). These inhomogeneities are difficult to capture consistently, both theoretically and numerically, and are near impossible to be mimicked and thus study at laboratory scales, leaving unanswered questions regarding the significance of the theories and models in the framework of field conditions. However, a secondary but often forgotten potential source of discrepancy between models and field observations are the methodological uncertainties and biases that lead to (often unspecified) errors in the field observations. An example of such a bias is the spurious rollover phenomenon identified by Thomson and others (Reference Thomson, Hošeková, Meylan, Kohout and Kumar2021), who showed that instrument noise introduces a negative bias in observations of wave attenuation at high frequencies. Other uncertainties may be introduced through the adoption of assumptions in estimating wave attenuation in sea ice from field observations, including assumptions on the directional distribution of wave energy, wind-input and wave field stationarity. Most of these assumptions remain unverified, simply because they are difficult to verify. In this study, however, we will look at the influence of one of these assumptions on field observations of wave attenuation in sea ice: the wave stationarity assumption.

Wave stationarity assumption

It is common practice to approximate the decay of wave energy as an exponential function with distance into the sea ice (e.g. Wadhams and others, Reference Wadhams, Squire, Goodman, Cowan and Moore1988):

(1)$$E( f,\; x) = E( f,\; 0) \exp( \!-\!\alpha x) $$

where E(f,  x) is the spectral energy density, f is the wave frequency and x is the distance from the ice edge. The wave attenuation coefficient α is the traditional focus of wave–ice interaction studies, and a variety of parameterizations have been proposed (the reader is referred to Squire (Reference Squire2020) and Rogers and others (Reference Rogers, Meylan and Kohout2021) for an overview of the different parameterizations).

Following Eqn (1), estimating the wave attenuation rate in sea ice is, in principle, straightforward and is typically done by deploying two motion-sensing instruments (such as wave–ice buoys, e.g. Rabault and others, Reference Rabault2022) a distance x apart on the ice to measure E(f,  0) and E(f,  x):

(2)$$\alpha = {-\ln \left(E( f,\; x) /E( f,\; 0) \right)\over x}$$

Here, x may vary between tens of meters (such as for landfast ice, e.g. Sutherland and Rabault, Reference Sutherland and Rabault2016) up to as much as a hundred kilometers (Cheng and others, Reference Cheng2017).

As it takes time for wave energy to travel from the first to the second instrument, the wave energy at E(f,  x) needs to be measured, strictly speaking, somewhat later than at E(f,  0) to obtain α. However, given the complexities of performing in situ experiments on sea ice and the relatively short travel times to cover distance x (e.g. the energy of a 7 s period wave takes about half an hour to travel a distance of 10 km), general practice is to measure the surface elevation at both locations at the same time. That is, we assume the incoming wave energy over this time period to be approximately constant, i.e. stationary. By assuming wave field stationarity, an error of ΔE is made in our measurements of wave energy at x, specified by the time shift Δt = x/c g, where c g is the wave group velocity.

To understand the significance of this error ΔE on observations of α, consider the case where the waves approaching the sea ice are growing, such that the wave energy at the ice edge momentarily increases in time. By measuring the wave energy at x 1 = 0 and x 2 = x at the same time, where x > 0 is an arbitrary point, the wave energy E(f,  x) will be underestimated by:

(3)$$\Delta E \approx -{{\rm d}E( f) \over {\rm d}t}\Delta t = -{{\rm d}E( f) \over {\rm d}t}{x\over c_{\rm g}}$$

This then makes it appear as if more wave energy was attenuated by the ice over distance x, leading to an overestimation of α by:

(4)$$\Delta \alpha = {-\ln( {E}/{E_0}) \over x} + {\ln( ( {E + \Delta E}) /{E_0}) \over x}$$

While ΔE increases linearly with x (Eqn (3)), we note that, somewhat surprisingly, the error Δα is independent of x. This can be shown by taking the linear approximation of Δαt) around Δt = 0, giving:

(5)$$\Delta \alpha = -{{{\rm d}E}/{{\rm d}t}\over E c_{\rm g}}$$

While independent of x, it also suggests that the error Δα is frequency dependent and varies with the properties of the wave field (or wave climate).

