Metamath Proof Explorer


Theorem minveclem4b

Description: Lemma for minvec . The convergent point of the Cauchy sequence F is a member of the base space. (Contributed by Mario Carneiro, 16-Jun-2014) (Revised by Mario Carneiro, 15-Oct-2015)

Ref Expression
Hypotheses minvec.x X = Base U
minvec.m - ˙ = - U
minvec.n N = norm U
minvec.u φ U CPreHil
minvec.y φ Y LSubSp U
minvec.w φ U 𝑠 Y CMetSp
minvec.a φ A X
minvec.j J = TopOpen U
minvec.r R = ran y Y N A - ˙ y
minvec.s S = sup R <
minvec.d D = dist U X × X
minvec.f F = ran r + y Y | A D y 2 S 2 + r
minvec.p P = J fLim X filGen F
Assertion minveclem4b φ P X

Proof

Step Hyp Ref Expression
1 minvec.x X = Base U
2 minvec.m - ˙ = - U
3 minvec.n N = norm U
4 minvec.u φ U CPreHil
5 minvec.y φ Y LSubSp U
6 minvec.w φ U 𝑠 Y CMetSp
7 minvec.a φ A X
8 minvec.j J = TopOpen U
9 minvec.r R = ran y Y N A - ˙ y
10 minvec.s S = sup R <
11 minvec.d D = dist U X × X
12 minvec.f F = ran r + y Y | A D y 2 S 2 + r
13 minvec.p P = J fLim X filGen F
14 eqid LSubSp U = LSubSp U
15 1 14 lssss Y LSubSp U Y X
16 5 15 syl φ Y X
17 1 2 3 4 5 6 7 8 9 10 11 12 13 minveclem4a φ P J fLim X filGen F Y
18 17 elin2d φ P Y
19 16 18 sseldd φ P X