let n be Ordinal; :: thesis: for T being connected TermOrder of n
for L being non trivial right_complementable almost_left_invertible well-unital distributive add-associative right_zeroed associative commutative doubleLoopStr
for G, I being Subset of (Polynom-Ring (n,L)) st ( for f being Polynomial of n,L st f in I holds
PolyRedRel (G,T) reduces f, 0_ (n,L) ) holds
for f being non-zero Polynomial of n,L st f in I holds
f is_reducible_wrt G,T
let T be connected TermOrder of n; :: thesis: for L being non trivial right_complementable almost_left_invertible well-unital distributive add-associative right_zeroed associative commutative doubleLoopStr
for G, I being Subset of (Polynom-Ring (n,L)) st ( for f being Polynomial of n,L st f in I holds
PolyRedRel (G,T) reduces f, 0_ (n,L) ) holds
for f being non-zero Polynomial of n,L st f in I holds
f is_reducible_wrt G,T
let L be non trivial right_complementable almost_left_invertible well-unital distributive add-associative right_zeroed associative commutative doubleLoopStr ; :: thesis: for G, I being Subset of (Polynom-Ring (n,L)) st ( for f being Polynomial of n,L st f in I holds
PolyRedRel (G,T) reduces f, 0_ (n,L) ) holds
for f being non-zero Polynomial of n,L st f in I holds
f is_reducible_wrt G,T
let G, I be Subset of (Polynom-Ring (n,L)); :: thesis: ( ( for f being Polynomial of n,L st f in I holds
PolyRedRel (G,T) reduces f, 0_ (n,L) ) implies for f being non-zero Polynomial of n,L st f in I holds
f is_reducible_wrt G,T )
assume A1: for f being Polynomial of n,L st f in I holds
PolyRedRel (G,T) reduces f, 0_ (n,L) ; :: thesis: for f being non-zero Polynomial of n,L st f in I holds
f is_reducible_wrt G,T
hence for f being non-zero Polynomial of n,L st f in I holds
f is_reducible_wrt G,T ; :: thesis: verum