Proof of Nuprl Lemma : rcvs-on-links-from-to

Step * 1 1 1 of Lemma rcvs-on-links-from-to

1. tg1 : Id@i
2. tg2 : Id@i
3. srclocs : Id List@i
4. dstlocs : Id List@i
5. d : Id@i
6. (d ∈ dstlocs)@i
7. s : Id@i
8. (s ∈ srclocs)@i
9. ↑isrcv(rcv((link(tg2) from s to d),tg1))
10. tag(rcv((link(tg2) from s to d),tg1)) = tg1 ∈ Id
⊢ {(source(lnk(rcv((link(tg2) from s to d),tg1))) ∈ srclocs)
∧ (destination(lnk(rcv((link(tg2) from s to d),tg1))) ∈ dstlocs)
∧ (lname(lnk(rcv((link(tg2) from s to d),tg1))) = tg2 ∈ Id)}
BY
{ (Reduce 0 THEN D 0 THEN Auto)⋅ }

Latex:

1. tg1 : Id@i 2. tg2 : Id@i 3. srclocs : Id List@i 4. dstlocs : Id List@i 5. d : Id@i 6. (d \mmember{} dstlocs)@i 7. s : Id@i 8. (s \mmember{} srclocs)@i 9. \muparrow{}isrcv(rcv((link(tg2) from s to d),tg1)) 10. tag(rcv((link(tg2) from s to d),tg1)) = tg1 \mvdash{} \{(source(lnk(rcv((link(tg2) from s to d),tg1))) \mmember{} srclocs) \mwedge{} (destination(lnk(rcv((link(tg2) from s to d),tg1))) \mmember{} dstlocs) \mwedge{} (lname(lnk(rcv((link(tg2) from s to d),tg1))) = tg2)\} By (Reduce 0 THEN D 0 THEN Auto)\mcdot{} Home Index