Counit morphisms for multivariate polynomials #
One may consider the ring of multivariate polynomials MvPolynomial A R
with coefficients in R
and variables indexed by A
. If A
is not just a type, but an algebra over R
,
then there is a natural surjective algebra homomorphism MvPolynomial A R →ₐ[R] A
obtained by X a ↦ a
.
Main declarations #
MvPolynomial.ACounit R A
is the natural surjective algebra homomorphismMvPolynomial A R →ₐ[R] A
obtained byX a ↦ a
MvPolynomial.counit
is an “absolute” variant withR = ℤ
MvPolynomial.counitNat
is an “absolute” variant withR = ℕ
MvPolynomial.ACounit A B
is the natural surjective algebra homomorphism
MvPolynomial B A →ₐ[A] B
obtained by X a ↦ a
.
See MvPolynomial.counit
for the “absolute” variant with A = ℤ
,
and MvPolynomial.counitNat
for the “absolute” variant with A = ℕ
.
Equations
Instances For
MvPolynomial.counit R
is the natural surjective ring homomorphism
MvPolynomial R ℤ →+* R
obtained by X r ↦ r
.
See MvPolynomial.ACounit
for a “relative” variant for algebras over a base ring,
and MvPolynomial.counitNat
for the “absolute” variant with R = ℕ
.
Equations
Instances For
MvPolynomial.counitNat A
is the natural surjective ring homomorphism
MvPolynomial A ℕ →+* A
obtained by X a ↦ a
.
See MvPolynomial.ACounit
for a “relative” variant for algebras over a base ring
and MvPolynomial.counit
for the “absolute” variant with A = ℤ
.