df-marrep

Description: Define the matrices whose k-th row is replaced by 0's and an arbitrary element of the underlying ring at the l-th column. (Contributed by AV, 12-Feb-2019)

		Ref	Expression
	Assertion	df-marrep	$⊢ matRRep = (n \in V, r \in V ⟼ (m \in {Base}_{(n Mat r)}, s \in {Base}_{r} ⟼ (k \in n, l \in n ⟼ (i \in n, j \in n ⟼ if (i = k, if (j = l, s, 0_{r}), i m j)))))$

Detailed syntax breakdown

Step	Hyp	Ref	Expression
0		cmarrep	$class matRRep$
1		vn	$setvar n$
2		cvv	$class V$
3		vr	$setvar r$
4		vm	$setvar m$
5		cbs	$class Base$
6	1	cv	$setvar n$
7		cmat	$class Mat$
8	3	cv	$setvar r$
9	6 8 7	co	$class (n Mat r)$
10	9 5	cfv	$class {Base}_{(n Mat r)}$
11		vs	$setvar s$
12	8 5	cfv	$class {Base}_{r}$
13		vk	$setvar k$
14		vl	$setvar l$
15		vi	$setvar i$
16		vj	$setvar j$
17	15	cv	$setvar i$
18	13	cv	$setvar k$
19	17 18	wceq	$wff i = k$
20	16	cv	$setvar j$
21	14	cv	$setvar l$
22	20 21	wceq	$wff j = l$
23	11	cv	$setvar s$
24		c0g	$class 0_{𝑔}$
25	8 24	cfv	$class 0_{r}$
26	22 23 25	cif	$class if (j = l, s, 0_{r})$
27	4	cv	$setvar m$
28	17 20 27	co	$class (i m j)$
29	19 26 28	cif	$class if (i = k, if (j = l, s, 0_{r}), i m j)$
30	15 16 6 6 29	cmpo	$class (i \in n, j \in n ⟼ if (i = k, if (j = l, s, 0_{r}), i m j))$
31	13 14 6 6 30	cmpo	$class (k \in n, l \in n ⟼ (i \in n, j \in n ⟼ if (i = k, if (j = l, s, 0_{r}), i m j)))$
32	4 11 10 12 31	cmpo	$class (m \in {Base}_{(n Mat r)}, s \in {Base}_{r} ⟼ (k \in n, l \in n ⟼ (i \in n, j \in n ⟼ if (i = k, if (j = l, s, 0_{r}), i m j))))$
33	1 3 2 2 32	cmpo	$class (n \in V, r \in V ⟼ (m \in {Base}_{(n Mat r)}, s \in {Base}_{r} ⟼ (k \in n, l \in n ⟼ (i \in n, j \in n ⟼ if (i = k, if (j = l, s, 0_{r}), i m j)))))$
34	0 33	wceq	$wff matRRep = (n \in V, r \in V ⟼ (m \in {Base}_{(n Mat r)}, s \in {Base}_{r} ⟼ (k \in n, l \in n ⟼ (i \in n, j \in n ⟼ if (i = k, if (j = l, s, 0_{r}), i m j)))))$

Metamath Proof Explorer

Definition df-marrep

Detailed syntax breakdown