Introduction

Aerosols have a significant impact on the climate system by interacting with radiation and clouds. Solar and thermal radiation interact with aerosols by absorption and scattering processes. Despite extensive research on atmospheric aerosols, the effective radiative forcing due to aerosol–radiation interactions (ERFari) has still a large uncertainty. The ERFari combines effects from radiative forcing due to aerosol–radiation interactions (RFari) and rapid adjustments and is estimated to be $-$0.45 ($-$0.95 to $+$0.05) $\mathrm{W}{\mathrm{m}}^{-\mathrm{2}}$ by the 5th assessment report (AR5) of the Intergovernmental Panel on Climate Change (IPCC; ). The radiative forcing by aerosol–radiation interactions from sulfate ($-$0.4 $\mathrm{W}{\mathrm{m}}^{-\mathrm{2}}$) and nitrate ($-$0.11 $\mathrm{W}{\mathrm{m}}^{-\mathrm{2}}$) is a cooling effect on the radiative balance of the Earth due to increased scattering of solar radiation. In contrast, black carbon ($+$0.4 $\mathrm{W}{\mathrm{m}}^{-\mathrm{2}}$) is warming the Earth's climate due to absorption of solar radiation. Additionally, it is uncertain if primary and secondary organic aerosols, aerosols from biomass burning and mineral dust have a net cooling or a warming effect e.g.. In total, anthropogenic aerosols have very likely a cooling effect through aerosol–radiation interactions on the radiative balance of the Earth .

Through non-linear relationships described by the Beer–Lambert law and Mie scattering , the extinction of radiation is related to the aerosol particle radius. The aerosol particle radius of hygroscopic aerosols like sulfate or sea salt aerosols increases in a humid environment due to attraction of water. This hygroscopic growth is a non-linear function of the ambient relative humidity (RH), where hygroscopic growth is especially enhanced close to saturation . Therefore, extinction due to hygroscopic aerosols increases strongly when the humidity of the ambient air approaches saturation .

It is known that humidity varies on subgrid scales in general circulation models (GCMs) with largest subgrid-scale variability in the middle troposphere (e.g. ). However, GCMs that just use the grid-box mean relative humidity $\stackrel{\mathrm{‾}}{\text{RH}}$ to calculate hygroscopic growth of aerosols do not take this subgrid-scale variability in humidity and its effect on radiation into account. Studies based on limited-area models suggest that GCMs may underestimate the RFari of sulfate aerosols by 30 to 80 % when not considering subgrid-scale variability in RH for the hygroscopic growth of sulfate particles . These studies use high-resolution models and compare the results from calculations of radiative forcing that keep the high resolution of RH with either calculation where RH is averaged spatially beforehand to mimic a GCM resolution or results from model configurations with a coarser resolution. In addition, recent studies show that models with a coarse resolution which do not take subgrid-scale variability in various aerosol properties into account underestimate aerosol radiative forcing , and have a significant negative bias in aerosol optical depth (AOD; ).

First attempts to implement a subgrid-scale variability in RH in a GCM for the calculation of RFari by sulfate were made by and . However, these studies make strong simplifications about the shape of the used probability density function (PDF) and are not consistent with the cloud cover scheme. prescribe the RH distribution globally for clear skies. For each grid cell and height level, five fixed RH values are taken from a normal distribution around RH $=$ 70 %. They find that RFari by sulfate is 24 % greater than the non-hydrated forcing when using the grid-box mean RH. However, RFari by sulfate increases up to 37 % when the subgrid-scale variability in RH is applied and the correlation between clouds and areas of high relative humidity is taken into account. Hence, RFari by sulfate increased by about 10 % from simulations that use grid-box mean RH to simulations with a subgrid-scale variability in RH. have a more sophisticated approach. They use a triangular-shaped relative humidity distribution around the grid-box mean RH with a magnitude of $\pm$10 % that is truncated at RH $=$ 1.0 as proposed by . They show that RFari by sulfate is enhanced by 9 % due to the subgrid-scale variability in RH when clouds are included. We want to point out that do not consider variations in width and shape of the used distribution. This is a rather strong simplification (especially having the non-linear hygroscopic growth in mind) in comparison to findings of that suggest a change of the width of a uniform PDF from about $\pm$20 % at the surface to about $\pm$65 % in the middle troposphere.

In this study, we implement a stochastic parameterization of subgrid-scale variability of clear-sky relative humidity RH${}_{\mathrm{cls}}$ into the global aerosol-climate model of the Max Planck Institute for Meteorology (MPI-M) ECHAM6-HAM2 . For this, we use a uniform PDF that reproduces the subsaturated part of the cloud cover scheme from that is used by ECHAM6 . The width of the PDF from the cloud cover scheme is a function of height . Hence, our parameterization inherits this feature. ECHAM6-HAM2 until now used the grid-box mean clear-sky relative humidity ${\stackrel{\mathrm{‾}}{\text{RH}}}_{\mathrm{cls}}$ to calculate hygroscopic growth . Now, rather than using the grid-box mean, the PDF of the subgrid-scale variability in RH${}_{\mathrm{cls}}$ is randomly sampled for each time step, grid cell and height level to compute the growth factor $\mathrm{gf}$ (see Sect. ). Hence, the parameterization complies with the necessity to be consistent and to introduce as few as possible empirical or tunable parameters. For a more elaborate discussion on the topic in the literature, we refer to . Furthermore, hygroscopic growth is computed in ECHAM6-HAM2 for all hygroscopic aerosol constituents that are incorporated in the model. Therefore, the effect of subgrid-scale variability in RH${}_{\mathrm{cls}}$ on hygroscopic growth is included for all hygroscopic aerosol particles in the model.

