5.1. Harmonic decomposition of total force

To decompose the free surface and force time histories into their linear and higher harmonics, we used the two-phase combination method (Fitzgerald et al. Reference Fitzgerald, Taylor, Eatock Taylor, Grice and Zang2014), which combines the crest-focused time series $F_{0^{\circ }}$ and the trough-focused time series $F_{180^{\circ }}$ to separate odd and even harmonics

(5.1) \begin{equation} \begin{aligned} \textrm {Odd harmonics} &=\frac {1}{2}(F_{0^{\circ }}-F_{180^{\circ }}) \\ \textrm {Even harmonics} &=\frac {1}{2}(F_{0^{\circ }}+F_{180^{\circ }}). \end{aligned} \end{equation}

Note that (5.1) defines the odd and even force harmonics, but the same formula applies for free surface. After applying (5.1), the first three harmonics were separated from other odd or even harmonics by digital filtering, where the frequency bands for each harmonic were estimated by Stokes wave theory (see appendix A of Walker et al. Reference Walker, Taylor and Eatock Taylor2004), and then manually adjusted to both maximise the spectral energy within the frequency band and minimise the spectral energy in adjacent harmonics. The resulting free surface and force harmonic time series are shown in figure 9. The odd and even terms of the first three harmonics are well separated in frequency, so we are confident that the two-phase combination method extracts the harmonics with good accuracy.

To independently analyse the effect of current on drag loads, the tested wave must be similar for all current speeds. We assessed this similarity by comparing free surface harmonic time series – see left panels of figure 9. The linear free surface is very similar for all current speeds. There are differences in higher free surface harmonics, which could be caused by the spatial and temporal differences in the position of the jacket or from experimental variability, but these differences are small (note the small vertical axis scales). The (2−) terms show a free surface set down as the focused wave group passes through, which is reasonably consistent with second-order wave theory (e.g. Dalzell Reference Dalzell1999). Overall, we conclude that the encountered wave forms are similar for all current speeds.

Figure 9. Harmonic time series of free surface recorded by the carriage-mounted wave probe (left panels) and total force (right panels). The mean drag force from current has been removed from the (2−) force (d) for clarity of comparison.

Forces (figure 9, see right panels) are highly nonlinear; while the amplitudes of higher free surface harmonics are collectively (i.e. (2−) + (2+) + (3+)) roughly 25 % of the linear free surface amplitude, higher harmonic force amplitudes are collectively up to 85 % of the linear force amplitude, hence emphasising their importance for jacket design. Linear forces show a small dependency with current, with the fastest positive current speed of 0.28 m s⁻¹ represented by the right hand having a notably higher peak force. Similar to the linear forces, the amplitudes of the (3+) forces have little variation with current, with only the higher negative current speeds having reduced amplitudes near the focused peak. In contrast to these odd harmonics, the amplitudes of the even (2−) and (2+) terms are highly dependent on current and are neatly sorted; the largest negative current speed gives the smallest amplitude and the largest positive current speed gives the largest amplitude. This general behaviour is predicted by the drag force harmonic expressions in table 2.

