# Decision Problems Reduction in Polynomial Time

I just have a quick question. If we have two decisions problems, say L1 and L2. If L1 and can be reduced to L2 in polynomial time, then is it true that L2 CANNOT be reduced to L1 in polynomial time?

My understanding is that this would mean:

``````L1 can be reduced to L2 in polynomial time => NOT (L2 can be reduced to L1 in polynomial time)
=(L1 not in P) & (L2 in P) => (L1 in P) & (L2 not in P)
=[(L1 in P) OR (L2 not in P)] OR [(L1 in P) & L2 in P)]
=(L1 in P) OR (L2 not in P)
``````

So the statement that L1 can be reduced to L2 in polytime implies that L2 cannot be reduced to L1 in polytime is only true if L1 is in P or if L2 is not in P. As in there, if that is not the case, then the statement is false.

Does my logic make sense or am I way off? Any advice or help would be much appreciated. Thank you!

-
This question appears to be off-topic because it is about complexity theory, which is more appropriate at cs.stackexchange.com. –  templatetypedef Nov 1 '13 at 3:28