A very similar method of subgrid-scale variability in humidity is, for example, applied on the convective scheme of the European Centre for Medium-Range Weather Forecasts (ECMWF) ensemble prediction system by . They show that their new stochastic convective scheme generally improves the skill of the operational system for most variables in the short to medium range in the mid-latitudes. More generally, we want to emphasize that stochastic parameterizations are not only a method to estimate uncertainties but also lead to a better representation of the mean state of the atmosphere. This was recently summarized in .

In Sect.  of this article we describe the aerosol module HAM2 in more detail and introduce our stochastic parameterization of clear-sky relative humidity. Then, in Sect.  we investigate how the new parameterization changes optical and radiative properties of the atmosphere. Afterwards, the results are discussed in Sect. . Finally, this study is summarized with an outlook for further research in Sect. .

Methods

Aerosol module HAM2

In this section, we briefly describe the aspects of the micro-physical aerosol module HAM2 that are relevant for this study. The micro-physical aerosol module HAM2 is the successor of its first version that was introduced by . HAM2 is built as an extension of the atmospheric GCM ECHAM6 . It incorporates the following aerosol components: sulfate (${\mathrm{SO}}_{\mathrm{4}}$), black carbon (BC), organic carbon (OC), sea salt (SS) and mineral dust (DU). The module predicts the evolution of the aerosol population based on 7 log-normal modes (4 soluble, S, and 3 insoluble, I) that describe the size distribution of atmospheric aerosols. The modes are divided into Nucleation (N, $r<\mathrm{0.005}$ $\mathrm{\mu }\mathrm{m}$), Aitken (K, $\mathrm{0.005}<r<\mathrm{0.05}$ $\mathrm{\mu }\mathrm{m}$), Accumulation (A, $\mathrm{0.05}<r<\mathrm{0.5}$ $\mathrm{\mu }\mathrm{m}$) and Coarse (C, $r>\mathrm{0.5}$ $\mathrm{\mu }\mathrm{m}$) and are abbreviated in the following such as CS for soluble Coarse mode. The main soluble aerosol constituents are SS, ${\mathrm{SO}}_{\mathrm{4}}$ and OC. DU and BC are considered as insoluble on emission. However, insoluble aerosols can become soluble if they merge with soluble particles due to internal mixing by ageing processes such as condensation and coagulation .

Aerosol radiative properties are calculated for 24 spectral bands for shortwave and 16 bands for longwave radiation using Mie theory by applying the algorithm suggested by . The model uses the volume-weighted average refractive indices for internally mixed aerosols where aerosol water is included . The effective complex radiative indices and the Mie size parameter are then used for the aerosol radiative properties, namely extinction cross section, single scattering albedo and asymmetry parameter in the radiation scheme. For version 2 of the aerosol module, the refractive indices for black carbon were updated with values from that led to a reduction of the negative bias due to aerosol absorption enhancement . In contrast to and , HAM2 does not include a very strong absorption enhancement for absorbing particles inside clouds. It should be noted that the hypothesis of is very controversial and not supported by most other studies e.g..

Hygroscopic growth in HAM2

Soluble particles can grow in size due to the attraction of water. This hygroscopic growth can be described by the growth factor $\mathrm{gf}=r_{\mathrm{wet}}/r_{\mathrm{dry}}$, where $r_{\mathrm{wet}}$ and $r_{\mathrm{dry}}$ are the wet and dry radius of an aerosol particle, respectively. introduced the $\mathit{\kappa }$-Köhler theory to calculate the growth factor as a function of relative humidity and temperature $${\displaystyle \frac{\text{RH}}{\exp \left(\frac{A_{\mathrm{K}}\left(T\right)}{D_{\mathrm{dry}}\mathrm{gf}}\right)}}={\displaystyle \frac{{\mathrm{gf}}^{\mathrm{3}}-\mathrm{1}}{{\mathrm{gf}}^{\mathrm{3}}-(\mathrm{1}-\mathit{\kappa })}},$$ where RH is the ambient relative humidity, $D_{\mathrm{dry}}$ the dry diameter, $A_{\mathrm{K}}$ the temperature-dependent parameter of the Kelvin (curvature) effect and $\mathit{\kappa }$ the hygroscopicity. A $\mathit{\kappa }$ value of 0 describes completely hydrophobic aerosols, whereas $\mathit{\kappa }$ values greater than 0.5 describe very hygroscopic aerosols. Aerosol constituents with very high $\mathit{\kappa }$ values in HAM2 are sulfate and sea salt (see Table ). Note that the $\mathit{\kappa }$ value for sulfate in HAM2 is in the range of the observed value for ammonium sulfate (0.33–0.72; ). Furthermore, HAM2 does not include nitrate in its current set-up. The hygroscopicity of internally mixed aerosols is determined by calculating the volume-weighted average of the $\mathit{\kappa }$ values form each soluble compound. In Eq. () $\mathrm{gf}$ is a strictly monotonically increasing, non-linear function with positive curvature for $\text{RH}\in [\mathrm{0},\mathrm{1}]$.

