For the study, we use a domain about 60 km wide, i.e., of typical climate model grid box dimensions, containing a homogeneous idealized parallelepiped cloud whose top is located at 11 km of altitude (as in ; ). Figure  illustrates the cloud and its position relative to the Sun. Its width is denoted w and height h. The cross-section of the cloud is rectangular, differing from previous studies which used an ellipsoidal cloud (). However, this choice does not affect the relevance of the results, as will be demonstrated in Sect. .

To cover a wide range of cloud properties representative of contrails and cirrus , calculations are performed for various cloud widths (w) and heights (h), as well as a number of cloud optical depths τc, listed in Table . Clouds of different height share a common cloud-top altitude at 11 km to keep cloud-top temperature constant through all configurations. To remain in a realistic range of contrail and cirrus geometries, the cloud cannot be thicker than it is wide; i.e., we must have w⩾h.

The radiative transfer calculations were done with htrdr, a 3D Monte Carlo radiative transfer code whose efficiency is enhanced by the use of hierarchical grids and null collision algorithms . The code takes as inputs a 3D field of cloud water concentration with associated optical properties.

The ice crystal optical properties required by htrdr are the absorption and scattering cross-sections and the asymmetry parameter g of the Henyey–Greenstein phase function, which is the phase function implemented in the code. The optical properties of individual particles are taken from and . These properties are integrated over a particle size distribution provided by , which depends on the cloud ice water content (IWC) and temperature (T). The result is a look-up table (LUT) describing the bulk ice optical properties as a function of in-cloud IWC and T (Laurent Labonnote, personal communication). Absorption and scattering coefficients are discretized over 274 wavelengths between 0.2 and 2.99 µm in the shortwave (SW) spectral domain and 171 wavelengths between 3 and 99 µm in the longwave (LW). For our study, we considered a single shape to represent the cloud microphysics, the hexagonal column, as in and . The effective radius of the ice particles is 53 µm. As our focus is exploring the sensitivity of the radiative effect of clouds to their geometric properties, optical properties of ice crystals are assumed to be constant within the cloud and calculated with an ice water content of 1×10-5 kg m⁻³ and a temperature of 227.5 K, which are in the range of values considered in the previous section. Therefore, all cloud configurations studied in this paper share identical optical properties of ice crystals.

For the atmosphere, a standard midlatitude summer profile is used for temperature, pressure, and water vapor. The surface is perfectly absorbing, and its albedo is 0 in both the longwave and shortwave domains.

The cloud radiative effect (CRE) is calculated as the difference in net fluxes at the tropopause (13 km) between clear-sky and all-sky conditions: 1CREnet=CRELW+CRESW=(Fclear-Fall-sky)LW+(Fclear-Fall-sky)SW, with F the upwelling flux at 13 km. A positive CRE indicates a cloud warming the troposphere and surface. Four independent runs are necessary to calculate the four terms in Eq. () (clear sky and all sky in both SW and LW spectral domains).

The Monte Carlo radiative transfer code htrdr evaluates the intensity of radiation reaching every pixel of a rectangular virtual sensor by tracing paths of a large number of photons within each pixel. With the Monte Carlo method, the random error in the radiative flux rendered by the code reduces proportionally with the square root of the sampled number of photons. In order to reach sufficiently low relative errors, typically 10⁹ photons are sampled to calculate fluxes in this study. The resulting errors are usually below 1 % for calculation of CREs, except in cases where the net CRE or 3D effects are very close to zero (e.g., 10⁻¹ W m⁻²), yielding relatively large errors.

As the study focuses on the impact of the horizontal transport of radiation, particular attention is needed to take it into account in radiative transfer calculations. Since fluxes are reported far above cloud top (at 13 km), the size of the domain on which radiative transfer is solved (i.e., the sensor) needs to be larger than the cloud (in the x direction) to ensure all radiative effects near cloud sides are accounted for. For the Sun at zenith, fluxes are retrieved over a domain with a width of more than 60 km. For large zenith angles, two vertical sensors are added between 11 and 13 km in order to intercept all horizontal radiation and avoid lost photons (see Appendix ). In the y direction, the sensor is placed above the center of the cloud, which is then seen as infinite in this direction. Small deviations in the sensor position in this direction do not impact the results.

With the domain of length L and the cloud of width w, the cloud fraction is proportional to cloud width following the relation f∝w/L. Because radiative transfer is solved on a large domain with L=66 km, the resulting cloud fractions are small: they range between 0.8 % and 24 %.

