let GF be non empty right_complementable associative well-unital distributive Abelian add-associative right_zeroed doubleLoopStr ; :: thesis: for V being non empty right_complementable VectSp-like Abelian add-associative right_zeroed VectSpStr of GF
for W1, W2 being Subspace of V st the carrier of W1 c= the carrier of W2 holds
W1 is Subspace of W2
let V be non empty right_complementable VectSp-like Abelian add-associative right_zeroed VectSpStr of GF; :: thesis: for W1, W2 being Subspace of V st the carrier of W1 c= the carrier of W2 holds
W1 is Subspace of W2
let W1, W2 be Subspace of V; :: thesis: ( the carrier of W1 c= the carrier of W2 implies W1 is Subspace of W2 )
assume A1: the carrier of W1 c= the carrier of W2 ; :: thesis: W1 is Subspace of W2
set VW1 = the carrier of W1;
set VW2 = the carrier of W2;
set MW1 = the lmult of W1;
set MW2 = the lmult of W2;
set AV = the addF of V;
set MV = the lmult of V;
A2: ( 0. W1 = 0. V & 0. W2 = 0. V ) by Def2;
A3: the addF of W1 = the addF of W2 || the carrier of W1 ( the lmult of W1 = the lmult of V | [:the carrier of GF,the carrier of W1:] & the lmult of W2 = the lmult of V | [:the carrier of GF,the carrier of W2:] & [:the carrier of GF,the carrier of W1:] c= [:the carrier of GF,the carrier of W2:] ) by A1, Def2, ZFMISC_1:118;
then the lmult of W1 = the lmult of W2 | [:the carrier of GF,the carrier of W1:] by FUNCT_1:82;
hence W1 is Subspace of W2 by A1, A2, A3, Def2; :: thesis: verum