$\mathit{\kappa }$ values as used in HAM2 from . The $\mathit{\kappa }$ value for sulfate in HAM2 is in the range of the observed value for Ammonium sulfate . Furthermore, HAM2 does not include nitrate in its current set-up.

ECHAM6-HAM2 uses the grid-box mean clear-sky relative humidity ${\stackrel{\mathrm{‾}}{\text{RH}}}_{\mathrm{cls}}$ in Eq. () to calculate the hygroscopic growth for each aerosol mode. ${\stackrel{\mathrm{‾}}{\text{RH}}}_{\mathrm{cls}}$ is chosen, instead of grid-box mean relative humidity $\stackrel{\mathrm{‾}}{\text{RH}}$, because ${\stackrel{\mathrm{‾}}{\text{RH}}}_{\mathrm{cls}}$ is a better estimate for the relative humidity in the cloud-free part of a grid cell than $\stackrel{\mathrm{‾}}{\text{RH}}$ and cloud processing and cloud radiative effects are dominant in the cloudy part of a grid box as reasoned in for ECHAM5-HAM1. This means that since the aerosol–radiation interactions have a small effect compared to the cloud reflectivity in the cloudy part of a grid cell, swelling is only approximately treated in the cloudy part. ${\stackrel{\mathrm{‾}}{\text{RH}}}_{\mathrm{cls}}$ is diagnosed from predicted $\stackrel{\mathrm{‾}}{\text{RH}}$. For this, saturation is assumed in clouds ($\text{RH}=\mathrm{1}$). When the grid box is cloud free ($f=\mathrm{0}$) or partly cloudy ($\mathrm{0}<f<\mathrm{1}$), clear-sky relative humidity is computed by ${\stackrel{\mathrm{‾}}{\text{RH}}}_{\mathrm{cls}}=\left(\stackrel{\mathrm{‾}}{\text{RH}}-f\right)/(\mathrm{1}-f)$, where $f$ is the fractional cloud cover. For overcast grid boxes ($f=\mathrm{1}$), the clear-sky relative humidity is set to saturation as well (${\stackrel{\mathrm{‾}}{\text{RH}}}_{\mathrm{cls}}=\mathrm{1}$). Using the ${\stackrel{\mathrm{‾}}{\text{RH}}}_{\mathrm{cls}}$ in Eq. () implies that no subgrid-scale variability in ${\text{RH}}_{\mathrm{cls}}$ is used beyond the information supplied by the fractional cloud cover.

(a) Scheme for predicting fractional cloud cover, $f$, with a uniform PDF for the total-water $q_{\mathrm{t}}$. The blue area indicates the fraction of a grid cell which is covered by clouds. $\mathrm{\Delta }{\text{RH}}_{\mathrm{cls}}$ is set to $\mathrm{\Delta }q/q_{\mathrm{s}}=\mathrm{1}-{\text{RH}}_{\mathrm{crit}}$ for a PDF around ${\stackrel{\mathrm{‾}}{\text{RH}}}_{\mathrm{cls}}$ if no fractional cloud cover is present (not depicted) or set to $(q_{\mathrm{s}}-q_{\mathrm{cls}})/q_{\mathrm{s}}=\mathrm{1}-{\stackrel{\mathrm{‾}}{\text{RH}}}_{\mathrm{cls}}$ if fractional cloud cover is present (in the figure shown in terms of specific humidity). (b) Cumulative distribution function (CDF) for a uniform PDF around ${\stackrel{\mathrm{‾}}{\text{RH}}}_{\mathrm{cls}}$. By the inversion of the CDF and with a random number $a\in [\mathrm{0},\mathrm{1}]$ (see Eq. ), a value between ${\text{RH}}_{\mathrm{cls}}-\mathrm{\Delta }{\text{RH}}_{\mathrm{cls}}$ and ${\text{RH}}_{\mathrm{cls}}+\mathrm{\Delta }{\text{RH}}_{\mathrm{cls}}$ is sampled and used as the argument for the hygroscopic growth.

[Figure omitted. See PDF]

Stochastic parameterization for the subgrid-scale variability in clear-sky relative humidity

