xrge0slmod

Description: The extended nonnegative real numbers form a semiring left module. One could also have used subringAlg to get the same structure. (Contributed by Thierry Arnoux, 6-Sep-2018)

	Ref	Expression
Hypotheses	xrge0slmod.1	\|- G = ( RR*s \|`s ( 0 [,] +oo ) )
	xrge0slmod.2	\|- W = ( G \|`v ( 0 [,) +oo ) )
Assertion	xrge0slmod	\|- W e. SLMod

Proof

Step	Hyp	Ref	Expression
1		xrge0slmod.1	\|- G = ( RR*s \|`s ( 0 [,] +oo ) )
2		xrge0slmod.2	\|- W = ( G \|`v ( 0 [,) +oo ) )
3		xrge0cmn	\|- ( RR*s \|`s ( 0 [,] +oo ) ) e. CMnd
4	1 3	eqeltri	\|- G e. CMnd
5		ovex	\|- ( 0 [,) +oo ) e. _V
6	2	resvcmn	\|- ( ( 0 [,) +oo ) e. _V -> ( G e. CMnd <-> W e. CMnd ) )
7	5 6	ax-mp	\|- ( G e. CMnd <-> W e. CMnd )
8	4 7	mpbi	\|- W e. CMnd
9		rge0srg	\|- ( CCfld \|`s ( 0 [,) +oo ) ) e. SRing
10		icossicc	\|- ( 0 [,) +oo ) C_ ( 0 [,] +oo )
11		simplr	\|- ( ( ( q e. ( 0 [,) +oo ) /\ r e. ( 0 [,) +oo ) ) /\ ( x e. ( 0 [,] +oo ) /\ w e. ( 0 [,] +oo ) ) ) -> r e. ( 0 [,) +oo ) )
12	10 11	sselid	\|- ( ( ( q e. ( 0 [,) +oo ) /\ r e. ( 0 [,) +oo ) ) /\ ( x e. ( 0 [,] +oo ) /\ w e. ( 0 [,] +oo ) ) ) -> r e. ( 0 [,] +oo ) )
13		simprr	\|- ( ( ( q e. ( 0 [,) +oo ) /\ r e. ( 0 [,) +oo ) ) /\ ( x e. ( 0 [,] +oo ) /\ w e. ( 0 [,] +oo ) ) ) -> w e. ( 0 [,] +oo ) )
14		ge0xmulcl	\|- ( ( r e. ( 0 [,] +oo ) /\ w e. ( 0 [,] +oo ) ) -> ( r *e w ) e. ( 0 [,] +oo ) )
15	12 13 14	syl2anc	\|- ( ( ( q e. ( 0 [,) +oo ) /\ r e. ( 0 [,) +oo ) ) /\ ( x e. ( 0 [,] +oo ) /\ w e. ( 0 [,] +oo ) ) ) -> ( r *e w ) e. ( 0 [,] +oo ) )
16		simprl	\|- ( ( ( q e. ( 0 [,) +oo ) /\ r e. ( 0 [,) +oo ) ) /\ ( x e. ( 0 [,] +oo ) /\ w e. ( 0 [,] +oo ) ) ) -> x e. ( 0 [,] +oo ) )
17		xrge0adddi	\|- ( ( w e. ( 0 [,] +oo ) /\ x e. ( 0 [,] +oo ) /\ r e. ( 0 [,] +oo ) ) -> ( r e ( w +e x ) ) = ( ( r e w ) +e ( r *e x ) ) )
18	13 16 12 17	syl3anc	\|- ( ( ( q e. ( 0 [,) +oo ) /\ r e. ( 0 [,) +oo ) ) /\ ( x e. ( 0 [,] +oo ) /\ w e. ( 0 [,] +oo ) ) ) -> ( r e ( w +e x ) ) = ( ( r e w ) +e ( r *e x ) ) )
19		rge0ssre	\|- ( 0 [,) +oo ) C_ RR
20		simpll	\|- ( ( ( q e. ( 0 [,) +oo ) /\ r e. ( 0 [,) +oo ) ) /\ ( x e. ( 0 [,] +oo ) /\ w e. ( 0 [,] +oo ) ) ) -> q e. ( 0 [,) +oo ) )
21	19 20	sselid	\|- ( ( ( q e. ( 0 [,) +oo ) /\ r e. ( 0 [,) +oo ) ) /\ ( x e. ( 0 [,] +oo ) /\ w e. ( 0 [,] +oo ) ) ) -> q e. RR )
