Proof of Nuprl Lemma : bm_T'

Step * 1 1 3 of Lemma bm_T'_wf

1. T : Type
2. Key : Type
3. k : Key
4. v : T
5. key : Key
6. value : T
7. cnt : ℤ
8. k1 : Key
9. v1 : T
10. c1 : ℤ
11. left : binary_map(T;Key)
12. l5 : binary_map(T;Key)
13. cnt = (1 + c1 + 0) ∈ ℤ
14. ↑bm_cnt_prop(bm_T(k1;v1;c1;left;l5))
⊢ bm_double_L(k;v;bm_E();bm_T(key;value;cnt;bm_T(k1;v1;c1;left;l5);bm_E())) ∈ binary-map(T;Key)
BY
{ (Auto
   THEN Try (Complete ((MemTypeCD THEN Auto THEN Reduce 0 THEN Auto)))
   THEN MemTypeCD
   THEN Auto
   THEN BLemma `bm_cnt_prop_T`
   THEN Reduce 0
   THEN Auto) }

Latex:

1. T : Type 2. Key : Type 3. k : Key 4. v : T 5. key : Key 6. value : T 7. cnt : \mBbbZ{} 8. k1 : Key 9. v1 : T 10. c1 : \mBbbZ{} 11. left : binary\_map(T;Key) 12. l5 : binary\_map(T;Key) 13. cnt = (1 + c1 + 0) 14. \muparrow{}bm\_cnt\_prop(bm\_T(k1;v1;c1;left;l5)) \mvdash{} bm\_double\_L(k;v;bm\_E();bm\_T(key;value;cnt;bm\_T(k1;v1;c1;left;l5);bm\_E())) \mmember{} binary-map(T;Key) By (Auto THEN Try (Complete ((MemTypeCD THEN Auto THEN Reduce 0 THEN Auto))) THEN MemTypeCD THEN Auto THEN BLemma `bm\_cnt\_prop\_T` THEN Reduce 0 THEN Auto) Home Index