In the ECHAM model, subgrid-scale variability in specific humidity is already used for the prediction of fractional cloud cover . The cloud scheme assumes a uniform PDF as proposed by for the horizontal subgrid-scale variability of total-water $q_{\mathrm{t}}$ between ${\overline{q}}_{\mathrm{t}}-\mathrm{\Delta }q$ and ${\overline{q}}_{\mathrm{t}}+\mathrm{\Delta }q$, where $\mathrm{\Delta }q=\mathit{\gamma }{q}_{\mathrm{s}}$ (see Fig. a). Variable ${\overline{q}}_{\mathrm{t}}$ is the model-predicted grid-box mean total-water specific humidity and $q_{\mathrm{s}}$ the saturation specific humidity computed from the predicted grid-box mean temperature. The scaling parameter $\mathit{\gamma }$ is varying in the vertical but otherwise assumed to be constant in space and time. It can be calculated by $\mathit{\gamma }=\mathrm{1}-{\text{RH}}_{\mathrm{crit}}$, where ${\text{RH}}_{\mathrm{crit}}$ is the critical relative humidity that is a function of height . Fractional cloud cover occurs if the grid-box mean relative humidity $\stackrel{\mathrm{‾}}{\text{RH}}$ exceeds the critical relative humidity. In ECHAM6-HAM2, ${\text{RH}}_{\mathrm{crit}}$ is parameterized by $${\text{RH}}_{\mathrm{crit}}\left(p\right)=c_{\mathrm{t}}+(c_{\mathrm{s}}-c_{\mathrm{t}})\exp \left[\mathrm{1}-{\left({\displaystyle \frac{p_{\mathrm{s}}}{p}}\right)}^{n_x}\right],$$ with $p$ the ambient pressure and $p_{\mathrm{s}}$ the surface pressure. Furthermore, $c_{\mathrm{t}}=\mathrm{0.7}$ and $c_{\mathrm{s}}=\mathrm{0.9}$ are the critical relative humidity values at the top of the atmosphere (TOA) and the surface, respectively, and $n_x=\mathrm{4}$. The given values for $c_{\mathrm{t}}$, $c_{\mathrm{s}}$ and $n_x$ are the same as in the in the cloud cover scheme of ECHAM6 in the standard set-up. Note that satellite observations analysed by suggest a considerably stronger vertical change with $c_{\mathrm{t}}=\mathrm{0.34}$ in less stable regions and $c_{\mathrm{t}}=\mathrm{0.37}$. However, we keep the values for $c_{\mathrm{t}}$, $c_{\mathrm{s}}$ and $n_x$ as in the standard set-up to ensure the comparability with older studies. While the formulation of RH${}_{\mathrm{crit}}$ is specific to the ECHAM6 model, the cloud cover scheme from has also been applied in other global models. Furthermore, the cloud cover scheme which is, for example, used in the Geophysical Fluid Dynamics Laboratory (GFDL) atmosphere model AM3 assumes a uniform PDF of total water as well.

Several global atmosphere models including ECHAM6-HAM2 already make assumptions to account for the subgrid-scale variability in other atmospheric variables, e.g. for vertical velocity when computing droplet activation rates . However, subgrid-scale variability in RH or RH${}_{\mathrm{cls}}$ is not taken into account when computing hygroscopic growth of interstitial aerosols except in some studies that made strong simplifications regarding the shape and variation in the used PDF as explained in the introduction .

For our stochastic parameterization of subgrid-scale variability in RH${}_{\mathrm{cls}}$, we use the subsaturated part of the $q_{\mathrm{t}}$-PDF from the cloud cover scheme in not-overcast cases (see Fig. a). This diagnosed PDF is transformed into a RH${}_{\mathrm{cls}}$-PDF dividing it by $q_{\mathrm{s}}$. Afterwards, it is sampled for the stochastic parameterization of subgrid-scale variability in ${\text{RH}}_{\mathrm{cls}}$. The width of the $q_{\mathrm{t}}$-PDF in the cloud cover scheme is $$\mathrm{2}\mathrm{\Delta }q=\mathrm{2}\mathit{\gamma }{q}_{\mathrm{s}}=\mathrm{2}\cdot (\mathrm{1}-{\text{RH}}_{\mathrm{crit}})q_{\mathrm{s}}.$$ Dividing Eq. () by $q_{\mathrm{s}}$ yields the width of the corresponding RH-PDF. For cloud-free grid boxes this RH-PDF is equivalent to the RH${}_{\mathrm{cls}}$-PDF. In this case, its width is $$\mathrm{2}\mathrm{\Delta }{\text{RH}}_{\mathrm{cls}}=\mathrm{2}{\displaystyle \frac{\mathrm{\Delta }q}{q_{\mathrm{s}}}}=\mathrm{2}\cdot (\mathrm{1}-{\text{RH}}_{\mathrm{crit}}).$$ ${\text{RH}}_{\mathrm{crit}}$ is computed by Eq. (). However, when fractional cloud cover is present $\mathrm{\Delta }{\text{RH}}_{\mathrm{cls}}$ has to be adjusted to $$\mathrm{\Delta }{\text{RH}}_{\mathrm{cls}}={\displaystyle \frac{q_{\mathrm{s}}-q_{\mathrm{cls}}}{q_{\mathrm{s}}}}=\mathrm{1}-{\stackrel{\mathrm{‾}}{\text{RH}}}_{\mathrm{cls}}$$ so that the variation in ${\text{RH}}_{\mathrm{cls}}$ occurs in the subsaturated part of the cloud cover PDF (see Fig. a).

Afterwards, instead of using ${\stackrel{\mathrm{‾}}{\text{RH}}}_{\mathrm{cls}}$ as input for the calculation of the $\mathrm{gf}$, a stochastic value for clear-sky relative humidity, ${\text{RH}}_{\mathrm{cls},\mathrm{new}}$, from the inversion of the cumulative distribution function (CDF) is drawn (see Fig. b). For this, a random number, $a\in [\mathrm{0},\mathrm{1}]$, is generated and inserted into the following equation: $${\text{RH}}_{\mathrm{cls},\mathrm{new}}={\stackrel{\mathrm{‾}}{\text{RH}}}_{\mathrm{cls}}+\mathrm{\Delta }{\text{RH}}_{\mathrm{cls}}(\mathrm{2}a-\mathrm{1}).$$ Note that the integration of the model is not fully deterministic in the current setting. If one preferred a deterministic model, one could configure the random number generator such that in each integration the same random numbers are generated.

