Remark

(core as equalizer and as regular image)
In category-theoretic terminology, Def. describes the equalizer (Bousfield 1979, 6.4)

where the top morphism is

and the bottom one is

with

denoting the unique ring homomorphism form the commutative ring of integers, which is the initial object in CommutativeRings.

Observing (by this Prop.) that the tensor product of abelian groups $R \otimes_{{}_{\mathbb{Z}}} R$ equipped with its canonically induced commutative ring structure is the coproduct in CommutativeRings

this means equivalently that the core is the equalizer of the two coprojections into the coproduct:

hence – since $\mathbb{Z}$ is the initial object in CommutativeRings – into the cofiber coproduct of $\mathbb{Z} \xrightarrow{e} R$ (1) with itself.

In this form, the core is manifestly (here) the regular image of the initial morphism $\mathbb{Z} \xrightarrow{e} R$:

hence the smallest regular monomorphism into $R$ in the category of CommutativeRings.

Remark

(geometric interpretation)
By duality between algebra and geometry, we may think of the opposite category $CommutativeRings^{op}$ as that of affine arithmetic schemes. Here for $R \in CRing$ we write $Spec(R)$ for the same object, but regarded in $CRing^{op}$.

So the initial object $\mathbb{Z}$ in CRing becomes the terminal object Spec(Z) in $CRing^{op}$, and so for every $R$ there is a unique morphism

in $CRing^{op}$, exhibiting every affine arithmetic scheme $Spec(R)$ as equipped with a map to the base scheme Spec(Z).

Since the coproduct in CRing is the tensor product of rings (prop.), this is the dually the Cartesian product in $CRing^{op}$ and hence

exhibits $R \otimes R$ as the ring of functions on $Spec(R) \times Spec(R)$.

Hence the terminal morphism $Spec(R) \to Spec(\mathbb{Z})$ induces the corresponding Čech groupoid internal to $CRing^{op}$

This exhibits $R \otimes R$ (the ring of functions on the scheme of morphisms of the Čech groupoid) as a commutative Hopf algebroid over $R$.

Moreover, the arithmetic scheme of isomorphism classes of this groupoid is the coequalizer of the source and target morphisms

also called the coimage of $Spec(R) \to Spec(\mathbb{Z})$. Since limits in the opposite category $CRing^{op}$ are equivaletly colimits in $CRing$, this means that the ring of functions on the scheme of isomorphism classes of the Čech groupoid is precisely the core $c R$ or $R$ according to def. .

This is morally the reason why for $E$ a homotopy commutative ring spectrum the core $c \pi_0(E)$ of its underlying ordinary ring in degree 0 controls what the $E$-Adams spectral sequence converges to (Bousfield 79, theorems 6.5, 6.6, see here), because the $E$-Adams spectral sequence computes E-nilpotent completion which is essentially the analog in higher algebra of the above story: namely the coimage ((infinity,1)-image) of $Spec(E) \to$ Spec(S) (see here).

Example

(rational numbers form a solid ring)
The ring $\mathbb{Q}$ of rational numbers is a solid ring.

Remark

(no other field of characteristic zero is a solid ring)
The same argument shows that no other field of characteristic zero $k$ is a solid ring, since, being a proper superset $\mathbb{K} \supset \mathbb{Q}$, it contains elements $k \in \mathbb{K}$ for which there are no pairs of integers $q$, $p$ such that $p \cdot k \,=\, q$. In particular, the real numbers are not a solid ring.

This is, ultimately, the reason why the derived PL de Rham-Quillen adjunction between simplicial sets and connective dgc-algebras is idempotent only over $k = \mathbb{Q}$ (where it models rationalization of homotopy types, see at fundamental theorem of dg-algebraic rational homotopy theory); away from this case other tools are needed; see also at real homotopy theory.