The force harmonics shown in figure 9 are the total force, so in a Morison-type force approximation the harmonics contain both drag and inertia force components. In this approximation, drag forces are symmetric about wave crests, while inertia forces are $90^{\circ }$ phase shifted ahead of wave crests and so are skew symmetric (positive first, then negative, wave by wave). The exception to this rule is the (2−) inertia force, which will also be close to skew symmetric but will be negative first, being mostly driven by the acceleration of the (2−) return flow beneath the wave group. The (2−) forces also vary on the time scale of the wave group envelope, not wave by wave. Applying these symmetry arguments to the force harmonics in figure 9, it can be seen that the (1), (2+) and (3+) forces are roughly symmetric about the free surface peak at $\tau =0$ , which suggests they are drag dominated. In contrast, the (2−) force is asymmetric; forces vary with the envelope of the wave group, but the forces measured well before the focused peak are larger than the forces the same time after. This asymmetric shape is opposite to the theoretical shape of the (2−) inertia term, which is negative before the focused peak and positive after. Logically, if this inertia term could be removed, the asymmetry would only increase in severity, suggesting that the (2−) force is also drag dominated. We assume the asymmetry is a drag-related fluid memory effect, where the viscous flow generated from past wave loading events persists over a period of time and affects the drag forces from future wave loads. Unfortunately, the (2−) forces measured after $\tau =0$ may be contaminated by an error wave (see figure 7(bii)), which may contribute to this asymmetry and explain why the peak of the (2−) force with zero current occurs slightly after the focused peak. As the effect from the error wave cannot be isolated, we cannot comment more on the presumed asymmetric drag behaviour, but note that it could be a topic of further study.

Although the measured forces appear to be mostly drag, inertia forces will still make a small contribution to the peak measured forces. To apply the wave-current blockage theory developed in § 2 (which only applies to drag forces), it is important to separate the drag and inertia forces. Next, we will attempt to separate these force components through a symmetry/skew-symmetry argument.

5.2. Harmonic decomposition of drag and inertia forces

Figure 10. Force harmonic time series of drag (left panels) and inertia (right panels). The labels of the (2−) forces are coloured red to indicate that we expect the drag/inertia separation method (5.2) to be less appropriate.

To separate drag and inertia force components, we used a method proposed by Santo et al. (Reference Santo, Taylor, Williamson and Choo2014), which relies on symmetry about wave crests and assumes that drag forces are in phase with crests and inertia forces are $90^{\circ }$ phase shifted (which is consistent with a Morison-based force approximation). The method combines the total force $F(t)$ and its time-reversed signal $F(-t)$ to give

(5.2) \begin{equation} \begin{aligned} \textrm {Drag} &=\frac {1}{2}\big (F(t)+F(-t)\big ) \\ \textrm {Inertia} &=\frac {1}{2}\big (F(t)-F(-t)\big ). \end{aligned} \end{equation}

This method assumes the free surface is symmetrical about $t=0$ , which is approximately true for both crest- and trough-focused wave groups – see figure 5. Nonlinear inertia contributions share the same skew-symmetric shape around the focused peak as linear inertia, so the drag/inertia separation method should hold for most higher force harmonics. The one important exception to this is the (2−) force, which may have some asymmetric drag loading and hence is not compatible with these symmetry arguments.

After applying the drag and inertia separation method, we then applied the same two-phase decomposition method (5.1) and subsequent digital filtering to isolate each drag and inertia force harmonic. The results are shown in figure 10. Although the ( $2-$ ) force separation may not be valid, we chose to show these results as they give a rough indication of the small contributions from inertia relative to drag. For the (1), (2+) and (3+) forces, the separation of drag and inertia terms appears to work well. As expected, the drag components are comparatively larger (peak first harmonic drag is $\sim 2 \, \times$ peak linear inertia), and they contain most of the effects from current.

Now that we have removed the inertia component from the measured force, we can apply the theory developed in § 2 to the isolated drag forces and hence estimate wave-current blockage effects. This is discussed in § 5.3.

5.2.1. A brief aside on the dependency of inertia forces with current

Although this paper is mostly concerned with the effects of current on drag forces, inertia forces are also affected. The linear inertia forces in figure 10(b) show that more positive currents generally give larger peak forces. To understand this dependency, we consider the complete inertia term for slender cylinders, including the convective derivative terms from the higher-order FNV model (Kristiansen & Faltinsen Reference Kristiansen and Faltinsen2017) that were initially ignored in the Morison equation (1.1). This complete inertia term is

(5.3) \begin{equation} \textrm {Inertia} = (\cdots ) \left (2\frac {\partial u}{\partial t}\, + \, u \frac {\partial u}{\partial x} \, + \, 2w \frac {\partial u}{\partial z}\right ), \end{equation}

where $(u,w)$ are the horizontal ( $x$ -direction) and vertical ( $z$ -direction) total fluid velocity. The total horizontal fluid velocity $u$ includes the fluid velocity from both waves and current, so $u=u_{w}+u_{cs}$ . The effect of current on inertia is two fold.

