I'm looking for a reference that provides a concise statement of the Beilinson-Bloch conjecture, specifically formulated in terms of an isomorphism under the Beilinson regulator map.

More precisely, I'm interested in a statement that relates:

- The algebraic K-theory of a smooth projective scheme X over a field $F$.
- The Galois cohomology of the étale cohomology of X with, or without cyclotomic character coefficients.

Ideally, the reference would include:

- A precise formulation of the Beilinson regulator map in this context.
- The conjectured isomorphism between (rationalized) K-groups and the relevant Galois cohomology groups. Something like: $r_{p,n}: K_{2n+1-j}(X)_{\mathbb{Q}_p} \to H^1(F, H^{2n}_{\text{ét}}(\overline{X}, \mathbb{Q}_p(j)))$ is an isomorphism. (Apologies if my indices are incorrect).
- Any connection to special values of L-functions, if applicable in this formulation.

I'm aware of Beilinson's original 1985 paper and Bloch's 1986 work, but I'm hoping for a more recent treatment that might synthesize these ideas into a single, clear statement.

Any pointers to survey articles, textbooks, or recent research papers that provide such a formulation would be greatly appreciated. Thank you!