let G1, G2 be EGraph; :: thesis: for H being ESubgraph of G1

for F being PGraphMapping of G1,G2 st F is elabel-preserving holds

F | H is elabel-preserving

let H be ESubgraph of G1; :: thesis: for F being PGraphMapping of G1,G2 st F is elabel-preserving holds

F | H is elabel-preserving

let F be PGraphMapping of G1,G2; :: thesis: ( F is elabel-preserving implies F | H is elabel-preserving )

assume A1: F is elabel-preserving ; :: thesis: F | H is elabel-preserving

(the_ELabel_of G2) * ((F | H) _E) = ((the_ELabel_of G2) * (F _E)) | (the_Edges_of H) by RELAT_1:83

.= (the_ELabel_of G1) | ((dom (F _E)) /\ ((the_Edges_of H) /\ (the_Edges_of H))) by A1, RELAT_1:71

.= (the_ELabel_of G1) | ((the_Edges_of H) /\ ((dom (F _E)) /\ (the_Edges_of H))) by XBOOLE_1:16

.= (the_ELabel_of G1) | ((the_Edges_of H) /\ (dom ((F | H) _E))) by Th59

.= ((the_ELabel_of G1) | (the_Edges_of H)) | (dom ((F | H) _E)) by RELAT_1:71

.= (the_ELabel_of H) | (dom ((F | H) _E)) by GLIB_003:def 11 ;

hence F | H is elabel-preserving ; :: thesis: verum

for F being PGraphMapping of G1,G2 st F is elabel-preserving holds

F | H is elabel-preserving

let H be ESubgraph of G1; :: thesis: for F being PGraphMapping of G1,G2 st F is elabel-preserving holds

F | H is elabel-preserving

let F be PGraphMapping of G1,G2; :: thesis: ( F is elabel-preserving implies F | H is elabel-preserving )

assume A1: F is elabel-preserving ; :: thesis: F | H is elabel-preserving

(the_ELabel_of G2) * ((F | H) _E) = ((the_ELabel_of G2) * (F _E)) | (the_Edges_of H) by RELAT_1:83

.= (the_ELabel_of G1) | ((dom (F _E)) /\ ((the_Edges_of H) /\ (the_Edges_of H))) by A1, RELAT_1:71

.= (the_ELabel_of G1) | ((the_Edges_of H) /\ ((dom (F _E)) /\ (the_Edges_of H))) by XBOOLE_1:16

.= (the_ELabel_of G1) | ((the_Edges_of H) /\ (dom ((F | H) _E))) by Th59

.= ((the_ELabel_of G1) | (the_Edges_of H)) | (dom ((F | H) _E)) by RELAT_1:71

.= (the_ELabel_of H) | (dom ((F | H) _E)) by GLIB_003:def 11 ;

hence F | H is elabel-preserving ; :: thesis: verum