let X be RealLinearSpace; for A, B being circled Subset of X holds A + B is circled
let A, B be circled Subset of X; A + B is circled
A1:
A + B = { (u + v) where u, v is Point of X : ( u in A & v in B ) }
by RUSUB_4:def 9;
let r be Real; RLTOPSP1:def 6 ( |.r.| <= 1 implies r * (A + B) c= A + B )
assume
|.r.| <= 1
; r * (A + B) c= A + B
then A2:
( r * A c= A & r * B c= B )
by Def6;
let x be object ; TARSKI:def 3 ( not x in r * (A + B) or x in A + B )
assume
x in r * (A + B)
; x in A + B
then consider x9 being Point of X such that
A3:
x = r * x9
and
A4:
x9 in A + B
;
consider u, v being Point of X such that
A5:
x9 = u + v
and
A6:
( u in A & v in B )
by A1, A4;
A7:
( r * u in r * A & r * v in r * B )
by A6;
x = (r * u) + (r * v)
by A3, A5, RLVECT_1:def 5;
hence
x in A + B
by A2, A7, Th3; verum