df-esply

Description: Define elementary symmetric polynomials. (Contributed by Thierry Arnoux, 18-Jan-2026)

		Ref	Expression
	Assertion	df-esply	\|- eSymPoly = ( i e. _V , r e. _V \|-> ( k e. NN0 \|-> ( ( ZRHom ` r ) o. ( ( _Ind ` { h e. ( NN0 ^m i ) \| h finSupp 0 } ) ` ( ( _Ind ` i ) " { c e. ~P i \| ( # ` c ) = k } ) ) ) ) )

Step	Hyp	Ref	Expression
0		cesply	\|- eSymPoly
1		vi	\|- i
2		cvv	\|- _V
3		vr	\|- r
4		vk	\|- k
5		cn0	\|- NN0
6		czrh	\|- ZRHom
7	3	cv	\|- r
8	7 6	cfv	\|- ( ZRHom ` r )
9		cind	\|- _Ind
10		vh	\|- h
11		cmap	\|- ^m
12	1	cv	\|- i
13	5 12 11	co	\|- ( NN0 ^m i )
14	10	cv	\|- h
15		cfsupp	\|- finSupp
16		cc0	\|- 0
17	14 16 15	wbr	\|- h finSupp 0
18	17 10 13	crab	\|- { h e. ( NN0 ^m i ) \| h finSupp 0 }
19	18 9	cfv	\|- ( _Ind ` { h e. ( NN0 ^m i ) \| h finSupp 0 } )
20	12 9	cfv	\|- ( _Ind ` i )
21		vc	\|- c
22	12	cpw	\|- ~P i
23		chash	\|- #
24	21	cv	\|- c
25	24 23	cfv	\|- ( # ` c )
26	4	cv	\|- k
27	25 26	wceq	\|- ( # ` c ) = k
28	27 21 22	crab	\|- { c e. ~P i \| ( # ` c ) = k }
29	20 28	cima	\|- ( ( _Ind ` i ) " { c e. ~P i \| ( # ` c ) = k } )
30	29 19	cfv	\|- ( ( _Ind ` { h e. ( NN0 ^m i ) \| h finSupp 0 } ) ` ( ( _Ind ` i ) " { c e. ~P i \| ( # ` c ) = k } ) )
31	8 30	ccom	\|- ( ( ZRHom ` r ) o. ( ( _Ind ` { h e. ( NN0 ^m i ) \| h finSupp 0 } ) ` ( ( _Ind ` i ) " { c e. ~P i \| ( # ` c ) = k } ) ) )
32	4 5 31	cmpt	\|- ( k e. NN0 \|-> ( ( ZRHom ` r ) o. ( ( _Ind ` { h e. ( NN0 ^m i ) \| h finSupp 0 } ) ` ( ( _Ind ` i ) " { c e. ~P i \| ( # ` c ) = k } ) ) ) )
33	1 3 2 2 32	cmpo	\|- ( i e. _V , r e. _V \|-> ( k e. NN0 \|-> ( ( ZRHom ` r ) o. ( ( _Ind ` { h e. ( NN0 ^m i ) \| h finSupp 0 } ) ` ( ( _Ind ` i ) " { c e. ~P i \| ( # ` c ) = k } ) ) ) ) )
34	0 33	wceq	\|- eSymPoly = ( i e. _V , r e. _V \|-> ( k e. NN0 \|-> ( ( ZRHom ` r ) o. ( ( _Ind ` { h e. ( NN0 ^m i ) \| h finSupp 0 } ) ` ( ( _Ind ` i ) " { c e. ~P i \| ( # ` c ) = k } ) ) ) ) )

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