22	19 11	sselid	\|- ( ( ( q e. ( 0 [,) +oo ) /\ r e. ( 0 [,) +oo ) ) /\ ( x e. ( 0 [,] +oo ) /\ w e. ( 0 [,] +oo ) ) ) -> r e. RR )
23		rexadd	\|- ( ( q e. RR /\ r e. RR ) -> ( q +e r ) = ( q + r ) )
24	21 22 23	syl2anc	\|- ( ( ( q e. ( 0 [,) +oo ) /\ r e. ( 0 [,) +oo ) ) /\ ( x e. ( 0 [,] +oo ) /\ w e. ( 0 [,] +oo ) ) ) -> ( q +e r ) = ( q + r ) )
25	24	oveq1d	\|- ( ( ( q e. ( 0 [,) +oo ) /\ r e. ( 0 [,) +oo ) ) /\ ( x e. ( 0 [,] +oo ) /\ w e. ( 0 [,] +oo ) ) ) -> ( ( q +e r ) e w ) = ( ( q + r ) e w ) )
26	10 20	sselid	\|- ( ( ( q e. ( 0 [,) +oo ) /\ r e. ( 0 [,) +oo ) ) /\ ( x e. ( 0 [,] +oo ) /\ w e. ( 0 [,] +oo ) ) ) -> q e. ( 0 [,] +oo ) )
27		xrge0adddir	\|- ( ( q e. ( 0 [,] +oo ) /\ r e. ( 0 [,] +oo ) /\ w e. ( 0 [,] +oo ) ) -> ( ( q +e r ) e w ) = ( ( q e w ) +e ( r *e w ) ) )
28	26 12 13 27	syl3anc	\|- ( ( ( q e. ( 0 [,) +oo ) /\ r e. ( 0 [,) +oo ) ) /\ ( x e. ( 0 [,] +oo ) /\ w e. ( 0 [,] +oo ) ) ) -> ( ( q +e r ) e w ) = ( ( q e w ) +e ( r *e w ) ) )
29	25 28	eqtr3d	\|- ( ( ( q e. ( 0 [,) +oo ) /\ r e. ( 0 [,) +oo ) ) /\ ( x e. ( 0 [,] +oo ) /\ w e. ( 0 [,] +oo ) ) ) -> ( ( q + r ) e w ) = ( ( q e w ) +e ( r *e w ) ) )
30	15 18 29	3jca	\|- ( ( ( q e. ( 0 [,) +oo ) /\ r e. ( 0 [,) +oo ) ) /\ ( x e. ( 0 [,] +oo ) /\ w e. ( 0 [,] +oo ) ) ) -> ( ( r e w ) e. ( 0 [,] +oo ) /\ ( r e ( w +e x ) ) = ( ( r e w ) +e ( r e x ) ) /\ ( ( q + r ) e w ) = ( ( q e w ) +e ( r *e w ) ) ) )
31		rexmul	\|- ( ( q e. RR /\ r e. RR ) -> ( q *e r ) = ( q x. r ) )
32	21 22 31	syl2anc	\|- ( ( ( q e. ( 0 [,) +oo ) /\ r e. ( 0 [,) +oo ) ) /\ ( x e. ( 0 [,] +oo ) /\ w e. ( 0 [,] +oo ) ) ) -> ( q *e r ) = ( q x. r ) )
33	32	oveq1d	\|- ( ( ( q e. ( 0 [,) +oo ) /\ r e. ( 0 [,) +oo ) ) /\ ( x e. ( 0 [,] +oo ) /\ w e. ( 0 [,] +oo ) ) ) -> ( ( q e r ) e w ) = ( ( q x. r ) *e w ) )
34	21	rexrd	\|- ( ( ( q e. ( 0 [,) +oo ) /\ r e. ( 0 [,) +oo ) ) /\ ( x e. ( 0 [,] +oo ) /\ w e. ( 0 [,] +oo ) ) ) -> q e. RR* )
35	22	rexrd	\|- ( ( ( q e. ( 0 [,) +oo ) /\ r e. ( 0 [,) +oo ) ) /\ ( x e. ( 0 [,] +oo ) /\ w e. ( 0 [,] +oo ) ) ) -> r e. RR* )
36		iccssxr	\|- ( 0 [,] +oo ) C_ RR*
37	36 13	sselid	\|- ( ( ( q e. ( 0 [,) +oo ) /\ r e. ( 0 [,) +oo ) ) /\ ( x e. ( 0 [,] +oo ) /\ w e. ( 0 [,] +oo ) ) ) -> w e. RR* )
