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33. The proof of this proposition is identical with Dai et al. (2022), then Condition a) is verified by Corollary 5.6 of Bouchard and Touzi (2011). Appendix C.2 Verifying Condition b) In this part, we want to prove the continuity of value function around z = K. More precisely, we have the following result Proposition 5. We have lim (t,x,y)→(t0,x̂,ŷ) V (t, x, y) = U(K), when ẑ = K. Proof of Proposition 5. On the one hand, it is easily found that lim inf (t,x,y)→(t0,x̂,ŷ) V (t, x, y) ≥ U(K). On the other hand, denote by V̂ (t, z) the value function for given wealth z at time t and without transaction costs, we then have V̂ (t, x + (1 − θ1)y+ − (1 + θ2)y− ) ≥ V (t, x, y).
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