Do you want to keep the same number of segments? Do you need to keep continuity between Bezier segments? Are you trying to hit a certain number of segments, or just keep things within a certain tolerance of the original curve?
For now I'll assume that you want to reduce the number of Bezier segments, any you need to keep G1 continuity between the segments, and you're trying to smooth within a tolerance (just guessing from your image).
For the top-level algorithm, you go through every adjacent pair of curves, and try to combine them. Repeat this until combining two adjacent curves would fall outside of your tolerance.
How do you combine two adjacent Bezier curves? Let's assume that they are curves P and Q, and since they're both cubic they have 4 CVs each, P0, P1, P2, P3 and Q0, Q1, Q2, Q3. We'll also assume that P3 == Q0. Also, we'll say that the output curve is R, composed of R0, R1, R2, R3.
One other very important step - you need to assign t values for each Bezier curve segment within the larger curve that you're simplifying. So, segment 0 would go from 0..1, segment 1 goes from 1..2, segment 2 goes from 2..3, etc.
If you want to maintain P's continuity with its neighbor, and Q's continuity with its neighbor, you can't move P0 or Q3, and the tangent vectors formed by (P1-P0) and (Q2-Q3) must stay in the same direction.. they can only be scaled.
Since you only have 4 CVs in R, those two scale factors are the only degree of freedom that you have. We'll call them kp and kq.
R0=P0
R1=P0+kp*(P1-P0)
R2=Q3+kq*(Q2-Q3)
R3=Q3
If the knot length of the two curves are equal, than kp = 2 and kq = 2.