I'm having a problem with my Coq proof and was hoping for some help and guidance. I have part of my definition below:
Inductive Architecture : Set := | Create_Architecture (Arch_Name: string)(MyComponents: list Component) (MyConnections: list Connector) with ... with Connector : Set := | Create_Connector (Con_Name:string) (client: Component)(server:Component)
I wish to say that "A component term must be either a client or server of a connection; but not both." I have come up with the following as a representation of the above in the Coq (based on my definition above):
(forall con:Connector, forall c:Component, In con (MyConnections x) -> (c = (client con) /\ c <> (server con)) \/ (c <> (client con) /\ c = (server con)))
However, I'm not sure if that is correct (is it?), as when I get to the proof, I get stuck at the point
5 subgoals con : Connector c : Component H0 : Connection1 = con ______________________________________(1/5) c = HotelRes
The type of
HotelRes is indeed Component (in this case,
HotelRes is the client of
the connection), however, since this is not in the set of assumptions, I cant
use something like the exact or auto tactics.
How could I proceed with such a proof? Thanks in advance.