Calculating the air-sea flux of any trace gas: transfer velocity, chemical enhancement and uncertainty

Calculating the air-sea flux of any trace gas: transfer velocity, chemical enhancement and uncertainty ,[object Object]

Calculating temperature- and salinity-dependent diffusive transfer velocities for any gas

Liss and Slater (1974) revisited ,[object Object]

Wider application ,[object Object]

The effect of bubbles ,[object Object]

Global analysis of potential error ,[object Object],Calculating the air-sea flux of any trace gas: transfer velocity, chemical enhancement and uncertainty

Many for poorly studied gases (i,.e. Not GHGs, noble gases, O 2 or DMS) ,[object Object],[object Object],[object Object],[object Object]

Notwithstanding the need to choose the 'best' transfer velocity parameterisations; solubility and diffusivity of the gas, and viscosity of the medium must be quantified for the gas of interest

When is chemical enhancement potentially important?

What else should we be worrying about?

Two-layer model of gas exchange F = -K. Δ C = -K a (C g -C sg ) = -K w (C sl -C l ) C sg = K H . C sl Liss, P.S and Slater, P.G., 1974, Nature (247), 181-184

J ä hne, B. (2009), Air-sea gas exchange in Encyclopedia of Ocean Science, second edition 147-156. Two-layer model of gas exchange F = -K. Δ C = -K a (C g -C sg ) = -K w (C sl -C l ) C sg = K H . C sl 1/K w = 1/K H .k a + 1/k w 1/K a = 1/k a + K H /k w R l = r l + r g (R g = r l '+r g ') R = r1+r2 V r1 r2

Liquid phase transfer velocity, k l k l = f(u x ). (S c /S c 0 ) -0.5 S c = η/ρD k l commonly expressed as an exponential function of windspeed (u) scaled by the square root (or other negative exponent) of the ratio of the Schmidt number of the gas in question to a reference Schmidt number (S c 0 ) n – viscosity of seawater (T, S and composition dependent) p – density (T, S and composition dependent) D – diffusion coefficient of gas in question (dependent itself on the viscosity and also the molecular weight of the medium, and also the molcular weight and molecular volume of the gas in question).

Liquid phase transfer velocity, k l

In press, Ocean Science... Temperature Salinity Wind speed Solubility at STP T dependence of solubility Molecular structure Gas-specific data Physical forcings Henry solubility in water Diffusion coefficients in air and water Viscosity of air and water Schmidt numbers in air and water k w – Nightingale2000, Wanninkhof92, Woolf97 (bubbles) and various others k a – various schemes including Duce91, Jeffrey2010 K w and K a (1/K w = 1/k w + H/k a ) All parameters T dependent (and S dependent for water side) Outputs Temperature Salinity Wind speed Solubility at STP T dependence of solubility Molecular structure Gas-specific data Physical forcings Henry solubility in water Diffusion coefficients in air and water Viscosity of air and water Schmidt numbers in air and water k w – Nightingale2000, Wanninkhof92, Woolf97 (bubbles) and various others k a – various schemes including Duce91, Jeffrey2010 K w and K a (1/K w = 1/k w + H/k a ) All parameters T dependent (and S dependent for water side) Outputs

Salinity dependence of K H determined from novel relationship derived from empirical data on gas solubilities in seawater

V b calculated using 'Schroeder' additive method

Diffusivities of gases in air and water and viscosities of air and water calculated from best available paramterisations

Transfer velocities: various parameterisations of k l and k g implemented. Nightingale et al 2000 (k l ) and Jeffrey et al 2010 (k g ) used here.

Key assumptions: neutral bouyancy, all the assumptions made by the k l and k g parameterisations selected(!) ,[object Object]

T-dependence of K H (- Δ soln H/R )

Molecular structure (in order to calculate liquid molar volume at boiling point, V b )

Wind speed, temperature, salinity Temperature Salinity Wind speed Solubility at STP T dependence of solubility Molecular structure Gas-specific data Physical forcings Henry solubility in water Diffusion coefficients in air and water Viscosity of air and water Schmidt numbers in air and water k w – Nightingale2000, Wanninkhof92, Woolf97 (bubbles) k a – various schemes including Duce91, Jeffrey2010 K w and K a (1/K w = 1/k w + H/k a ) All parameters T dependent (and S dependent for water side) Outputs