• • On the ${\partial u}/{\partial t}$ term: the Doppler-shift effect caused by the carriage moving at the undisturbed current speed $u_{c}$ acts to scale the measured time $t$ by $(1+u_{c}/c)$ . This also has the effect of linearly scaling the ${\partial u}/{\partial t}$ inertia term by the same factor.

• • On the convective derivative terms, $u {\partial u}/\partial{x} + 2w {\partial u}/\partial{z}$ : substituting $u=u_{w}+u_{cs}$ simplifies to $u_{cs} {\partial u_{w}}/\partial{x}$ , as $w {\partial u}/\partial{z}$ is unaffected by depth-uniform current and as the wave contributions of each term roughly cancel each other out (as shown by Taylor et al. (Reference Taylor, Tang, Adcock and Zang2024)). The resulting $u_{cs} {\partial u_{w}}/\partial{x}$ relates to the blocked current $u_{cs}$ and acts to decrease inertia forces with an increasingly positive current (as ${\partial u_{w}}/\partial{x}$ is proportional to $-{\partial u_{w}}/\partial{t}$ ).

To summarise, there is some effect of current on the inertia term linearly, but these effects are small (figure 10 b) so we did not analyse these further. Importantly, all inertia force components with current still have the same skew-symmetric shape around the focused peak, so the method of separating drag and inertia forces (5.2) remains valid.

Finally, we remark that the fully nonlinear inertia forces with zero current could be estimated using the Transformed-FNV model (Taylor et al. Reference Taylor, Tang, Adcock and Zang2024) which requires knowledge of only the linear free surface at the jacket. However, this model assumes the jacket occupies the entire water column, which ours does not, and it cannot (yet) explain the effects of current. Future work to extend the Transformed-FNV model to include current would be of value.

5.3. Estimating wave-current blockage effects in large waves

We now discuss the principal objective of this paper, to estimate the reduction in the blocked current $u_{cs}$ from the undisturbed current $u_{{c}}$ , at the point in time that corresponds to the peak force on the structure (i.e. at $t=\tau =0$ s). This is key for structural engineers looking to design or re-assess real jacket structures. Recall that the expressions for drag force harmonics given in table 2 show that the force with current is equal to a pure wave force term $\times$ a multiplier which depends on $u_{cs}$ . Hence, $u_{cs}$ can be estimated from accurate force measurements with and without current, and the extent to which $u_ {cs}$ is reduced from the undisturbed current speed indicates the magnitude of wave-current blockage effects. Importantly, the drag force harmonic expressions only apply to fluid loading regimes where $u_{cs}$ is small compared with the wave-driven fluid velocity $u_ {w}$ , so for extreme waves where $u_ {w}\gg u_{cs}$ for the majority of the water column. The tested focused wave groups give an extreme wave crest (or trough) at $\tau =0$ , hence the drag force harmonic expressions in table 4 (which have been adjusted from the expressions in table 2 to account for the jacket not reaching the tank floor) can be applied to the measured drag forces at this point in time.

Table 3. Estimates of the blocked current, $u_{cs}$ , using the peak measured (2+), (2−) and (1) drag forces in figure 10 (a,c,e) with the corresponding expressions in table 4. The average of these values are compared with an estimate for $u_{cs}$ using the simple current blockage model (4.1). Note that, although we give some of these estimates to three significant figures, we do not claim this level of accuracy, rather this is done to minimise rounding errors when calculating averages.