In the following sections, a distinction will be made between the all-sky cloud radiative effect (aCRE) and the overcast cloud radiative effect (oCRE) with aCRE=f×oCRE=(w/L)×oCRE. The aCRE represents the cloud’s radiative influence on the whole studied domain, taking into account both clear and cloudy areas. It is given in W m⁻² averaged over the domain. The oCRE corresponds to the radiative effect of the cloud only, without the surrounding clear-sky areas. The values of oCRE are in W m⁻² of cloudy surface area. This notation is also used for other parameters, such as the ice water path (i.e., the vertically integrated mass of ice in the cloud in kg m⁻²): aIWP=f×oIWP, where oIWP∝τc. We use aIWP to study domain-averaged quantities and the cloud optical depth τc to focus on cloudy parts.

The calculations in Sects.  and are performed with the independent column approximation (ICA). To achieve this with htrdr, the size of the horizontal mesh is multiplied by a very large number (106) as in . This ensures that the magnitude of horizontal transport of radiation between columns becomes negligible compared to vertical fluxes: this is equivalent to treating each cell independently as in ICA.

This section provides an overview of the radiative effect of the idealized clouds at zenith, with a focus on the behavior specific to low values of cloud optical depth. A study of the behavior of the CRE under ICA allows a better understanding of the 3D effects later on. We start by examining the SW and LW components of the CRE in turn, before analyzing the net SW + LW CRE.

The previous section gave an overview of the radiative effect of an idealized cloud calculated using the independent column approximation. Three-dimensional effects of radiation were intentionally ignored. Under the independent column approximation, no radiation is allowed to travel horizontally between clear and cloudy sky: photons can only escape the cloud through its base or top. In other words, the impact of the cloud sides on photon transport is neglected. From this section on, horizontal transport of radiation is taken into account in the simulations, allowing us to compare against ICA results and study the influence of these effects on the CRE.

Figure a shows the oCRE of the different cloud configurations for 1D and 3D calculations for the Sun at zenith. Accounting for 3D effects in simulations does not modify the qualitative behavior of the oCRE. However, in both spectral domains, the range of 3D calculations is more positive than that of the 1D, indicating that the 3D effects, i.e., the difference between 3D and 1D CREs, are positive (heating effect). In the LW, the warming effect of clouds is enhanced by 3D effects: unlike in ICA calculations, radiation emitted by the surface and atmosphere below the cloud can be absorbed by cloud sides. Cloud sides also become sources of emission: they emit at cloud temperature, i.e., less energy than the surrounding upwelling radiation coming from the lower and warmer atmosphere and surface. These additional sources of absorption and emission modify the CRE by reducing the outgoing LW radiation. In the SW with the Sun at zenith, incident solar radiation entering the cloud can be scattered through the sides towards the surface. In 1D, these photons would stay within the cloud and therefore have a higher probability of being sent back to space after one or several scattering events. This results in a decreased proportion of reflected radiation in the 3D calculations, equivalent to a reduction in the SW upward flux. Hence, for the Sun at zenith, 3D effects lead to a reduction of the upwelling radiation above the cloud in both spectral domains, adding up to a positive, warming component to net CRE.

Whereas the oCRE is well understood in ICA calculations, 3D calculations add complexity and extra degrees of freedom. Hence, the range of values taken by the oCRE in 3D calculations is very large compared to the 1D calculations. For instance, the effect of cloud geometrical thickness on 3D effects is illustrated in Fig. : for all cloud widths and cloud optical depths, geometrically thicker clouds exert larger 3D effects.

It is interesting to note that the effect of cloud geometrical thickness is opposite in 1D and 3D computations of the LW oCRE. We previously showed that for 1D calculations, geometrically thick clouds have a weaker LW oCRE than thin clouds because of their lower cloud base and therefore warmer temperatures. In 3D, as the cloud vertically spreads, the surface of its sides increases, thus enhancing 3D effects and therefore the LW oCRE. For the configurations studied here, this behavior dominates the opposing 1D effect, and the overall effect of cloud height is positive in 3D.

The effect of thickness does not contribute equally to CREs of all clouds geometries: it can double the CRE of narrow clouds (black lines, 1 km width), whereas it has very limited impact on the CRE of wide clouds (green lines, 16 km width). This is because cloud thickness needs to be compared to its width. The aspect ratio (geometrical thickness to width) of the 16 km wide cloud is very small. The contribution of cloud sides in the CRE is thus small relative to its wide surface. As a result, the magnitude of 3D effects becomes negligible relative to the net oCRE. When considering the influence of the cloud on the whole domain, i.e., the aCRE instead of the oCRE, we determine from empirical analysis that in the LW, 3D effects are nearly insensitive to cloud width and they depend almost linearly on the product of cloud optical depth and height (CRELW3D-CRELW1D∝τc×h, Fig. b). As cloud optical depth is proportional to the aIWP-to-cloud-width ratio (τc∝aIWP/w), we can establish that 3D effects in the LW increase linearly with the product of aIWP, cloud width, and height (CRELW3D-CRELW1D∝aIWP/w×h). This relationship works for the LW spectrum but it appears that those parameters are not sufficient to determine the behavior of 3D effects in the SW (Fig. a).