Model settings and postprocessing

ECHAM-HAM2 is run with a resolution of T63L31. For aerosol emissions, the AEROCOM II data for 1850 for pre-industrial (PI) and for 2000 for present-day (PD) simulations are used (; see Data availability). Climatological sea surface temperature (SST) and sea ice distributions are prescribed. Ten-year free-running (no nudging) model simulations starting on 1 January 2000 are performed with PI and PD aerosol emissions, both with and without the new parameterization. The total effective radiative forcing (ERF) by anthropogenic aerosols, ERFaer, is computed by $$\text{ERFaer}=({\text{SW}}_{\mathrm{net}}+{\text{LW}}_{\mathrm{net}}{)}_{\mathrm{PD}}-({\text{SW}}_{\mathrm{net}}+{\text{LW}}_{\mathrm{net}}{)}_{\mathrm{PI}},$$ where the short and longwave radiative fluxes, SW and LW, are at the TOA. The radiative forcing due to aerosol–radiation interactions, RFari, is computed as suggested by : $$\text{RFari}=({\text{SW}}_{\mathrm{net}}-{\text{SW}}_{\mathrm{net},\mathrm{clean}}{)}_{\mathrm{PD}}-({\text{SW}}_{\mathrm{net}}-{\text{SW}}_{\mathrm{net},\mathrm{clean}}{)}_{\mathrm{PI}}.$$ Again, radiative fluxes are at TOA. The subscript “clean” indicates the results of the radiative transfer equation for an atmosphere with no aerosols.

To depict changes in hygroscopic growth we define the squared ratio $$\mathit{\beta }={\left({\displaystyle \frac{{\mathrm{gf}}_{\mathrm{stoch}}}{{\mathrm{gf}}_{\mathrm{control}}}}\right)}^{\mathrm{2}},$$ where ${\mathrm{gf}}_{\mathrm{stoch}}$ and ${\mathrm{gf}}_{\mathrm{control}}$ account for the growth factor in the model run with the stochastic parameterization and the control model run, respectively. The squared ratio scales with the effective extinction cross section and therefore describes the influence on AOD.

Satellite retrievals of AOD from the Moderate Resolution Imaging Spectroradiometer (MODIS) platform Aqua from the period between August 2002 and December 2010 are used to evaluate the results of implementing subgrid-scale variability in ${\text{RH}}_{\mathrm{cls}}$ into the model. The temporal mean values of AOD measurements (${\stackrel{\mathrm{‾}}{\text{AOD}}}_{\mathrm{MODIS}}$) for the entire time span (August 2002–December 2010) are compared to the temporal means (January 2000–December 2009) of the model data (${\stackrel{\mathrm{‾}}{\text{AOD}}}_{\mathrm{control}}$, ${\stackrel{\mathrm{‾}}{\text{AOD}}}_{\mathrm{stoch}}$).

(a) Profile of the global mean of the squared ratio of the growth factor between the run with the stochastic parameterization of hygroscopic growth, ${\mathrm{gf}}_{\mathrm{stoch}}$, and the control run, ${\mathrm{gf}}_{\mathrm{control}}$. CS is the soluble Coarse aerosol mode (red). AS the soluble Accumulation (green), KS the soluble Aitken (blue) and NS the soluble Nucleation aerosol mode (black). (b) Profile of global mean clear-sky relative humidity (dark blue line) with its corresponding range of subgrid-scale variability (light blue area).

[Figure omitted. See PDF]

Results

In the following, results from PD simulations, if not specified differently, are presented. We compute uncertainties for a 95 % confidence interval on the basis of yearly mean values from the temporal variability. In these differences, uncertainties are added in quadrature.

In Fig. a the global mean profiles of $\mathit{\beta }$ are shown for all soluble aerosol modes. Hygroscopic growth of aerosols is in general enhanced due to the implementation of a subgrid-scale variability in ${\text{RH}}_{\mathrm{cls}}$. We find that the effect is stronger for aerosol particles with a large particle radius. Thus, the effect is strongest for particles from the CS mode (red line in Fig. a) and weakest for particles from the NS mode (black line in Fig. a). Moreover, the effect on hygroscopic growth has a maximum between 700 and 600 $\mathrm{hPa}$ for each aerosol mode.

The global mean AOD increases by $\mathrm{0.009}\pm \mathrm{0.002}$ ($\sim$ 7.8 %). The response in AOD is weaker in simulations with PI emissions with a global mean difference of $\mathrm{0.006}\pm \mathrm{0.002}$ ($\sim \mathrm{6.0}$ %). Figure a shows that the AOD increased especially in lower latitudes with a mean of about 0.013 in the tropics. Furthermore, the figure reveals that the AOD of diagnosed aerosol water (WAT) dominates the change in total AOD and not the change in dry matter of SS or ${\mathrm{SO}}_{\mathrm{4}}$. Figure b shows the zonal mean AOD values from the model runs with and without the stochastic parameterization and from satellite measurements of MODIS-Aqua. Changes due to the new parameterization are small in comparison to the general difference between modelled and measured AOD. The absorption aerosol optical depth (AAOD) increased by $\mathrm{0.12}\pm \mathrm{0.04}\times {\mathrm{10}}^{-\mathrm{3}}$ ($\sim \mathrm{4.7}$ %), mainly due to an increase in AAOD by BC of about $\mathrm{0.11}\times {\mathrm{10}}^{-\mathrm{3}}$. However, note that in absolute terms the change in AOD is nearly 2 orders of magnitude greater than the change in AAOD.