While the (1), (2−), (2+) and (3+) drag force measurements could all be used to estimate $u_{cs}$ , the (2+) measurements are arguably the most suitable given that they give good separation in peak forces with current. The (2−) measurements also give good force separation with current, but are complicated by drag asymmetry, possible error wave contamination and other factors like the second-order return flow under the focused wave group which have not been accounted for. Because odd force harmonics (1) and (3+) have smaller amplification from current, their peak forces are not as well separated for different currents, hence any errors in experimental variability and in the separation of drag and inertia forces would translate to larger errors in the estimates of $u_{cs}$ . Despite these difficulties, we chose to use (1), (2−) and (2+) drag forces, only discarding the (3+) measurements as the peak forces with positive currents are not well separated and would hence introduce unacceptably large errors. To estimate $u_{cs}$ for each undisturbed current speed, we substituted the measured peak drag forces into the expressions in table 4 and solved for $u_{cs}$ – the results are presented in table 3. The additional parameters of the wave frequency $\omega$ and wave amplitude $a$ (and hence the wavenumber $k$ and phase speed $c$ ), were estimated from the spectral peak period of the linear free surface with 0 m s⁻¹ current, giving $\omega =3.3$ rad s⁻¹ and $a=0.21$ m. It is important to note that the choice of wave period is somewhat arbitrary, and it could be argued that, as we are interpreting irregular waves with a regular wave model, choosing a wave period closer to the zero-upcrossing period $T_{z}$ is more appropriate than the peak period $T_{p}$ . If instead of using $T_{p}$ we used $0.9T_{p}$ (which is closer to $T_{z}$ ), the average $u_ {cs}$ estimates in table 3 increase by $\sim 20\, \%$ (i.e. from 0.11 m s⁻¹ to 0.13 m s⁻¹ for a 0.28 m s⁻¹ undisturbed current). So, while the estimates are sensitive to the choice of wave period, this sensitivity does not change the trend in results.

The estimates for $u_{cs}$ using the (2+), (2−) and (1) drag forces presented in table 3 are all considerably lower than both the undisturbed current speed and estimates using the industry-standard simple current blockage model (4.1). The estimates vary between drag force harmonics: (2+) give the lowest estimates that are consistently $\sim 20\, \%$ of the undisturbed current, (2−) give consistently higher estimates (but we believe the structure of these forces are more complex than our derived (2−) expression assumes) and (1) give estimates in between (2+) and (2−) but with more variability (presumably due to larger errors). Despite this variability, the important indication of new physics is that all estimates of $u_{cs}$ are considerably smaller than the undisturbed and the simple blocked current. These simple blocked current estimates were validated by Archer et al. (Reference Archer, Wolgamot, Orszaghova, Dai and Taylor2024b ) for the same jacket model in current-only tests (no waves). We therefore conclude that the extra reduction in the blocked current that we estimate from our experiments can only come from the addition of the large wave group. This demonstrates a strong wave-current blockage effect as large waves pass through the structure. It is perhaps surprising that this extra blockage occurs over relatively fast time scales associated with the compact wave group – see the last paragraph in § 5.4 for further discussion on this. We contrast this reduction in current speed to the wave kinematics – the recent measurements reported in Archer et al. (Reference Archer, Wolgamot, Orszaghova, Dai and Taylor2024b ) show that the wave kinematics are essentially undisturbed by the presence of the structure, i.e. are not blocked.

Figure 11. Measured () and reconstructed () drag force time histories for (a) crest-focused and (b) trough-focused wave groups with different undisturbed current speeds using the expressions in table 4 (valid for $u_{w} \gg u_{cs}$ ) together with the average $u_{cs}$ estimates from table 3.

