Mass Transfer in Heterogeneous Catalysis Reinhard Schomäcker
Institut für Chemie Mass Transfer in Heterogeneous Catalysis - How to get to the active site? Reinhard Schomäcker Institut für Chemie der Technischen Universität Berlin For more details see: Roland Dittmeyer and Gerhard Emig Simultaneous Heat and Mass Transfer and Chemical Reaction, chapter 6.3 in Handbook of Heterogeneous Catalysis Eds. G. Ertl, et.al Wiley-VCH, Weinhein, 2007 How to get to the active site ? Block Course “Reactivity and Catalysis” Institut für Chemie Molecular Level: e.g. Langmuir-Hinshelwood Kinetics A B K A pA θA = 1 + K A pA Adsorption Reaction Desorption = sequential steps pA= partial pressure near surface k K A p A K B pB r = k θ A θB = (1 + K A p A + K B pB )2 How to get to the active site ? Block Course “Reactivity and Catalysis” Institut für Chemie How to get to the active site ? Block Course “Reactivity and Catalysis” Institut für Chemie How to get to the active site ? Block Course “Reactivity and Catalysis” Institut für Chemie Why so different geometries? How to get to the active site ? Block Course “Reactivity and Catalysis” Institut für Chemie τ = VR/VF τ = VR/q uF How to get to the active site ? Block Course “Reactivity and Catalysis” Institut für Chemie Pressure drop in a fixed bed channel 1 d 2 Δp u= 32 η L 2 k d Δp u0 u = F (ε ) = η L ε 1 ε 3 d k2 Δp u0 = 150 (1 − ε )2 ηL 2 ( 1− ε ) λ (Re ) = ε3 laminar How to get to the active site ? 300 Re 1 ⎛ ε ⎞ F (ε ) = ⎜ ⎟ 150 ⎝ 1 − ε ⎠ 2 L 1 2 Δp = λ (Re ) ρu0 dk 2 ( 1 − ε ) ⎡ 300(1 − ε ) ⎤ λ (Re ) = + 3,5 ε3 ⎢⎣ Re ⎥⎦ laminar und turbulent, Ergun-Eq. Block Course “Reactivity and Catalysis” Institut für Chemie Sequential steps: Pressure driven flow, Film diffusion, Pore diffusion How to get to the active site ? Block Course “Reactivity and Catalysis” Institut für Chemie Steps of Heterogeneous Reaction 1. 2. 3. 4. 5. 6. 7. Diffusion of reactant to catalyst Transport of reactant within catalyst pores Adsorption of reactant on catalyst surface Reaction Desorption of products from catalyst surface Transport of products out of catalyst pores Diffusion of products away from catalyst Transport and reaction occure simultaneously (at a catalyst under steady state conditions) How to get to the active site ? Block Course “Reactivity and Catalysis” Institut für Chemie Impact of mass transfer limitation Feed k>D How to get to the active site ? Feed k<D Block Course “Reactivity and Catalysis” Institut für Chemie Mass Transport and Heterogeneous Catalysis Surface layer Principles fluid phase catalyst Concentration profile Mass transport influence Influence of mass transport on the temperature dependance of het. catalysis How to get to the active site ? Block Course “Reactivity and Catalysis” Institut für Chemie How to get to the active site ? Block Course “Reactivity and Catalysis” Institut für Chemie How to get to the active site ? Block Course “Reactivity and Catalysis” Institut für Chemie Time Scales in a Reactor residence time τ = VR/VF Mixing time Θ Time constant of reaction = CM,0/R0 Time constant of diffusion = R2/De How to get to the active site ? Block Course “Reactivity and Catalysis” Institut für Chemie Description of pore diffusion grad c → j = − D grad c → 1. Fick`s Law Dg = j A 1 Λw 2 Λ= k BT 2 πσ 2 p Average free path length w= 8 k BT πm Average molecular velocity Dg ~ T1,5 How to get to the active site ? und Dg ~ 1/p Block Course “Reactivity and Catalysis” Institut für Chemie a) Diffusion in pores dp >> λ D eff = D g ε τ b) Knudsen – Diffusion D eff Tortuosity τ≈ L X dp = λ ε 1 dp ε = DK = w τ 2 2 τ DK ~ T0.5 c) Intermediate range D eff = How to get to the active site ? 1 ε 1 1 τ + Dg DK Block Course “Reactivity and Catalysis” Institut für Chemie a) Diffusion in pores dp >> λ D eff = D g ε τ b) Knudsen – Diffusion D eff Wicke-Kallenbach-Experiment N 2, X N2 dp = λ porous material ε 1 dp ε = DK = w τ 2 2 τ DK ~ T0.5 c) Intermediate range D eff = How to get to the active site ? N2, X =? 