shslej

Description: Subspace sum is smaller than subspace join. Remark in Kalmbach p. 65. (Contributed by NM, 12-Jul-2004) (New usage is discouraged.)

		Ref	Expression
	Assertion	shslej	\|- ( ( A e. SH /\ B e. SH ) -> ( A +H B ) C_ ( A vH B ) )

Step	Hyp	Ref	Expression
1		oveq1	\|- ( A = if ( A e. SH , A , ~H ) -> ( A +H B ) = ( if ( A e. SH , A , ~H ) +H B ) )
2		oveq1	\|- ( A = if ( A e. SH , A , ~H ) -> ( A vH B ) = ( if ( A e. SH , A , ~H ) vH B ) )
3	1 2	sseq12d	\|- ( A = if ( A e. SH , A , ~H ) -> ( ( A +H B ) C_ ( A vH B ) <-> ( if ( A e. SH , A , ~H ) +H B ) C_ ( if ( A e. SH , A , ~H ) vH B ) ) )
4		oveq2	\|- ( B = if ( B e. SH , B , ~H ) -> ( if ( A e. SH , A , ~H ) +H B ) = ( if ( A e. SH , A , ~H ) +H if ( B e. SH , B , ~H ) ) )
5		oveq2	\|- ( B = if ( B e. SH , B , ~H ) -> ( if ( A e. SH , A , ~H ) vH B ) = ( if ( A e. SH , A , ~H ) vH if ( B e. SH , B , ~H ) ) )
6	4 5	sseq12d	\|- ( B = if ( B e. SH , B , ~H ) -> ( ( if ( A e. SH , A , ~H ) +H B ) C_ ( if ( A e. SH , A , ~H ) vH B ) <-> ( if ( A e. SH , A , ~H ) +H if ( B e. SH , B , ~H ) ) C_ ( if ( A e. SH , A , ~H ) vH if ( B e. SH , B , ~H ) ) ) )
7		helsh	\|- ~H e. SH
8	7	elimel	\|- if ( A e. SH , A , ~H ) e. SH
9	7	elimel	\|- if ( B e. SH , B , ~H ) e. SH
10	8 9	shsleji	\|- ( if ( A e. SH , A , ~H ) +H if ( B e. SH , B , ~H ) ) C_ ( if ( A e. SH , A , ~H ) vH if ( B e. SH , B , ~H ) )
11	3 6 10	dedth2h	\|- ( ( A e. SH /\ B e. SH ) -> ( A +H B ) C_ ( A vH B ) )

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