To crudely estimate $u_{cs}$ for each current speed, the estimates using the (2+), (2−) and (1) drag forces were averaged – see table 3. These averaged estimates are all roughly $40\, \%$ of the undisturbed speed, and are approximately half of the simple blocked currents. In Appendix D, we estimate $u_{cs}$ using a different lighter-weight jacket (figure 15 a), formed by removing the array of 24 vertical conductors from the structure. This analysis indicates that even for a structure that is much less structurally dense, $u_{cs}$ is still substantially reduced, in this case to $\sim 50\, \%$ of the undisturbed current. To validate the appropriateness of averaging the $u_{cs}$ estimates from (2+), (2−) and (1) drag forces, we reconstructed the force time histories using these averaged estimates and compared them with measured drag forces. To reconstruct the drag forces, the wave-only drag force measurements (which provide the necessary phase information) are scaled by the [multiplier] expressions in table 4, substituting the averaged $u_{cs}$ estimates in table 3. The resulting forces, shown in figure 11, are in good agreement with one another at the peak crest/trough. The agreement between the reconstructed and measured drag forces gets worse for times either side of the focused peak, which is to be expected as the drag force harmonic expressions only apply around $\tau =0$ where wave velocities are much larger than current. Moreover, reconstructing the full force time history is a more difficult problem as the blocked current $u_{cs}$ , the wave amplitude $a$ , and to a lesser extent the wave frequency $\omega$ , all vary in time – this is discussed more in § 5.4. To match the vertical shift in forces, we had to add back in the mean force from current only (the force which was removed in figure 6 and which is described by simple current blockage). Although the expressions in table 4 are meant to describe the total drag force (and hence the current-only force should not need to be added at $\tau =0$ ), the expressions assume $u_{cs}$ is constant with depth, where in fact it increases with depth as $u_{w}$ decays. At depths where $u_{cs}$ is not small relative to $u_{w}$ the expressions are no longer valid, and the mean current-only force dominates. This effect is only significant for the largest $\pm 0.28$ m s⁻¹ currents (which represent an extreme 2.5 m s⁻¹ current at full scale). Despite these complexities, the good agreement between measured and reconstructed forces at the peak crest/trough indicates that averaging the $u_{cs}$ estimates from the (2+), (2−) and (1) drag forces is reasonable.

The good agreement between measured and reconstructed drag forces in figure 11 also shows that, despite the scatter in $u_{cs}$ estimates in table 3, our method captures the bulk physics of the problem. Coupled with the demonstrated accuracy of the method with Stokes’ fifth-order waves (Appendix B), this agreement shows that our method is valid for engineering analysis. Importantly, this claim of validity does not imply that the average $u_{cs}$ estimates in table 3 accurately capture the actual current speeds throughout a jacket structure – the actual flow structure is far more complex, varying significantly around each structural member and with depth. For engineering analysis of structural forces, however, resolving this actual flow structure is unnecessary. For this purpose, the fact that the $u_{cs}$ estimates give the correct force time histories when fed into a Morison force model demonstrates the validity of the method. To further substantiate this argument, we note that the results are in qualitative agreement with a parallel set of experiments in Archer et al. (Reference Archer, Wolgamot, Orszaghova, Dai and Taylor2024b ), which directly measured (using acoustic Doppler velocimeters) large reductions in current for combined wave and current tests. Unfortunately, the data in Archer et al. (Reference Archer, Wolgamot, Orszaghova, Dai and Taylor2024b ) cannot be directly compared with the results here, as the same focused wave groups were not tested (because the instrumentation and seeding did not permit acoustic Doppler velocimeter measurements in the large wave tests reported here), and the blocked current $u_{cs}$ was not measured (only the flow speeds up-wave and down-wave of the jacket). Nonetheless, as the results in this paper and in Archer et al. (Reference Archer, Wolgamot, Orszaghova, Dai and Taylor2024b ) demonstrate wave-current blockage effects using two entirely different approaches, based on measured forces and flow velocity respectively, it strongly suggests that these physical effects are real. Furthermore, the effects are of practical significance, as they translate to substantial reductions in peak force estimates (see figure 13 a), which should be considered in the design and re-assessment of offshore jackets.