Furthermore, the implementation of the new parameterization enhanced the ratio of scattering efficiency to total extinction efficiency, $\mathit{\omega }$, for the CS, AS and KS aerosol modes with a maximum for the KS mode (2.6 %). The effective extinction cross section, $\mathit{\sigma }$, increases for the CS, AS and KS aerosol modes as well. The strongest change is visible for the KS mode with a change by 15.1 %. Note that no output for $\mathit{\omega }$ and $\mathit{\sigma }$ is generated by the model for NS mode. Finally, the Ångström exponent for wet particles, $\mathit{\alpha }$, changes by $-$0.8 $\times$ 10${}^{-\mathrm{3}}\pm \mathrm{11.5}\times {\mathrm{10}}^{-\mathrm{3}}$ ($-$0.11 %). The total cloud cover decreased by $-\mathrm{0.08}\pm \mathrm{0.14}$ % in PD simulations. In contrast, it increased by $\mathrm{0.17}\pm \mathrm{0.14}$ in PI simulations. The global mean profile of cloud cover $f$ in Fig.  reveals a slight increase in cloud cover between 700 and 900 $\mathrm{hPa}$ for PD simulations, whereas it mainly decreased below and above this layer. However, in PI runs $f$ increased for most parts of the atmosphere with a very little decrease at around 600 $\mathrm{hPa}$.

In the following, solar and thermal clear-sky radiation represent the idealized solar and thermal irradiance that would arise from an atmosphere if clouds were absent, whereas all-sky stands for the irradiance that takes the effect of clouds into account. The net clear-sky solar radiation ${\text{SW}}_{\mathrm{net},\mathrm{cls}}$ decreases by $-\mathrm{0.22}\pm \mathrm{0.07}$ $\mathrm{W}{\mathrm{m}}^{-\mathrm{2}}$. In addition, the net all-sky solar radiation ${\text{SW}}_{\mathrm{net}}$ changes by $-\mathrm{0.34}\pm \mathrm{0.22}$ $\mathrm{W}{\mathrm{m}}^{-\mathrm{2}}$. For PI emissions, the effect on ${\text{SW}}_{\mathrm{net},\mathrm{cls}}$ is with a change of $-\mathrm{0.13}\pm \mathrm{0.06}$ $\mathrm{W}{\mathrm{m}}^{-\mathrm{2}}$, as expected, smaller than for PD emissions. In contrast, a stronger effect in PI runs than in PD runs is visible for ${\text{SW}}_{\mathrm{net}}$ ($-\mathrm{0.47}\pm \mathrm{0.19}$ $\mathrm{W}{\mathrm{m}}^{-\mathrm{2}}$). Responses in the thermal radiation (positive downward) are small. The clear-sky thermal radiation ${\text{LW}}_{\mathrm{net},\mathrm{cls}}$ has a slight positive tendency with a mean value of $\mathrm{0.04}\pm \mathrm{0.09}$ $\mathrm{W}{\mathrm{m}}^{-\mathrm{2}}$. Similar to solar radiation, the all-sky thermal radiation ${\text{LW}}_{\mathrm{net}}$ changes more than the clear-sky radiation with a global mean of $\mathrm{0.06}\pm \mathrm{0.14}$ $\mathrm{W}{\mathrm{m}}^{-\mathrm{2}}$.

The comparison of 10-year model runs with PD and PI aerosol emissions reveals a change of the RFari from $-\mathrm{0.15}\pm \mathrm{0.04}$ to $-\mathrm{0.19}\pm \mathrm{0.04}$ $\mathrm{W}{\mathrm{m}}^{-\mathrm{2}}$ (31 %) in runs without and runs with the new parameterization, respectively. This implies that subgrid-scale variability of ${\text{RH}}_{\mathrm{cls}}$ enhances the cooling effect of anthropogenic aerosol emissions by aerosol–radiation interactions in climate simulations. It is interesting to note that the RFari increases substantially given the relatively small impact of the revision on present-day TOA balance. This can be attributed to the fact that anthropogenic aerosol is disproportionally hygroscopic. Furthermore, the effect on RFari translates into the ERF of anthropogenic aerosols (ERFaer) that also has a negative tendency ($-\mathrm{0.07}\pm \mathrm{0.27}$). A summary of the influence of subgrid-scale variability in ${\text{RH}}_{\mathrm{cls}}$ on optical and radiative variables is given in Table .

Changes in global mean values of optical and radiative variables due to the implementation of subgrid-scale variability in ${\text{RH}}_{\mathrm{cls}}$ are listed. Uncertainties in the mean value are calculated for a 95 % confidence interval on the basis of yearly mean values from the temporal variability. Uncertainties in differences are added in quadrature. Symbol $\mathit{\omega }$ is the ratio of the scattering efficiency to the total extinction efficiency and $\mathit{\sigma }$ the effective extinction cross section. The indices $\mathrm{KS}$, $\mathrm{AS}$ and $\mathrm{CS}$ indicate Aitken, Accumulation and Coarse modes, respectively. Symbol $\mathit{\alpha }$ is the wet Ångström exponent, ${\text{SW}}_{\mathrm{net}}$ the net shortwave radiation and with index ${\text{SW}}_{\mathrm{net},\mathrm{cls}}$ the net shortwave radiation in the clear-sky part. With the same meaning for the indices LW is the longwave radiation. TCC is the total cloud cover. Results are presented for present-day and pre-industrial emissions.