Thus, when looking at the aCRE, 3D effects of radiation are dependent on cloud height and indirectly on cloud width via the optical depth (because τc∝aIWP/w). When considering the oCRE, the cloud width is introduced directly in the equation (oCRE∝aCRE/w), hence introducing the aspect ratio indirectly.

Three-dimensional effects can have a great impact on the net CRE. For optically thin clouds which have a net CRE close to 0 under the independent column approximation, 3D effects can be of the same magnitude as the 1D CRE itself. For some cloud optical depths, two cloud geometries can exhibit net oCRE of opposite signs because of 3D effects (Fig. 4a).

We start with the analysis of independent column calculations. Figure a shows the SW oCRE as a function of SZA for several cloud optical depths, obtained with htrdr with the independent column approximation (crosses) and with Eq. () (solid lines). Let us focus first on low optical depths, i.e., τc=0.25 (purple lines). In the SW, the cooling effect of the cloud strengthens with increasing SZA before reaching a maximum at large angles (70–80°) and declining towards zero when the Sun gets close to the horizon (Fig. a). Two opposing effects are at play in the SW when the Sun goes down on the horizon: decreasing incident solar radiation, following the cosine of zenith angle μ0, and increasing cloud reflectivity R(μ0).

Once again, we use MW80 to analyze the behavior of the CRE, as it provides a good approximation of the dependence of reflectivity on SZA (Eq. ). This increase is driven by μ0 via two components; the first is the dependence of extinction on the path taken by incident solar radiation within the cloud (the exponential term in Eq. ), and the second is the angular dependence of scattering properties (influenced by the asymmetry parameter, g). The impact of these two components of cloud reflectivity can be distinguished by successively taking a constant μ0=1 in the exponential term of Eq. () and then setting g=0 in the γ1 and γ3 parameters. Figure b displays the reflectivity as a function of SZA, and panel (c) shows the product of cloud reflectivity and cosine of the zenith angle, i.e., the combination of the two components of SW CRE. For optically thin clouds (τc=0.25), the μ0=1 curve (dashed line) shows a pronounced attenuation of the strong peak at large SZAs that exists using the unmodified MW80 expression (solid line) and obtained with htrdr. This difference can be attributed to the absence of an increase in extinction resulting from setting a constant μ0. The remaining increase in cloud reflectivity in the μ0=1 curve can be attributed to the angular dependence of scattering effects, explained by the strong forward peak of the ice crystal scattering phase function. When the Sun is at zenith, scattering directions towards the surface are favored. For increasing zenith angles, the probability of forward scattering is unchanged but the scattering direction follows the SZA, resulting in a larger fraction of radiation being upscattered. This angular dependence of upscattering has been studied by among others and can be highlighted by comparing to a computation where the asymmetry factor g is set to 0. The resulting phase function is symmetrical and the angular dependence of upscattering is dampened. The obtained reflectivity, illustrated by the dash-dotted lines in Fig. b and c, clearly shows the absence of the previously observed peak at large zenith angles. It is interesting to note in panel (b) that (1) as the g=0 reflectivity has a weaker angular dependence, its value at zenith is larger than MW80, and (2) despite the higher value at zenith and a mild increase with increasing zenith angle, its value at 90° is still lower than the MW80 reflectivity. For illustrative purposes, a constant reflectivity is added in panel (c) (dotted line). The g=0 curve is close to the constant reflectivity curve, and only small angular dependence remains due to the g=0 phase function not being perfectly isotropic and thus still having a small angular dependence.

The maximum reached by the SW CRE at large SZA is specific to small cloud optical depths. As the cloud optically thickens, the reflectivity for the Sun at zenith increases and its angular dependence is diminished. As a result, the SW CRE reaches its maximum closer to zenith. The μ0=1 curve does not differ from the regular MW80 curve any longer. The increase with zenith angle of the path taken by incident solar radiation within the cloud has no effect any more. The remaining observed angular dependence of reflectivity is attributed to scattering properties only.