To summarise, we have estimated that, for the tested jacket structure and wave condition, the blocked currents are roughly $40\, \%$ of the undisturbed speed at the point in time that corresponds to the peak force. While different jacket geometry and wave conditions will yield different reductions in current, our method to estimate this reduction may be generally valid for all jacket-type structures subjected to a current and high KC number oscillatory flows. In future work, we will expand this analysis to more test cases using computational fluid dynamics simulations, which will involve fully nonlinear three-dimensional wave kinematics and will represent jacket structures as porous blocks (as in Santo et al. Reference Santo, Taylor, Bai and Choo2015, Reference Santo, Taylor, Day, Nixon and Choo2018b ). These simulations will serve as further validation of the analytical model described in this paper, and give insight into the possibility of deriving a generalised adjustment factor that reduces the simple blocked current to account for the extra blockage effect from waves.

In this section, we have concentrated analysis on the point in time that corresponds to the peak force. While this is most important for structural design, from a fundamental viewpoint we also wanted to find a suitable form that can reconstruct the entire force time history. This is discussed next.

5.4. Estimating the time-varying effects of combined waves and blocked current

The blocked current $u_{cs}$ has been estimated at two regions, one at the focused wave peak at $\tau =0$ where it is the most reduced (which we now denote as $u_{full}$ ), and one far away from the focused peak where there are no waves and only current, for which it is given by the simple current blockage model (Taylor Reference Taylor1991) and is the least reduced (calculated with (4.1) and denoted $u_{scb}$ ). See table 3 for these estimates at each current speed. Between these two regions, $u_{cs}$ is unknown but we hypothesise that its variation in time may be related to the linear wave envelope, i.e.

(5.4) \begin{equation} u_ {cs}(\tau )=u_{scb}-(u_{scb}-u_{full}) \left (\frac {a(\tau )}{\textrm {max}(a(\tau ))}\right )^{p}, \end{equation}

where $a(\tau )=(\eta _{1}^2+\eta _{1H}^2)^{1/2}$ is the linear wave envelope where $\eta _{1}$ is the linear free surface and $\eta _{1H}$ its Hilbert transform (i.e. the harmonic conjugate of $\eta _{1}$ ), and $p$ is an adjustable parameter which dilates the wave envelope.

Figure 12. Reconstructed drag force time histories using a switching model, using the $u_{w}\gg u_{cs}$ expressions in table 4 when waves are big () and the $u_{w}\lt u_{cs}$ expression (5.5) when waves are small (). These two models are switched at the free surface zero-crossing near $\tau =3.5$ s either side of the focused peak. These reconstructed forces are compared with measured drag forces ().

For standard engineering force calculations where the full Morison form is used, the blocked current in the form of (5.4) (if valid) can be added to wave kinematics (which are estimated from another model, e.g. Stokes’ 5th (Fenton Reference Fenton1990)) to give the total local flow velocities and hence give the total force time history. However, for our analysis where we use the approximation of Morison drag (2.2) to decompose frequency harmonics, the total drag force time history cannot be captured as simply. This is because the drag force harmonic expressions in table 4 are only valid near $\tau =0$ around the centre of the large group, where wave kinematics are much larger than current (i.e. $u_{w} \gg u_{cs}$ ). Near the tails of the focused wave group where waves are much smaller (i.e. $u_{w}\lt u_{cs}$ ), Morison drag can be expanded as $\textrm {sgn}(u_{cs})\times (u_{w}^2+2u_{w}u_{cs}+u_{cs}^2 )$ , and different drag force harmonic expressions apply. These are derived in Appendix C using the same method as in § 2. As waves are small, only two terms in these new expressions are non-negligible, the linear wave $\times$ current term (C3) and the (2−) current $\times$ current term ((C5), giving $F_{\textrm {current only}}$ ). The other terms, (C1), (C2), (C4) and (C6), are neglected. The total drag force in this small wave regime can be approximated as

(5.5) \begin{equation} F=F_{\textrm {current only}}\left (1 + \frac {2 D_{E}}{\alpha h} \beta ^{2} \, \eta _{1} \left (\frac {u_{cs}}{c}\right )^{-1}\right ), \end{equation}

where $\beta = u_{cs}/u_{scb}$ is the ratio between the blocked current and the simple blocked current given by (4.1), $\alpha h$ is the depth of the jacket in our experiments, $D_{E}=1-\sinh {(kh(1-\alpha ))} / \sinh {(kh)}$ and $\eta _{1}$ is the linearised free surface.