1 ε 1 1 τ + Dg DK → j x = − Degradc x Block Course “Reactivity and Catalysis” Institut für Chemie Simultaneous reaction and pore diffusion in a sperical particle temporal change of materials within volume element = changes of material amount by transport + changes caused by reactions Mass balance dV dci ∫ dt dV = − ∫ ( ji do) + ∫ νi r dV V V ∫ ( j do) = ∫ div j dV V → dc i = − div ji + νi r dt one dimensional Spherical geometry How to get to the active site ? → div j = → div j = d jz dz 1 d 2 ( R jR ) 2 R dR Block Course “Reactivity and Catalysis” Institut für Chemie 0=− 1 d 2 ( R ji R ) + νi r 2 R dR Mass balance of sperical particle in steady state Solution of mass balance and description of average reaction rate d 2 c 2 dc Deff ( 2 + ) = k cn R dR dR with r= kcn and ν=-1 c( R = R 0 ) = c 0 dc R =0 = 0 dR kc 0n−1 Deff renormalized parameter = Thiele-Modulus R Φ0 ) R0 sinh Φ0 radial concentration profil within sperical pellet Φ0 = R 0 R c( R ) = c0 0 R How to get to the active site ? sinh( Block Course “Reactivity and Catalysis” Institut für Chemie k<D k>D How to get to the active site ? Block Course “Reactivity and Catalysis” Institut für Chemie rVs = As Deff rhet dc dR r = rhet R =R0 3 co Φ0 = D eff ( − 1) R0 R 0 tanh Φ 0 rhom = k c 0 η= Porenwirkungsgrad effectiveness factor 1 Reaction without mass transport limitation rhet 3 1 1 = ( − ) rhom Φ 0 tanh Φ 0 Φ 0 Effectiveness factor 0,8 0,6 0,4 0,2 0 0 5 10 15 20 Thiele-Modul How to get to the active site ? Block Course “Reactivity and Catalysis” Institut für Chemie How to get to the active site ? Block Course “Reactivity and Catalysis” Institut für Chemie Influence of temperature 3 η≈ Φ0 rhet 3 3 = k c0 = Φ0 R0 k eff ≅ Deff k Deff k c0 = k eff c0 k E eff = 1 (E + ED ) 2 Influence of pore diffusion on effective rate constant How to get to the active site ? Block Course “Reactivity and Catalysis” Institut für Chemie Film diffusion und Reaction nDiff = Sa D c0 − c W δ . n Diff = Sa β( c 0 − c W ), ⎡ mol ⎤ ⎢ 3 ⎥ ⎢⎣ s * m ⎥⎦ 1 1 dn i r= νi V dt r = rSa , How to get to the active site ? k = k Sa 1 1 dn i rS = νi Sa dt D mit β = δ ⎡ mol ⎤ ⎢ 2 ⎥ ⎢⎣ s * m ⎥⎦ Sa mit: a = V Block Course “Reactivity and Catalysis” Institut für Chemie . n = Sa β (c0 − cW ) = Sa rS (cW ) Discussion of a first order reaction with rs=kscw ß(c0-cw) = kscw c 0β cW = β + kS Border cases: ks << ß cw =c0 ks >> ß cw ≈ 0 c0 ( no layer formation) cw c0 cw How to get to the active site ? Block Course “Reactivity and Catalysis” Institut für Chemie βk S rS = k S cW = c0 = k S ,eff c0 β + kS 1 k S,eff 1 1 = + kS β Calculation of eff. volume related rate constant k eff = a k S,eff = a = 1 1 + ks β Particle surface Particle volume 1 1 1 = + k eff aβ ηk How to get to the active site ? a = 1 1 1 + k aβ π = π 6 d d 2 3 = 6 dsphere Block Course “Reactivity and Catalysis” Institut für Chemie Temperature dependance: How to get to the active site ? Block Course “Reactivity and Catalysis” Institut für Chemie Criteria to exclude mass transfer limitations Generalized Thiele-Modulus Criterion with mesasurable data only: Weisz-Modulus <1 1 effectiveness Porenwirkungsgrad factor 0,8 0,6 0,4 0,2 0 0 5 10 Thiele-Modul How to get to the active site ? Block Course “Reactivity and Catalysis” 15 Institut für Chemie Experimental check for pore diffusion Reduce particle size decrease φ increase η το 1 for film diffusion Decrease reactor diameter τ=VR/Vf increase u = Vf/q increase ß = D/δ at constant τ, Τ, ci How to get to the active site ? at constant τ, Τ, ci Block Course “Reactivity and Catalysis” Institut für Chemie How to get to the active site ? Block Course “Reactivity and Catalysis” Institut für Chemie How to get to the active site ? Block Course “Reactivity and Catalysis”
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