Total transfer velocity K H k g k l u 10 T S K H 0 - Δ soln H/R Sc g Sc l D g D l ν g ν l η g T η l T,S Sensitivity analysis ρ g T ρ l T,S V b C D k g k l Estimated parameter /% uncertainty Highly soluble gas e.g. NH 3 Sparingly soluble gas. e.g CO 2 50 50 10 25 5 5 10 10 25 10 10 10 10 0.1 50 10 16 -0.04 4 0.05 -0.05 -1 10 1 -1 9 40 2 1 2 -0.2 2 4 4 -6 20 0.1 -0.1 1 Sparingly soluble gas. e.g CO 2 Highly soluble gas e.g. NH 3 Estimated parameter /% uncertainty D l D g 25 25 0.1 3 11 0.3 Table presents percentage change in total transfer velocity over range of parameter uncertainty

Really important to know when to use k w or k a on their own rather than K l (or K a )

Early estimates of k g and k l for H 2 O and O 2 and some trace gases of interest: ,[object Object],[object Object]

log(r g /r l ) for a suite of trace gases Log (r g /r l ) = 0 -> r g = r l -> 50% contribution to total transfer from both phases Log (r g /r l ) = 1 -> r g /r l = 10 -> 10% of total resistance due to liquid phase Log (r g /r l ) = -1 -> r g /r l = 0.1 -> 10% contribution to resistance from gas phase Log (r g /r l ) = 2 -> 1% contribution to transfer from liquid phase Log (r g /r l ) = -3 -> 0.1% contribution to transfer from gas phase

K H dependence of r g /r l For gases with solubility between 0.1 and 1000 mol/L/atm, both phases need to be considered in quantifying total transfer veloctiy

H2S CH3Cl C6H5CH3 CH3Br C2H5I CH3I HI CHCl3 CHI3 CH2CL2 DMS DES 2Butylnitrate Br2 2Propylnitrate CH2ICl BrCl DMDS 1Propylnitrate 1Butylnitrate HBr CH2Br2 SO2 Ethylnitrate CH2IBr CHBr3 Methylnitrate CH2I2 PPN I2 methylmethanoate PAN TEA methylethanoate TMA HCN propanal ethanal butanone HCl NHCl2 acetone OH DEA DMA nitromethane HNO2 MEA CH3CN NH3 2Nitrophenol HOBr NH2Cl MMA ICl MeOH EtOH IBr methylperoxide ethylperoxide IO HOI Phenol methanal HO2 K H dependence of r g /r l

r g /r l compared with Liss and Slater 1974

Chemical enhancement of k l (and k g ?): Hoover and Berkshire 1969 α = τ / {(τ-1) + (tanh(x)/x)} where x = z(k hyd .τ/D) 1/2 z = layer thickness (inversely related to wind speed) D = molecular diffusivity of gas in medium k hyd = rate of (hydration) reaction of gas in seawater τ = 1+ ([unreacted gas]/[reacted products]) Tanh(x)/x When k hyd slow, x is small, tanh(x)/x=1, α = 1 When k hyd v fast, x is large, tanh(x)/x=0, α max = τ / (τ-1) = e.g. 1+ [XH 2 O] /[X] Hoover and Berkshire assume stagnant film model, which probably underestimates potential chemical enhancement for reversible reactions Assumptions: 1. Stagnant film model applies 2. reaction can be represented by pseudo-first-order rate constant – i.e. rate is proportional to concentration of gas of interest and independent of all other factors

Calculating the air-sea flux of any trace gas: transfer velocity, chemical enhancement and uncertainty

Empfohlen

Empfohlen

Weitere ähnliche Inhalte

Was ist angesagt?

Was ist angesagt? (18)

Andere mochten auch

Andere mochten auch (10)

Ähnlich wie Calculating the air-sea flux of any trace gas: transfer velocity, chemical enhancement and uncertainty

Ähnlich wie Calculating the air-sea flux of any trace gas: transfer velocity, chemical enhancement and uncertainty (20)

Kürzlich hochgeladen

Kürzlich hochgeladen (20)

Calculating the air-sea flux of any trace gas: transfer velocity, chemical enhancement and uncertainty