Let me re-phrase an argument from an earlier
post.
Suppose “=” is governed by the classical rules of identity, and G, F,
S, and H are names for God, the Father, the Son and the Holy Spirit. Let
x ≠ y abbreviate
Not(x = y). Let D(x) say that x is divine. There then are three
predicates A, B and C such that:
A(S) and not
A(F)
B(H) and not
B(S)
C(S) and not
C(F).
For instance, we can let A(x) say that x is begotten, B(x) say that x is not begotten, and C(x) say that x proceeds.
Then add:
Either (a) F = G and S = G and H = G or (b) F ≠ G and S ≠ G and H ≠ G.
D(F)
D(S)
D(H)
D(G)
Premise 4 says that the Father, Son and Holy Spirit are on par with
respect to being God. Either each is classically identical with God, or
classical identity does not apply to any person and God (in which case
we explain “The Father is God” as something other than classical
identity).
It follows from (1)-(3):
- F ≠ S and S ≠ H and H ≠ S.
It then follows that (4)(a) is false, so we must have:
- F ≠ G and S ≠ G and H ≠ G.
It then follows from (9) and (10) and classical identity being an
equivalence relation that:
- ∃w∃x∃y∃z(D(w)∧D(x)∧D(y)∧D(z)∧w≠x∧w≠y∧w≠z∧x≠y∧x≠z∧y≠z).
But (11) is the standard classical logic translation of:
- There are at least four that are divine.
Heresy!
What are the ways out? We can’t reject (1)-(3). Even if we have some
quibbles about the specific examples I chose for A, B and C, every orthodox Trinitarian agrees
that for each pair of persons there is something that is truly
predicated of one that isn’t truly predicated of the other.
Rejecting any of (5)-(7) is a non-starter: one isn’t a trinitarian if
one does not say that the Father is divine, the Son is divine and the
Holy Spirit is divine.
That leaves (4) and (8). Start with (8). That seems as
uncontroversial as anything about God can be. God is divine!
But here is one way of rejecting (8): reject the presupposition that
there is a name, “G”, for God.
If we do that, we also end up rejecting (4), of course, but not in a way
that threatens the parity of the three persons of the Trinity with
respect to being God. I think there are two ways of doing this:
Reject the claim that there is a proper name for God as
such.
Reject the very existence of classical identity.
It is tempting to say that instead of rejecting the very existence of
classical identity to God, one can reject its applicability to
God. But that can’t be done. It is part of the very concept of classical
identity that it applies to everything, that for any name N it is axiomatic that N = N and that it is a
theorem that ∀x(x=x).
What about (I)? Surely this is a non-starter. Doesn’t the Christian
tradition constantly talk about names of God? Well, yes, but there are
names and proper names. What if we say this? There are proper names for
the Father, the Son and the Holy Spirit. But there is no proper name for
God. Instead, what we have is something like a definite description like
“the divine one”.
We still haven’t solved the problem. The normal way to understand
definite descriptions is the Russellian way. When you say “The divine
one created the world”, you are saying:
- ∃x(D(x)∧∀y(D(y)→y=x)∧C(x,W)).
That won’t do, however. For (13) leads to a contradiction when it is
combined with (1) together with the non-negotiable Trinitarian claim
- D(F) and D(S)
that the Father is divine and the Son is divine, as well as classical
inference rules for identity.
So, what do we do? Here is a suggestion. Let R be an equivalence relation. Then
we can have an R-based article
“theR”, and
sentences with “theR” are translated in the
Russellian way except with R
in place of =.
(Compare how Aquinas makes the distinction between talking in the
neuter and talking in the masculine of God, and where when one applies
substantives in the neuter, one is talking of the divine essence. One
can think of “theE”
as a neuter article, which English doesn’t distinguish from the
personal—masculine or feminine—articles, and which Latin lacks
altogether, since it lacks articles.)
Thus, “The divine one created the world” translates to:
- ∃x(D(x)∧∀y(D(y)→yEx)∧C(x,W)).
No contradiction results from (1)-(3) and (14)-(15).
We can call “the divine one” an E-definite description, while “the
begetter” is an =-definite description.
Aquinas at times in his discussion of the Trinity makes a distinction
between substantives used in the neuter and substantives used in the
masculine—the masculine is personal in a way that the neuter is
impersonal and more suited to when we talk of the divine
essence.
Thus, on our present theory, God as such has no proper name, but he
does have E-definite
descriptions.
Now, what are we to make of the truth value of the following?
- The Son is identical with the divine one.
If “The Son” is just a proper name and “the divine one” is “theE divine one”, then (16)
is:
- ∃x(D(x)∧∀y(D(y)→yEx)∧x=S).
And this is false, because it contradicts (5), (6) and (9). So, on
the theory under consideration, we have to deny (16). That sounds kind
of bad. But perhaps it’s not bad if we realize that “identical” here is
classical identity, and we think that classical identity comes
to “is the same hypostasis as”, since in the divine case, same
hypostasis means same person, and it sounds wrong to say that the Son is
the same person as God.
So, I think there is a way of holding on to classical identity while
defending the Trinity, but it is costly: we need to say that there is no
proper name for God as such and that definite descriptions for God are
E-definite descriptions. But
denying classical identity is also costly.
