Proof of Nuprl Lemma : aa_min_w_unit

Step * 1 of Lemma aa_min_w_unit_prop1

1. i :

@i
2. wu :

?@i

j:

. (case wu of inl(intval2) => inl imin(i;intval2) | inr(unitval2) => inl i = (inl j ))
BY
{ DVar `wu' THEN Reduce 0 THEN MaAuto }

1
1. i :

@i
2. x :

@i

j:

. ((inl imin(i;x) ) = (inl j ))

1. i : \mBbbZ{}@i 2. wu : \mBbbZ{}?@i \mvdash{} \mexists{}j:\mBbbZ{}. (case wu of inl(intval2) => inl imin(i;intval2) | inr(unitval2) => inl i = (inl j )) By DVar `wu' THEN Reduce 0 THEN MaAuto Home Index