(a) Difference in temporally and zonally averaged AOD between the stochastic variation and the control run in AOD for different aerosol constituents. AOD from diagnosed aerosol water (WAT, blue) dominates the changes. (b) Temporally and zonally averaged AOD from the control (solid) and stochastic (dashed) model runs (black, January 2000–December 2009), and Moderate Resolution Imaging Spectroradiometer Aqua satellite data (red, August 2002–December 2010) is shown. Two discrepancies arise, namely (i) the fact that the model diagnoses clear-sky AOD also in overcast grid cells, with a relative humidity of RH $=$ 1 in these cases, which are dismissed in the MODIS retrieval and (ii) the point that MODIS uses a conservative cloud masking, i.e. excludes pixels near cloud edges, whereas the model uses all clear-sky pixels.

[Figure omitted. See PDF]

Discussion

As for the previous section, we discuss in the following the results from PD simulations, if not specified differently. In model runs with the new parameterization, aerosol particles swell stronger at each height level due to the non-linear nature of hygroscopic growth (see Eq. ). The positive curvature of this function for ${\text{RH}}_{\mathrm{cls}}\in [\mathrm{0},\mathrm{1}]$ implies that by applying a uniform PDF on ${\text{RH}}_{\mathrm{cls}}$ the expected value of $\mathrm{gf}\left({\text{RH}}_{\mathrm{cls}}\right)$ is greater than $\mathrm{gf}\left({\stackrel{\mathrm{‾}}{\text{RH}}}_{\mathrm{cls}}\right)$ with ${\stackrel{\mathrm{‾}}{\text{RH}}}_{\mathrm{cls}}$ being the grid-box mean clear-sky relative humidity.

(a) Difference in cloud cover, $f$, due to the implementation of subgrid-scale variability in RH${}_{\mathrm{cls}}$ for PI (dashed) and PD (solid) simulations. (b) Global mean profile of mass mixing ratio for various aerosol compounds from the CS mode.

[Figure omitted. See PDF]

Effects are stronger for aerosol particles with a larger radius, and thus particles from CS and AS modes. Three reasons can explain the vertical shape of the $\mathrm{gf}$ profiles:

• Clear-sky relative humidity has a decreasing trend with height in the model (see Fig. b). The same change in $\mathrm{\Delta }{\text{RH}}_{\mathrm{cls}}$ in a drier environment leads to a smaller change in $\mathrm{gf}$ in a more humid environment (unless saturation is reached) because of the non-linearity of Eq. (). The effect of the subgrid-scale variability in ${\text{RH}}_{\mathrm{cls}}$ on $\mathrm{gf}$ is therefore stronger in a more humid environment.

• Very hygroscopic aerosol particles are more sensitive to changes in relative humidity and larger particles tend to become deposited by impaction and sedimentation more easily. The main hygroscopic aerosol types are sulfate and sea salt, where sea salt ($\mathit{\kappa }=\mathrm{1.12}$) is more hygroscopic than sulfate ($\mathit{\kappa }=\mathrm{0.6}$). Sea-salt particles are emitted at the surface of the ocean. Due to their high $\mathit{\kappa }$ value, sea-salt particles grow strongly, are deposited easily and can not reach high altitudes. This is indicated in Fig. b which shows that the mixing ratio of sea salt decreases noticeably stronger with height than other aerosol compounds. Hence, the aerosol composition of the atmosphere shifts towards less hygroscopic components (smaller $\mathit{\kappa }$ values) with height and the effect of perturbing relative humidity on hygroscopic growth becomes weaker with smaller $\mathit{\kappa }$ values. This is supported by the study of that examines the global distribution of $\mathit{\kappa }$ using the ECHAM/MESSy Atmospheric Chemistry (EMAC) model. They find that especially at marine sites $\mathit{\kappa }$ values decrease with height, whereas at continental sites $\mathit{\kappa }$ tends to be more constant with height.

  Reasons 1 and 2 can only explain a decreasing trend of $\mathit{\beta }$ with height but not the maxima of the $\mathit{\beta }$ profiles between 600 and 700 $\mathrm{hPa}$.

• The critical relative humidity determines the width of the PDF which is used to vary ${\text{RH}}_{\mathrm{cls}}$ stochastically. The width $\mathrm{2}\mathrm{\Delta }{\text{RH}}_{\mathrm{cls}}$ of the PDF is calculated by $\mathrm{\Delta }{\text{RH}}_{\mathrm{cls}}=\mathrm{1}-{\text{RH}}_{\mathrm{crit}}$ as described in Sect. . But ${\text{RH}}_{\mathrm{crit}}$ is a function of height (see Eq. ). It decreases from the surface to 600 $\mathrm{hPa}$ from 0.9 to close to 0.7. For higher altitudes, it is nearly constant and converges slowly towards 0.7 (see Fig. b). This in fact means that the width of the PDF increases with height from the surface to 600 $\mathrm{hPa}$. Then, it is almost constant. The positive curvature of Eq. () implies that the wider the PDF is the stronger the mean hygroscopic growth. The increasing width of the PDF explains why $\mathit{\beta }$ becomes greater with height until 600 $\mathrm{hPa}$. Above, effects 1 and 2 are dominant and $\mathit{\beta }$ decreases again.

