let G, H be finite Group; for p being Prime
for I being Subgroup of G
for P being Subgroup of H st I = P & I is_Sylow_p-subgroup_of_prime p & H is Subgroup of G holds
P is_Sylow_p-subgroup_of_prime p
let p be Prime; for I being Subgroup of G
for P being Subgroup of H st I = P & I is_Sylow_p-subgroup_of_prime p & H is Subgroup of G holds
P is_Sylow_p-subgroup_of_prime p
let I be Subgroup of G; for P being Subgroup of H st I = P & I is_Sylow_p-subgroup_of_prime p & H is Subgroup of G holds
P is_Sylow_p-subgroup_of_prime p
let P be Subgroup of H; ( I = P & I is_Sylow_p-subgroup_of_prime p & H is Subgroup of G implies P is_Sylow_p-subgroup_of_prime p )
assume A1:
I = P
; ( not I is_Sylow_p-subgroup_of_prime p or not H is Subgroup of G or P is_Sylow_p-subgroup_of_prime p )
assume A2:
I is_Sylow_p-subgroup_of_prime p
; ( not H is Subgroup of G or P is_Sylow_p-subgroup_of_prime p )
then A3:
I is p -group
;
assume
H is Subgroup of G
; P is_Sylow_p-subgroup_of_prime p
then reconsider H9 = H as Subgroup of G ;
A4:
index I = (index P) * (index H9)
by A1, GROUP_2:149;
not p divides index I
by A2;
then
not p divides index P
by A4, NAT_D:9;
hence
P is_Sylow_p-subgroup_of_prime p
by A1, A3; verum