In this study, we will investigate the impact of the wave field stationarity assumption on estimates of wave attenuation in sea ice. The aim is to inform on the errors and uncertainties associated with the stationarity assumption to improve the analysis of wave attenuation data in future measurement campaigns. To do so, we will rely largely on the validity of Eqn (1), which remains a topic of discussion to date (e.g. Squire, Reference Squire2018; Herman, Reference Herman2021). However, such a discussion is outside the scope of this study. In the process of evaluating the impact of the wave field stationarity assumption with very large Δt, we noticed a surprising result that may provide significant opportunities to derive estimates of wave attenuation by sea ice at large spatial scales using satellite-derived wave products.

Methods

Continuous observations of the wave field along a vast distance in the MIZ are required to asses the impact of the wave field stationarity assumption on estimates of wave attenuation. Because such an experimental field dataset is not available, we will generate a synthetic wave record instead. In doing so, we have to rely on the critical assumption that wave energy decays exponentially into the ice cover, i.e. Eqn (1) is deemed valid.

To characterize the incoming wave field E(f,  0) we used wave hindcast data from ERA5 reanalysis. An energetic site in the Southern Ocean was chosen (51$^\circ$ S latitude and 127$^\circ$ E longitude) for the duration of 1 year (January–December 2020) with a data time interval of 1 h. The significant wave height H s during this period varied between 2 and 10 m, with a median ~4 m. As the error Δα is independent of x (Eqn (5)), the results presented in this study do not rely on the severity of the incoming wave field E(f,  0) and any other site could have been chosen. We verified this through comparison with data covering a milder sea state with a median H s of 2.4 m (not shown here). We note that by considering a 1-D wave spectrum only, we are implicitly assuming that the wave field is unidirectional. Lastly, for the wave attenuation rate, we impose a wide range of α ∈ [10−7,  10−2], and do so for each wave frequency. We note that such values may be much larger or smaller than one may encounter for a given wave period in the field. As we predefine the values of α here, we refer to these as the ‘theoretical’ values with symbol α th.

With definitions for α th and the input wave energy E(f,  0), the wave field E(f,  x) can be determined using Eqn (2) by considering the duration of wave energy propagation over the distance x, i.e. the time series at x will appear shifted in time. For c g we use the open water dispersion relationship, which serves as a reasonable approximation of c g in most ice conditions (we briefly come back to this assumption later on). Then, a time series of α(f) can be determined from E(f,  x), and an estimate of α can be derived by taking the time averaged value $\overline {\alpha }$ over an averaging period τ. Initially, we keep Δt = x/c g as is common for field experiments. Then, we will examine the impact of Δt ≫ x/c g on estimates of α.

In addition to using ERA5 reanalysis data for the wave energy input, we have also examined in situ wave data from a wave buoy that was drifting in the Southern Ocean (Spotter, Sofar Ocean Technologies). The buoy drifted between 47$^\circ$ S and 49$^\circ$ S latitude and from 142$^\circ$ E to 159$^\circ$ E longitude over a period of ~2 months (28 April 2021–22 June 2021). The buoy measured a H s between 2 and 9 m, with a median of 4 m, and spectral information was transmitted every hour (comparable wave field statistics as the ERA5 dataset used here). As the outcomes of our study are broadly comparable for the ERA5 and wave buoy datasets, we will only show the results of the ERA5 reanalysis dataset here. Nevertheless, there are some differences due to the ERA5 reanalysis data being smoother at timescales of the order of hours compared to the wave buoy data. Such differences are expected to be a combination of noise in the wave buoy data and the inability of numerical models to solve for such short timescale variability. Specifically, the wave field may not be perfectly stationary over the 0.5–1 h period from which the spectral data are derived, a variability that may be measured by the wave buoys, but will not be simulated by the numerical models. It is this variability that causes Δα to be weakly dependent with x for the wave buoy observations. Readers interested in the impact of the wave stationarity assumption for the wave buoy data are referred to Figure S1, which compares the error in α for both datasets.