38		xmulass	\|- ( ( q e. RR* /\ r e. RR* /\ w e. RR* ) -> ( ( q e r ) e w ) = ( q e ( r e w ) ) )
39	34 35 37 38	syl3anc	\|- ( ( ( q e. ( 0 [,) +oo ) /\ r e. ( 0 [,) +oo ) ) /\ ( x e. ( 0 [,] +oo ) /\ w e. ( 0 [,] +oo ) ) ) -> ( ( q e r ) e w ) = ( q e ( r e w ) ) )
40	33 39	eqtr3d	\|- ( ( ( q e. ( 0 [,) +oo ) /\ r e. ( 0 [,) +oo ) ) /\ ( x e. ( 0 [,] +oo ) /\ w e. ( 0 [,] +oo ) ) ) -> ( ( q x. r ) e w ) = ( q e ( r *e w ) ) )
41		xmullid	\|- ( w e. RR* -> ( 1 *e w ) = w )
42	37 41	syl	\|- ( ( ( q e. ( 0 [,) +oo ) /\ r e. ( 0 [,) +oo ) ) /\ ( x e. ( 0 [,] +oo ) /\ w e. ( 0 [,] +oo ) ) ) -> ( 1 *e w ) = w )
43		xmul02	\|- ( w e. RR* -> ( 0 *e w ) = 0 )
44	37 43	syl	\|- ( ( ( q e. ( 0 [,) +oo ) /\ r e. ( 0 [,) +oo ) ) /\ ( x e. ( 0 [,] +oo ) /\ w e. ( 0 [,] +oo ) ) ) -> ( 0 *e w ) = 0 )
45	40 42 44	3jca	\|- ( ( ( q e. ( 0 [,) +oo ) /\ r e. ( 0 [,) +oo ) ) /\ ( x e. ( 0 [,] +oo ) /\ w e. ( 0 [,] +oo ) ) ) -> ( ( ( q x. r ) e w ) = ( q e ( r e w ) ) /\ ( 1 e w ) = w /\ ( 0 *e w ) = 0 ) )
46	30 45	jca	\|- ( ( ( q e. ( 0 [,) +oo ) /\ r e. ( 0 [,) +oo ) ) /\ ( x e. ( 0 [,] +oo ) /\ w e. ( 0 [,] +oo ) ) ) -> ( ( ( r e w ) e. ( 0 [,] +oo ) /\ ( r e ( w +e x ) ) = ( ( r e w ) +e ( r e x ) ) /\ ( ( q + r ) e w ) = ( ( q e w ) +e ( r e w ) ) ) /\ ( ( ( q x. r ) e w ) = ( q e ( r e w ) ) /\ ( 1 e w ) = w /\ ( 0 e w ) = 0 ) ) )
47	46	ralrimivva	\|- ( ( q e. ( 0 [,) +oo ) /\ r e. ( 0 [,) +oo ) ) -> A. x e. ( 0 [,] +oo ) A. w e. ( 0 [,] +oo ) ( ( ( r e w ) e. ( 0 [,] +oo ) /\ ( r e ( w +e x ) ) = ( ( r e w ) +e ( r e x ) ) /\ ( ( q + r ) e w ) = ( ( q e w ) +e ( r e w ) ) ) /\ ( ( ( q x. r ) e w ) = ( q e ( r e w ) ) /\ ( 1 e w ) = w /\ ( 0 e w ) = 0 ) ) )
48	47	rgen2	\|- A. q e. ( 0 [,) +oo ) A. r e. ( 0 [,) +oo ) A. x e. ( 0 [,] +oo ) A. w e. ( 0 [,] +oo ) ( ( ( r e w ) e. ( 0 [,] +oo ) /\ ( r e ( w +e x ) ) = ( ( r e w ) +e ( r e x ) ) /\ ( ( q + r ) e w ) = ( ( q e w ) +e ( r e w ) ) ) /\ ( ( ( q x. r ) e w ) = ( q e ( r e w ) ) /\ ( 1 e w ) = w /\ ( 0 e w ) = 0 ) )
49		xrge0base	\|- ( 0 [,] +oo ) = ( Base ` ( RR*s \|`s ( 0 [,] +oo ) ) )
50	1	fveq2i	\|- ( Base ` G ) = ( Base ` ( RR*s \|`s ( 0 [,] +oo ) ) )
51	49 50	eqtr4i	\|- ( 0 [,] +oo ) = ( Base ` G )
52	2 51	resvbas	\|- ( ( 0 [,) +oo ) e. _V -> ( 0 [,] +oo ) = ( Base ` W ) )
