This document discusses methods for calculating the air-sea flux of trace gases, including accounting for chemical enhancement effects. It describes the two-layer model of gas exchange and parameters that influence transfer velocities in the air and water phases, such as wind speed, temperature, solubility, and gas diffusion rates. The document also addresses sources of uncertainty in flux calculations and situations where chemical reactions in water may enhance or inhibit gas transfer rates relative to classical models.
11. 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
14. Two-layer model of gas exchange F = -K. Î 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
15. J À hne, B. (2009), Air-sea gas exchange in Encyclopedia of Ocean Science, second edition 147-156. Two-layer model of gas exchange F = -K. ΠC = -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
16. Liquid phase transfer velocity, k l k l = f(u x ). (S c /S c 0 ) -0.5 S c = η/ÏD 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 â viscosity of seawater (T, S and composition dependent) p â density (T, S and composition dependent) D â 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).
18. 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 â Nightingale2000, Wanninkhof92, Woolf97 (bubbles) and various others k a â 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 â Nightingale2000, Wanninkhof92, Woolf97 (bubbles) and various others k a â 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
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20. Salinity dependence of K H determined from novel relationship derived from empirical data on gas solubilities in seawater
21. V b calculated using 'Schroeder' additive method
22. Diffusivities of gases in air and water and viscosities of air and water calculated from best available paramterisations
23. 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.
27. 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 â Nightingale2000, Wanninkhof92, Woolf97 (bubbles) k a â 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
28. Total transfer velocity K H k g k l u 10 T S K H 0 - Î soln H/R Sc g Sc l D g D l Îœ g Îœ l η g T η l T,S Sensitivity analysis Ï g T Ï 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
29. Really important to know when to use k w or k a on their own rather than K l (or K a )
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32. 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
33. 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
34. 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
36. Chemical enhancement of k l (and k g ?): Hoover and Berkshire 1969 α = Ï / {(Ï-1) + (tanh(x)/x)} where x = z(k hyd .Ï/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 Ï = 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 = Ï / (Ï-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 â i.e. rate is proportional to concentration of gas of interest and independent of all other factors
38. Chemically enhanced SO 2 transfer k a k w K w Gas phase α Liquid phase α Total enhancement r a r w r a /r w
39. Gases other than CO 2 and SO 2 , reactions other than hydration Reversible reactions i) undersaturation ii) supersaturation
40. Gases other than CO 2 and SO 2 , reactions other than hydration Irreversible reactions (e.g. photolysis) i) understaturation 2) supersaturation For an irreversible reaction that produces the gas of interest in the surface layer, a flux out would be enhanced and a flux in would be inhibited... The physics is the same in the gas phase, so the Hoover and Berkshire equation will apply there too...
41. Rate constants to give α = 2 in both gas and liquid phases (90 gases plotted)
43. Selected reaction rates Compound Gas phase reaction Rate constant / s -1 Liquid phase reaction Rate constant / s -1 NH 3 Uptake on acid sulfate aerosol 10 -5 protonation >10 9 CH 2 I 2 photolysis 10 -4 photolysis 10 -3 SO 2 - - hydration 10 6 CH 4 Oxidation by OH <10 -6 Biological turnover 10 -3 * CO 2 - - Hydration 0.04 Methanal (formaldehyde) ? ? Hydration 10 5 * estimated from bulk seawater bacterial methane turnover of 1 day -1 scaled up by factor of 100 for possible microlayer bacterial activity
44. Chemically enhanced NH 3 transfer â seawater pH ~95% total NH 3 as NH 4 + -> reasonable 'buffering' of changes to NH 3 . Protonation reaction extremely fast, therefore max thermodynamically constrained enhancement possible: α max = 1 + ([NH 4 + ]/[NH 3 ]) = 20 rg/rl Liquid phase control Gas phase control unenhanced enhanced
45. Chemically enhanced NH 3 transfer â pH 9.5 ~25% total NH 3 as NH 4 + -> poor 'buffering' of changes to NH 3 . Protonation reaction still extremely fast, therefore max thermodynamically constrained enhancement possible: α max = 1 + ([NH 4 + ]/[NH 3 ]) = 1.33 rg/rl Gas phase control Liquid phase control unenhanced enhanced
46. Effect of chemical enhancement / inhibition on K for gases of different solubilities
47. Application of chemical enhancement equation â care needed! Formaldehyde hydration reaction is very fast in water (k = 10 6 s-1) Reaction cannot easily be inhibited by e.g. changing pH Therefore Henry's law constants implicitly include hydration product and chemical enhancement is already accounted for in flux calculation!
48. Global transfer velocity climatologies We can use the transfer velocity scheme to produce gridded K fields for any gas, using climatological T and S (WOCE) and windspeed (NCEP/NCAR reanalysis) e.g. DMS: Bell and Johnson, In Prep.
51. Incompletely injected bubbles -> drive (slightly asymmetrical) enhanced transfer for insoluble gases David Woolf (1997), Bubbles and their role in gas exchange , in The Sea Surface and Global Change The effect of bubbles
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53. Therefore applying a typical k w paramaterisation may be innapropriate at high winds.
55. Johnson 2010 reproduces COARE DMS prediction and fits observations well, particularly at low/medium wind speeds.
56. Using total K w rather than k w is better (i.e. air phase transfer velocity makes a significant contribution) Reproducing observations and COARE algorithm predictions
57. Temporal / Spatial Variations in K DMS January July Bell and Johnson, In Prep. K cm hr -1
58. Differences in K caused by bubbles (using Woolf et al. 1997) January K DMS â K DMS(inc. bubble) July Bell and Johnson In Prep. cm hr -1
70. This doesn't account for effects outside of the two-layer model e.g. chemical enhancement, bubbles, microlayer effects, which are variable depending on gas properties / chemistry / biology