Results and discussion

An example time series of α is shown in Fig. 1 for a 7 s period wave with α th = 1 × 10−6 and α th = 1 × 10−4 with a measurement separation distance of x = 10 km. The estimated instantaneous attenuation rate α fluctuates around the theoretical value α th when the duration of wave propagation over distance x is not taken into consideration (i.e. Δt = x/c g). While the magnitude of the fluctuations for this wave condition are modest for the high α-case, they appear to be significant for the low α-case. Moreover, episodes of apparent negative attenuation rates can be retrieved when disregarding the lag in wave arrival time at the second measurement point (e.g. Fig. 1a). This may also, in part, explain the negative attenuation rates observed by Kodaira and others (Reference Kodaira2021) in grease ice who found large scatter of α ranging from positive to negative values for $T \gtrsim 5$ s. As the mean of the 2 week time series shown in Fig. 1 are close to the theoretical values (i.e. 2% for the example in Fig. 1a and <0.1% for the example in Fig. 1b), the removal of apparent negative values of the estimated attenuation rates may not be disregarded a priori and should be carefully considered when evaluating estimates of α. For example, if negative values of α in Fig. 1a would be considered erroneous and were to be removed, $\overline {\alpha }$ would be significantly overestimated by $\overline {\alpha }/\alpha _{\rm th}\approx 3.1$. We note, however, that the impact of apparent negative observations of α tends to be restricted to α th < 10−5 (see Fig. S2).

Fig. 1. Comparison of the estimated attenuation rate α when adopting the stationarity assumption (i.e. Δt = x/c g, solid line) against the theoretical attenuation rate α th (dashed line) for (a) α th = 1 × 10−6 and (b) α th = 1 × 10−4. For both cases, the wave period is T = 7 s and the measurement separation distance is 10  km.

In Fig. 2 the 95% confidence interval of the normalized error $( \overline {\alpha }-\alpha _{\rm th}) /\alpha _{\rm th}$ is shown for a wide range of α th, wave periods T, and for four different averaging periods τ. In color, several trends of α(T) are shown as derived from field observations by Hošeková and others (Reference Hošeková2020), Kodaira and others (Reference Kodaira2021), Li and others (Reference Li2017), Meylan and others (Reference Meylan, Bennetts and Kohout2014), Rogers and others (Reference Rogers, Meylan and Kohout2021), Thomson and others (Reference Thomson2018) and Voermans and others (Reference Voermans2021). We note that this is just a selection of in situ wave attenuation observations available, and are used to put the results into perspective of field observations of α. We also note that Rogers and others (Reference Rogers, Meylan and Kohout2021) produced two primary observational trends from their dataset (see their Fig. 8), both of which are shown here. Figure 2a shows the error for instantaneous observations of α with Δt = x/c g. Errors are largest for small α th, typically observed for longer waves and/or waves in unconsolidated sea ice. Instantaneous errors can be as large as a factor of 10 of their true value. Errors reduce significantly when the observations of α are averaged over longer periods of time. For example, for T = 10 s and α th = 1 × 10−5 the error reduces from 46, 21, 4 to 1%, for τ = 1 h, 1 d, 7 d to 28 d, respectively. However, although an increase in τ can greatly reduce uncertainties in $\overline {\alpha }$, this does require the ice conditions to remain constant over this measurement period. While the anticipated errors may be of significance for the low-frequency range in the observed trends of Rogers and others (Reference Rogers, Meylan and Kohout2021), it is noteworthy that the derivation of α by Rogers and others (Reference Rogers, Meylan and Kohout2021) is based on model-data inversion, and thus does not rely on the wave stationarity assumption.

Fig. 2. The 95% confidence interval of the error $( \overline {\alpha }-\alpha _{\rm th}) /\alpha _{\rm th}$ (contours) for averaging periods τ of (a) 1 h, (b) 1 d, (c) 7 d and (d) 28 d. Various field observations of α as a function of wave period T are shown in color.