53	5 52	ax-mp	\|- ( 0 [,] +oo ) = ( Base ` W )
54		xrge0plusg	\|- +e = ( +g ` ( RR*s \|`s ( 0 [,] +oo ) ) )
55	1	fveq2i	\|- ( +g ` G ) = ( +g ` ( RR*s \|`s ( 0 [,] +oo ) ) )
56	54 55	eqtr4i	\|- +e = ( +g ` G )
57	2 56	resvplusg	\|- ( ( 0 [,) +oo ) e. _V -> +e = ( +g ` W ) )
58	5 57	ax-mp	\|- +e = ( +g ` W )
59		ovex	\|- ( 0 [,] +oo ) e. _V
60		ax-xrsvsca	\|- e = ( .s ` RRs )
61	1 60	ressvsca	\|- ( ( 0 [,] +oo ) e. _V -> *e = ( .s ` G ) )
62	59 61	ax-mp	\|- *e = ( .s ` G )
63	2 62	resvvsca	\|- ( ( 0 [,) +oo ) e. _V -> *e = ( .s ` W ) )
64	5 63	ax-mp	\|- *e = ( .s ` W )
65		xrge00	\|- 0 = ( 0g ` ( RR*s \|`s ( 0 [,] +oo ) ) )
66	1	fveq2i	\|- ( 0g ` G ) = ( 0g ` ( RR*s \|`s ( 0 [,] +oo ) ) )
67	65 66	eqtr4i	\|- 0 = ( 0g ` G )
68	2 67	resv0g	\|- ( ( 0 [,) +oo ) e. _V -> 0 = ( 0g ` W ) )
69	5 68	ax-mp	\|- 0 = ( 0g ` W )
70		df-refld	\|- RRfld = ( CCfld \|`s RR )
71	70	oveq1i	\|- ( RRfld \|`s ( 0 [,) +oo ) ) = ( ( CCfld \|`s RR ) \|`s ( 0 [,) +oo ) )
72		reex	\|- RR e. _V
73		ressress	\|- ( ( RR e. _V /\ ( 0 [,) +oo ) e. _V ) -> ( ( CCfld \|`s RR ) \|`s ( 0 [,) +oo ) ) = ( CCfld \|`s ( RR i^i ( 0 [,) +oo ) ) ) )
74	72 5 73	mp2an	\|- ( ( CCfld \|`s RR ) \|`s ( 0 [,) +oo ) ) = ( CCfld \|`s ( RR i^i ( 0 [,) +oo ) ) )
75	71 74	eqtri	\|- ( RRfld \|`s ( 0 [,) +oo ) ) = ( CCfld \|`s ( RR i^i ( 0 [,) +oo ) ) )
76		ax-xrssca	\|- RRfld = ( Scalar ` RR*s )
77	1 76	resssca	\|- ( ( 0 [,] +oo ) e. _V -> RRfld = ( Scalar ` G ) )
78	59 77	ax-mp	\|- RRfld = ( Scalar ` G )
79		rebase	\|- RR = ( Base ` RRfld )
80	2 78 79	resvsca	\|- ( ( 0 [,) +oo ) e. _V -> ( RRfld \|`s ( 0 [,) +oo ) ) = ( Scalar ` W ) )
81	5 80	ax-mp	\|- ( RRfld \|`s ( 0 [,) +oo ) ) = ( Scalar ` W )
82		incom	\|- ( ( 0 [,) +oo ) i^i RR ) = ( RR i^i ( 0 [,) +oo ) )
83		dfss2	\|- ( ( 0 [,) +oo ) C_ RR <-> ( ( 0 [,) +oo ) i^i RR ) = ( 0 [,) +oo ) )
84	19 83	mpbi	\|- ( ( 0 [,) +oo ) i^i RR ) = ( 0 [,) +oo )
85	82 84	eqtr3i	\|- ( RR i^i ( 0 [,) +oo ) ) = ( 0 [,) +oo )
86	85	oveq2i	\|- ( CCfld \|`s ( RR i^i ( 0 [,) +oo ) ) ) = ( CCfld \|`s ( 0 [,) +oo ) )
87	75 81 86	3eqtr3ri	\|- ( CCfld \|`s ( 0 [,) +oo ) ) = ( Scalar ` W )
88		ax-resscn	\|- RR C_ CC
89	19 88	sstri	\|- ( 0 [,) +oo ) C_ CC
90		eqid	\|- ( CCfld \|`s ( 0 [,) +oo ) ) = ( CCfld \|`s ( 0 [,) +oo ) )
91		cnfldbas	\|- CC = ( Base ` CCfld )