Three-dimensional effects of radiation influence how SW CRE depends on the position of the Sun. Under the independent column approximation, the azimuth angle has no influence on the SW CRE as the cloud is seen as infinite in both x and y horizontal directions. In 3D calculations, however, the orientation of the Sun relative to the cloud needs to be accounted for. Figure  shows the 3D SW oCRE for two azimuth angles, corresponding to two orientations of the Sun: perpendicular (ϕ=0, dashed line) and parallel (ϕ=90, dotted line) to the cloud. Focusing first on low cloud optical depth, τc=0.25. For zenith angles from θ=0° to about θ=75°, 3D effects are positive. Qualitative behavior when 3D radiative effects are included is similar to that for the 1D calculations: increase in SW CRE with increasing SZA, maximum located at large SZA, and decrease to 0 at θ=90°. The location and magnitude of the maximum CRE, however, differ and depend on azimuth angle. When the Sun is low on the horizon and in a direction parallel to the cloud, 3D radiative effects tend to zero and 1D and 3D give almost the same results. In contrast, when the Sun is perpendicular to the cloud, the maximum of SW CRE is larger in the 3D case and happens at a larger SZA than the 1D case (around θ=85°), leading to negative 3D effects that can account for up to several hundred percent of the SW CRE. The divergence in 3D effects based on cloud orientation relative to the Sun can be interpreted with clarity. On one hand, the “parallel-Sun” 3D case is geometrically similar to the 1D approximation, with the Sun seeing a contrail of infinite length parallel to its rays. In both scenarios, most of the radiation goes into the contrail and very little is scattered through the sides, yielding weak 3D effects. On the other hand, when the Sun is perpendicular to the contrail, and especially when it goes down on the horizon, an increasing fraction of cloud sides is sunlit, increasing its effective cover and resulting in enhanced 3D effects and SW CRE.

The zenith angle at which 3D effects change sign to become negative in the perpendicular configuration depends on the cloud optical depth. It decreases from θ∼75° for τc=0.25 to θ∼45° for τc=4.

To investigate the impact of our choice of a rectangular cross-section for the cloud, experiments were repeated with an elliptical contrail. We chose a configuration close to the one studied in , hereafter GH07, with a width of 800 m, height of 400 m, and mean optical depth of 0.2 and 0.4. The ice water content (IWC) depends on the distance to the center of the contrail, with a peak IWC at the center, as in GH07: 6IWC=IWCpcos⁡π2rfor r<1;0for r≥1, where 7r=x-x0Δx/22+z-z0Δz/2212. IWC_p is the maximum ice water content at the center of the cloud, (x0,z0) the position of the center of the cloud, and Δx and Δz the geometrical width and thickness of the cloud. To separate the effects of IWC inhomogeneity and cloud shape, we also ran experiments with an ellipse of uniform IWC. We end up with three types of clouds with the same mean optical depth: the rectangle cloud with uniform IWC and optical depth, the uniform ellipse with uniform IWC and inhomogeneous optical depth, and the GH07 ellipse with inhomogeneous IWC and optical depth. The three configurations show different degrees of inhomogeneity in terms of IWC and cloud optical depth.

The CREs of the three configurations are very similar in both 1D and 3D (Fig. ). In the LW and in the SW at zenith, differences between the ellipse and the rectangular cloud CREs are very small. The LW oCRE of the GH07 ellipse is slightly weaker, i.e., less warming than that of the rectangular cloud, by less than 5 %. The SW oCRE at zenith shows a small difference: the CRE of the GH07 ellipse exhibits a stronger cooling of about 0.5 W m⁻², i.e., 2.5 %. At larger zenith angles, larger differences appear, where the rectangular cloud (uniform ellipse) is up to 15 % (10 %) more cooling than the GH07 ellipse above 80°. For the net oCRE, this results in a GH07 ellipse less warming than the others at zenith and less cooling at large zenith angles where the net oCRE is negative. The delta oCRE changes sign at some point, but around the same point the net oCRE also changes sign.

In terms of cloud optical depth inhomogeneity, differences are negligible in the LW and in the SW with the Sun at zenith, but for large SZAs, the SW oCRE increases as cloud optical depth becomes more homogeneous. Also, the differences between uniform and nonuniform clouds are more pronounced than between ellipses and rectangular clouds, which means that here, inhomogeneity seems to be more important than the cloud shape for the CRE, via optical depth effects (and therefore scattering) at the sides of the clouds.

But importantly, the three configurations show 3D effects of similar magnitude. Thus, the choice of a homogeneous rectangular cloud does not change the behavior of the CRE or 3D effects and even facilitates the analysis.