As the open water dispersion relation may not be valid for very short waves and under certain ice conditions, such as consolidated sea ice, Figs 2a, b are replicated by using the dispersion relation in sea ice as derived by Squire and Allan (Reference Squire and Allan1980) (see Fig. S3). For this, a Young's modulus of 3 GPa and ice thickness of 0.5 m are taken as an example. The impact is largely constraint to the small wave periods which propagate faster in sea ice compared to open water, leading to a decrease in the observed error (e.g. Eqn (5)).

In Fig. 3a the distribution of the error (α − α th)/α th is shown. From this we can see indeed that the error will approach 0 when the averaging period increases as the mean of the distributions are 0. This also puts forward two competing actors on the magnitude of the error in α: increases in Δt increases the error, whereas increases in τ reduces it. We now consider the case where two instruments deployed on the ice do not measure at the same time but with a time offset t 0, i.e. Δt = x/c g + t 0. As the autocorrelation timescale of the wave energy reaches 0 at ~5–7 d for the dataset used here (not shown), the observed error increases with an increase of t 0 up to t 0 ≈5–7 d after which the error remains approximately constant. At this time offset, the distribution of the error seems to have approached a normal distribution with its mean at 0 (Fig. 3b). This would imply that the accuracy of α for very large Δt ≈ t 0 ≫ 0 is then simply determined by the duration of τ (or the number of random samples) necessary to achieve the required accuracy.

Fig. 3. Normalized probability density function of the error α, normalized by its standard deviation σ, for T = 7.0 s (circles), 8.4 s (triangles), 10.2 s (squares), 12.3 s (crosses) and 14.9 s (diamonds). Blue line is the best fit normal distribution, dash lines correspond to the mean of the data distributions.

In Fig. 4 the 95% confidence interval of the error $( \overline {\alpha }-\alpha _{\rm th}) /\alpha _{\rm th}$ is shown for various time offsets t 0 and averaging periods τ. As the autocorrelation timescale is ~7 d, increasing t 0 further does not considerably change the error. We note that introducing the time offset t 0 means that the error Δα is now dependent on x. Comparing Figs 2 and 4, the error made for instantaneous estimates of α when t 0 = 0 (Fig. 2a) is similar in magnitude as measuring α over a period of 1 d with an offset of t 0 = 1 h (Fig. 4a), or an averaging period of τ = 4 weeks with a time offset of t 0 = 1 d (Fig. 4e). While it may seem unusual from a design perspective of in situ experiments to introduce a time offset in estimating α, it may, however, provide major opportunities in deriving observations of wave attenuation rates in sea ice using satellite observations (Stopa and others, Reference Stopa, Ardhuin and Girard-Ardhuin2016; Horvat and others, Reference Horvat, Blanchard-Wrigglesworth and Petty2020; Brouwer and others, Reference Brouwer2022) as satellite observations have a high spatial resolution but often a poor temporal resolution. If possible, this may then provide access to wave attenuation observations at a global reach, rather than local as with in situ experiments.

Fig. 4. The 95% confidence interval of the error $( \overline {\alpha }-\alpha _{\rm th}) /\alpha _{\rm th}$ (contours) for various averaging periods τ and time offset between instrument measurements t 0. Contour colors refer to the instrument separation distance x of 5, 10 and 30 km (black to light gray, respectively), with x = 5 km always being the largest error. Various field observations of α as a function of wave period T are shown in color, see Fig. 2 for legend.