92	90 91	ressbas2	\|- ( ( 0 [,) +oo ) C_ CC -> ( 0 [,) +oo ) = ( Base ` ( CCfld \|`s ( 0 [,) +oo ) ) ) )
93	89 92	ax-mp	\|- ( 0 [,) +oo ) = ( Base ` ( CCfld \|`s ( 0 [,) +oo ) ) )
94		cnfldadd	\|- + = ( +g ` CCfld )
95	90 94	ressplusg	\|- ( ( 0 [,) +oo ) e. _V -> + = ( +g ` ( CCfld \|`s ( 0 [,) +oo ) ) ) )
96	5 95	ax-mp	\|- + = ( +g ` ( CCfld \|`s ( 0 [,) +oo ) ) )
97		cnfldmul	\|- x. = ( .r ` CCfld )
98	90 97	ressmulr	\|- ( ( 0 [,) +oo ) e. _V -> x. = ( .r ` ( CCfld \|`s ( 0 [,) +oo ) ) ) )
99	5 98	ax-mp	\|- x. = ( .r ` ( CCfld \|`s ( 0 [,) +oo ) ) )
100		cndrng	\|- CCfld e. DivRing
101		drngring	\|- ( CCfld e. DivRing -> CCfld e. Ring )
102	100 101	ax-mp	\|- CCfld e. Ring
103		1re	\|- 1 e. RR
104		0le1	\|- 0 <_ 1
105		ltpnf	\|- ( 1 e. RR -> 1 < +oo )
106	103 105	ax-mp	\|- 1 < +oo
107	103 104 106	3pm3.2i	\|- ( 1 e. RR /\ 0 <_ 1 /\ 1 < +oo )
108		0re	\|- 0 e. RR
109		pnfxr	\|- +oo e. RR*
110		elico2	\|- ( ( 0 e. RR /\ +oo e. RR* ) -> ( 1 e. ( 0 [,) +oo ) <-> ( 1 e. RR /\ 0 <_ 1 /\ 1 < +oo ) ) )
111	108 109 110	mp2an	\|- ( 1 e. ( 0 [,) +oo ) <-> ( 1 e. RR /\ 0 <_ 1 /\ 1 < +oo ) )
112	107 111	mpbir	\|- 1 e. ( 0 [,) +oo )
113		cnfld1	\|- 1 = ( 1r ` CCfld )
114	90 91 113	ress1r	\|- ( ( CCfld e. Ring /\ 1 e. ( 0 [,) +oo ) /\ ( 0 [,) +oo ) C_ CC ) -> 1 = ( 1r ` ( CCfld \|`s ( 0 [,) +oo ) ) ) )
115	102 112 89 114	mp3an	\|- 1 = ( 1r ` ( CCfld \|`s ( 0 [,) +oo ) ) )
116		ringmnd	\|- ( CCfld e. Ring -> CCfld e. Mnd )
117	100 101 116	mp2b	\|- CCfld e. Mnd
118		0e0icopnf	\|- 0 e. ( 0 [,) +oo )
119		cnfld0	\|- 0 = ( 0g ` CCfld )
120	90 91 119	ress0g	\|- ( ( CCfld e. Mnd /\ 0 e. ( 0 [,) +oo ) /\ ( 0 [,) +oo ) C_ CC ) -> 0 = ( 0g ` ( CCfld \|`s ( 0 [,) +oo ) ) ) )
121	117 118 89 120	mp3an	\|- 0 = ( 0g ` ( CCfld \|`s ( 0 [,) +oo ) ) )
122	53 58 64 69 87 93 96 99 115 121	isslmd	\|- ( W e. SLMod <-> ( W e. CMnd /\ ( CCfld \|`s ( 0 [,) +oo ) ) e. SRing /\ A. q e. ( 0 [,) +oo ) A. r e. ( 0 [,) +oo ) A. x e. ( 0 [,] +oo ) A. w e. ( 0 [,] +oo ) ( ( ( r e w ) e. ( 0 [,] +oo ) /\ ( r e ( w +e x ) ) = ( ( r e w ) +e ( r e x ) ) /\ ( ( q + r ) e w ) = ( ( q e w ) +e ( r e w ) ) ) /\ ( ( ( q x. r ) e w ) = ( q e ( r e w ) ) /\ ( 1 e w ) = w /\ ( 0 e w ) = 0 ) ) ) )
123	8 9 48 122	mpbir3an	\|- W e. SLMod

Metamath Proof Explorer

Theorem xrge0slmod

Proof