The net clear-sky solar radiation ${\text{SW}}_{\mathrm{net},\mathrm{cls}}$ decreases ($\mathrm{\Delta }{\text{SW}}_{\mathrm{net},\mathrm{cls}}=-\mathrm{0.22}$ $\mathrm{W}{\mathrm{m}}^{-\mathrm{2}}$) due to an increased reflection of solar radiation as indicated by an increased $\mathit{\omega }$. However, the effect on the net all-sky solar radiation ${\text{SW}}_{\mathrm{net}}$ is greater ($\mathrm{\Delta }{\text{SW}}_{\mathrm{net}}=-\mathrm{0.34}$ $\mathrm{W}{\mathrm{m}}^{-\mathrm{2}}$) than the effect on the net clear-sky solar radiation. This is maybe due to the fact that although total cloud cover (TCC) decreased by $-$0.08 %, cloud cover is slightly enhanced in height levels between about 700 and 900 $\mathrm{hPa}$ (see graph for PD in Fig. ). Hence, more solar radiation is reflected back to space by these clouds.

We proceed with the discussion of differences that arise between PD and PI simulations. The change in ${\text{SW}}_{\mathrm{net},\mathrm{cls}}$ is stronger for PD than for PI emissions because backscattering of solar radiation is more enhanced by the new parameterization in PD than in PI simulations because anthropogenic aerosols are disproportionally hygroscopic. In addition, the response of RFari ($-\mathrm{0.04}$ $\mathrm{W}{\mathrm{m}}^{-\mathrm{2}}$, 31 %) indicates as well that the parameterization leads to stronger backscattering by aerosols. Unexpectedly, the response in ${\text{SW}}_{\mathrm{net}}$ is greater in PI runs ($\mathrm{\Delta }{\text{SW}}_{\mathrm{net},\mathrm{PI}}=-\mathrm{0.47}$ $\mathrm{W}{\mathrm{m}}^{-\mathrm{2}}$) than in PD runs ($\mathrm{\Delta }{\text{SW}}_{\mathrm{net},\mathrm{PD}}=-\mathrm{0.34}$ $\mathrm{W}{\mathrm{m}}^{-\mathrm{2}}$). We assume that this might be due to the enhanced total cloud cover in the PI simulations ($\mathrm{\Delta }{\text{TCC}}_{\mathrm{PI}}=\mathrm{0.17}$), whereas total cloud cover decreased in PD simulations ($\mathrm{\Delta }{\text{TCC}}_{\mathrm{PD}}=-\mathrm{0.08}$). We ascribe the differences in cloud cover to internal variability. Hence, we suspect that the converse results for ${\text{SW}}_{\mathrm{net}}$ arise due to internal variability. The stronger increase in cloud cover for the higher troposphere in PI simulations (see Fig. ) might explain the strong response of ${\text{LW}}_{\mathrm{net}}$ in PI simulations ($\mathrm{\Delta }{\text{LW}}_{\mathrm{net},\mathrm{PI}}=\mathrm{0.26}$ $\mathrm{W}{\mathrm{m}}^{-\mathrm{2}}$). High, thin clouds, namely cirrus clouds, are known to have a positive effect on outgoing longwave radiation .

Conclusions

This study proposes a stochastic parameterization of clear-sky relative humidity that is consistent with the cloud cover scheme for its application in the aerosol hygroscopic growth parameterization. We investigate its effect on hygroscopic growth of aerosol particles as well as the subsequent changes in optical properties of the atmosphere and the radiative balance of the Earth. The implementation of the new parameterization leads to stronger swelling of aerosol particles (as expected) and therefore increases the AOD ($\sim$ 7.8 %). Furthermore, the increased AOD causes stronger backscattering of solar radiation under clear-sky conditions ${\text{SW}}_{\mathrm{net},\mathrm{cls}}$ ($-$0.08 %). Most importantly, the revision has a very strong influence on the simulated radiative forcing due to aerosol–radiation interaction RFari (31 %). In earlier studies RFari by sulfate increased in GCMs by about 10 % when an idealized distribution for RH was implemented . Further studies found that GCMs underestimate RFari of sulfate when subgrid-scale variability in RH is not taken into account by 73 % in a limited-area model case study , by 30 to 80 % in a study that used a cloud-resolving model over a tropical ocean and a mid-latitude continental region and by 30 to 40 % in a regional study (Europe and much of the North Atlantic) with a high-resolution model . Hence, our study is in line with previous studies based on limited-area models. The effect of including RH subgrid variability, however, is bigger than the one found in the early global model study by .

One might be able to further improve the parameterization of subgrid-scale variability in ${\text{RH}}_{\mathrm{cls}}$ by applying the subsaturated part of the $\mathit{\beta }$-function from the optional cloud cover scheme that prognostically treats the total-water variability PDF. Furthermore, Fig. 2 in indicates that the critical relative humidity, RH${}_{\mathrm{crit}}$, that defines the width of the introduced RH${}_{\mathrm{cls}}$-PDF varies horizontally on the same scale as vertically. Therefore, the width of the ${\text{RH}}_{\mathrm{cls}}$-PDF could be extended from just height-dependent to height- and zonal- or even height-, zonal- and meridional-dependent.