The underlying problem of estimating α based on large t 0 is that it requires ice conditions to be similar in both temporal and spatial domains at the instants at which the observations are obtained, which may significantly hinder the feasibility of such an approach. Nevertheless, to provide further insight into how the ice conditions may be treated numerically in the spatial domain in such a scenario, we look at an idealized case where sea-ice conditions are spatially inhomogeneous. For this we consider the case where α th increases/decreases exponentially with distance x. By taking the simple case where Δt = 0, we infer that a simple spatial average of α between x = 0 and x = x is a good approximation of the effective wave attenuation coefficient at x, with an error of <5% (we will refer to this spatial average value of α as 〈α〉). The impact of the spatial heterogeneity of sea ice on the error of 〈α〉 due to the assumption of wave stationarity is shown in Fig. 5, with the attenuation rate profiles shown in Figs 5a, d. We note that in our calculations x is now variable such that, in the example of x = 100 km and the attenuation profile given by Fig. 5a, α th is 1 × 10−6 at x = 0 and 3.2 × 10−5 at x = 100 km, which leads to a spatially averaged attenuation rate of 〈α〉 = 9 × 10−6. In line with earlier observations that the error is largest in cases of low α th (e.g. see Fig. 2), we observe here that the errors are initially large for an exponentially increasing attenuation rate profile (Fig. 5b). However, such errors rapidly decrease when larger averaging periods are taken (see Fig. 5c where τ = 7 d). Reversal of the attenuation rate profile leads to considerably larger values of 〈α〉 and, consequently, shows that errors due to the adoption of the wave stationarity assumption are relatively small even for averaging periods of just 1 d (Fig. 5e). In Fig. 6 the same cases are considered, but now with a time offset of t 0 = 7 d. While the errors increase as one may expect, reasonable estimates of 〈α〉 can still be obtained as long as 〈α〉 is sufficiently large. This has useful implications for our modeling methods of waves in sea ice as the effective attenuation rate across an inhomogeneous ice cover can be approximated as spatial average of the local attenuation rate profile (and thus perhaps as the spatially weighted average of the ice types and ice features within such a domain), and the zero time offset t 0 = 0 is not necessarily a constraint to obtain reasonable estimates of 〈α〉. Care should nevertheless be taken in applying such a simplified approach, as our understanding of wave attenuation and its relation to ice conditions remains very limited.

Fig. 5. The 95% confidence interval of the error $( \overline {\alpha }-\left \langle \alpha \right \rangle ) /\left \langle \alpha \right \rangle$ for two spatially heterogeneous ice covers and t 0 = 0. The imposed spatial attenuation profiles are shown in (a) and (d), solid line, leading to errors in α as shown in (b, c) and (e, f) respectively, for different values of τ. The spatially averaged attenuation profile 〈α〉, which is the cumulative effect of the local profile of α th, is given in (a) and (d) by the dashed line.

Fig. 6. Same as Fig. 5, but with t 0 = 7 d.

While this study can be used to inform past and future measurement campaigns on the errors and uncertainties in α associated with the stationarity assumption, we note that further research is required on the limitations of our analysis, and other potential methodological biases in estimating α from field observations. In particular, further study is required on the validity of Eqn (1) (e.g. Squire, Reference Squire2018), as there is growing support α has a dependency on the local wave energy (Toffoli and others, Reference Toffoli2015; Herman, Reference Herman2021; Voermans and others, Reference Voermans2021). Other assumptions typically adopted in the estimation of α are related to the directionality of the wave energy (e.g. Montiel and others, Reference Montiel, Kohout and Roach2022), importance of wind-input, and non-linear wave–wave interactions. Lastly, we would like to point out that there are ways to avoid the adoption of the wave stationarity assumption altogether, such as by using model-data inversion (Rogers and others, Reference Rogers, Meylan and Kohout2021). Additionally, carefully designed field experiments could, in principle, take into consideration the propagation time of wave energy when estimating α. This can be the case when continuous time series of surface elevation are obtained (e.g. Sutherland and Rabault, Reference Sutherland and Rabault2016). However, this is, of course, far from straightforward task in the harsh and remote environments of the polar regions.

