Again, the system works from t0 to t1: Reward paid out to juicers in total: R - R_1:Reward if sale does not happen - R_2:Reward if sale happens Returns made by juicers: r - r_a:return by juicer A - r_b:return by juicer B % of JUICE owned: S - S_A1: Share of JUICE owned by Juicer A if sale does not happen (100%) - S_A2: Share of JUICE owned by Juicer A if sale happens - S_B2: Share of JUICE owned by Juicer B if sale happens - S_A2+S_B2 = 100% Price: p --- Juicer A increases value (rewards & returns on token investments) at t1 IF: $S_{A_1}*R_{1} < S_{A_2} * R_{2} + p * (1+r_A)$ || $S_{A_1}=1$ $p >{R_{1} - S_{A_2} * R_{2} \over 1+r_A}$ Juicer B increases value (rewards & returns on token investments) at t1 IF: $p * (1+r_B) < S_{B_2} * R_{2}$ $p < {S_{B_2} * R_{2} \over 1+r_B}$ Market exchange can happen if we find a price that satisfies: ${R_{1} - S_{A_2} * R_{2} \over 1+r_A} < p < {S_{B_2} * R_{2} \over 1+r_B}$ ${R_{1} - S_{A_2} * R_{2} \over 1+r_A} < {S_{B_2} * R_{2} \over 1+r_B}$ $R_{1} - S_{A_2} * R_{2} < S_{B_2} * R_{2} * {1+r_A \over 1+r_B}$ || $/R_{2}$ ${R_{1} \over R_2} - S_{A_2} < S_{B_2}* {1+r_A \over 1+r_B}$ || ${1 \over 1+g} = {R_{1} \over R_2}$, $S_{A_2} = 1-S_{B_2}$ $g > {1 \over 1-S_{B_2}*(1-{1+r_A \over 1+r_B})}-1$