We now have two drag force models, one that applies in regions where $u_{w}\gg u_{cs}$ , and one that applies where $u_{w}\lt u_{cs}$ . The force time histories can therefore be reconstructed with a switching model, using the $u_{w}\gg u_{cs}$ expressions where waves are big and using the $u_{w}\lt u_{cs}$ expressions where waves are small. Figure 12 compares measured drag forces with the reconstructed forces using the switching model. Only the fastest $\pm 0.28$ m s⁻¹ currents are shown as these give the largest scaling with current and hence are the most interesting test cases. These reconstructed forces are evaluated using the time-varying $u_{cs}$ profile described by (5.4), with $p=1$ giving the best fit to measured forces (which suggests that the variation in $u_{cs}$ matches the wave envelope). The other parameters $a$ , $\omega$ and $k$ are held constant in time, $a$ being the peak of the linear wave envelope, and $\omega$ and $k$ given by the peak wave frequency. The agreement between reconstructed and measured drag forces are very good at the peak wave crest/trough at $-0.5\lt \tau \lt 0.5$ , and are also good at $\tau \lt -3.5$ and $\tau \gt 3.5$ where waves are small compared with current. In between these regions (where we reconstruct the force assuming $u_{w}\gg u_{cs}$ ), the agreement is poorer, which is presumably because this region is transitional between $u_{w}\gg u_{cs}$ and $u_{w}\lt u_{cs}$ regimes and hence neither drag force model is valid. Analytical drag force expressions cannot be defined for these transitional regions. Despite this, the general behaviour is still captured well for the total drag force time histories. We again emphasise the good agreement at the large wave crest/trough at $\tau =0$ , which is of primary importance for structural design.

The good agreement between total force time histories supports the hypothesised time variation of $u_{cs}$ in (5.4), and fitting $p=1$ suggests that the variation in $u_{cs}$ matches the wave envelope. This empirical result poses the question of why, from a fundamental fluid mechanics perspective, the blocked current might vary with the wave envelope, and why this variation occurs on such fast time scales (associated with the compact wave group). To begin to answer this question, we recall the wave $\times$ current drag force term, $2|u_{w}|u_{cs}$ in (2.2), which is dominated by (2−) and (2+) frequency harmonic contributions. For the slowly varying (2−) term, $u_{w}$ scales with the wave envelope $a(\tau )$ , hence the dominant (2−) drag forcing is $\sim a(\tau )u_{cs}$ . This force on the structure, which (we assume) arises close to instantaneously on overall timescales because the KC number is always high, has an equal and opposite reaction force on the fluid in the upstream direction. This fluid force acts as a distributed force dipole and creates an upstream flow, which one may interpret as a local reduction in the incoming (downstream) current, hence leading to current blockage. This fluid force dipole, although arising from drag forces, has a global potential flow effect, so can be assumed to act instantaneously on the flow field (as all boundary effects do in potential flow problems). So, as the fluid force scales with the wave envelope, it follows that the blocked current $u_{cs}$ also instantaneously varies with the wave envelope, hence justifying the form of (5.4) with $p=1$ . Finally, note that although we only tested compact wave groups, if the variation in $u_{cs}$ given by (5.4) is generally applicable, the consequences for random wave fields are quite striking – the blocked current will be continuously more reduced (or more blocked) compared with the simple blocked current $u_{scb}$ .