Concluding remarks

In this study the impact of the wave stationarity assumption on estimates of ice-induced wave energy attenuation is quantified. When wave attenuation rates are low, the apparent wave attenuation may become negative when the travel time of wave energy is not considered, and should thus not be interpreted a priori as erroneous data or wave growth. We observe that the wave stationarity assumption holds as long as the temporal averaging period is sufficiently long. The averaging period required to obtain accurate estimates of wave attenuation in the field increases with a decrease in the wave attenuation rate. Thus, for waves in unconsolidated sea ice, longer averaging periods are required in comparison with waves in consolidated or landfast ice. Surprisingly, even when wave conditions between two measurement points are measured as much as weeks apart, and thus the measured wave energy between the measurement points have become uncorrelated, good estimates of the wave attenuation coefficient can still be obtained provided that the averaging period of the measurements is sufficiently long. This provides significant opportunities in using satellite products with limited temporal resolution to estimate the wave attenuation rate at global scales. This thus may solve for one of the current problems in the field, namely, that observations of wave attenuation in sea ice are very limited and geographically sparse. Care should, however, be given in the way samples are averaged using this approach, as the overall ice conditions are required to remain constant across such measurement events. Such an approach may, however, still be feasible due to the vast amount of satellite observations currently available. Lastly, we observe that the spatial average of the attenuation rate of an inhomogeneous ice cover represents a good approximation of the effective wave attenuation rate, which may provide directions for the treatment of large scale sea-ice inhomogeneities in wave forecasting models and derivation of empirical ice classifications from satellite-derived sea-ice products.

Supplementary material

The supplementary material for this article can be found at https://doi.org/10.1017/jog.2022.99.

Acknowledgements

We acknowledge Sofar Ocean Technologies for the wave buoy deployment and providing wave buoy data, and the Copernicus Climate Change Service at ECMWF for making the ERA5 reanalysis data available. JJV and AVB acknowledge support from the Australian Antarctic Program under project 4593. AVB acknowledges support from the US Office of Naval Research (grant N62909-20-1-2080). The authors thank the two anonymous reviewers for their comments and suggestions which significantly improved this manuscript.

Author contributions

JJV: conceptualization, methodology, analysis, writing – original draft. XX: methodology, analysis, writing – review and editing. AVB: supervision, writing – review and editing.

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Figure 0

Fig. 1. Comparison of the estimated attenuation rate α when adopting the stationarity assumption (i.e. Δt = x/cg, solid line) against the theoretical attenuation rate αth (dashed line) for (a) αth = 1 × 10−6 and (b) αth = 1 × 10−4. For both cases, the wave period is T = 7 s and the measurement separation distance is 10  km.

Figure 1

Fig. 2. The 95% confidence interval of the error $( \overline {\alpha }-\alpha _{\rm th}) /\alpha _{\rm th}$ (contours) for averaging periods τ of (a) 1 h, (b) 1 d, (c) 7 d and (d) 28 d. Various field observations of α as a function of wave period T are shown in color.

Figure 2

Fig. 3. Normalized probability density function of the error α, normalized by its standard deviation σ, for T = 7.0 s (circles), 8.4 s (triangles), 10.2 s (squares), 12.3 s (crosses) and 14.9 s (diamonds). Blue line is the best fit normal distribution, dash lines correspond to the mean of the data distributions.

Figure 3

Fig. 4. The 95% confidence interval of the error $( \overline {\alpha }-\alpha _{\rm th}) /\alpha _{\rm th}$ (contours) for various averaging periods τ and time offset between instrument measurements t0. Contour colors refer to the instrument separation distance x of 5, 10 and 30 km (black to light gray, respectively), with x = 5 km always being the largest error. Various field observations of α as a function of wave period T are shown in color, see Fig. 2 for legend.

Figure 4

Fig. 5. The 95% confidence interval of the error $( \overline {\alpha }-\left \langle \alpha \right \rangle ) /\left \langle \alpha \right \rangle$ for two spatially heterogeneous ice covers and t0 = 0. The imposed spatial attenuation profiles are shown in (a) and (d), solid line, leading to errors in α as shown in (b, c) and (e, f) respectively, for different values of τ. The spatially averaged attenuation profile 〈α〉, which is the cumulative effect of the local profile of αth, is given in (a) and (d) by the dashed line.

Figure 5

Fig. 6. Same as Fig. 5, but with t0 = 7 d.

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