The prompt said, “Explain the core arguments using formal logic:”, and contained the full text of this dialogue.
Below is a reconstructive formalization of the main argumentative moves in the dialogue. I’ll use (i) first-order logic with identity, (ii) a light modal layer for Leibniz’s “necessary/possible,” and (iii) explicit definitions (since Leibniz’s strategy is: replace troublesome words with their meanings).
0) Notation (minimal “language”)
Individuals: agents (x,y); God $g$; events/acts $e$; states $s$. Predicates / relations:
- $God(g)$
- $Omni(g)$: omniscient (enough for the early proof)
- $Just(x)$
- $Loves(x,y)$
- $Happy(y)$
- $Harmony(s)$
- $HasHappyState(y,s)$
- $Knows(x,s)$
- $Exper(x,s)$: $x$ “experiences” $s$ (as harmony)
- $Del(x,s)$: $x$ is delighted by $s$
- $Sin(e)$
- $PartOf(e,B)$: event $e$ is part of world-series $B$
- $Will(x,e)$, $NotWill(x,e)$, $Permit(x,e)$
- $Cause(x,e)$, $Author(x,e)$
Modal operators (Leibniz’s “in itself”):
- $\Box p$: $p$ is necessary (its negation implies contradiction)
- $\Diamond p$: $p$ is possible (conceivable without contradiction)
1) “God is just” via definitions (justice → universal love)
Definitions (as in the dialogue)
- Justice: $$ Just(x) \; \overset{def}{\leftrightarrow}\; \forall y, Loves(x,y) $$
- Love: $$ Loves(x,y) \;\overset{def}{\leftrightarrow}\; \exists s,(HasHappyState(y,s)\wedge Del(x,s)) $$ (Informally: loving $y$ is being delighted by $y$’s happiness-state.)
- Delight: $$ Del(x,s)\;\overset{def}{\leftrightarrow}\; Exper(x,s)\wedge Harmony(s) $$
- Happiness is harmonic: $$ Happy(y)\to \exists s,(HasHappyState(y,s)\wedge Harmony(s)) $$ (This encodes the earlier sub-argument that happiness is a maximally harmonious mind-state.)
- Omniscience “covers” harmony: $$ Omni(x)\to \forall s,(Harmony(s)\to Knows(x,s)) $$
- Knowing harmony yields experiencing it (a substantive bridge the dialogue relies on): $$ \forall x\forall s,((Knows(x,s)\wedge Harmony(s))\to Exper(x,s)) $$
Target claim
$$ God(g)\wedge Omni(g)\;\to\; Just(g) $$
Derivation sketch
Let $y$ be arbitrary.
- Assume $God(g)\wedge Omni(g)$.
- Suppose $Happy(y)$. Then by (4) pick (s) with ($asHappyState(y,s)\wedge Harmony(s)$.
- From $Omni(g)$ and $Harmony(s)$, get $Knows(g,s)$ by (5).
- From $Knows(g,s)\wedge Harmony(s)$, get $Exper(g,s)$ by (6).
- Then $Del(g,s)$ by (3).
- So $Loves(g,y)$ by (2).
- Since $y$ was arbitrary, $\forall y, Loves(g,y)$.
- Hence $Just(g)$ by (1).
So the early “God is just” proof is essentially: definitions + (Happiness ⊆ Harmony) + (God knows all Harmony) + (knowing harmony = experiencing it).
2) Principle of Sufficient Reason (PSR) ⇒ God is the ultimate reason for the world-series
Core PSR axiom
$$ \forall p,(Exists(p)\to \exists r,SR(r,p)) $$ $(SR(r,p)$ = “$r$ is a sufficient reason for $p$”)
“Sufficient reason entails” principle
$$ SR(r,p)\to (Exists(r)\to Exists(p)) $$ (If $r$ is sufficient for $p$, then $r$’s existence guarantees $p$’s.)
Leibniz’s key move: let $A$ be God, $B$ be the actual world-series
Let $A := Exists(g)$ and $B := Exists(WorldSeries)$.
Assume: $$ SR(g,WorldSeries) $$ Then: $$ Exists(g)\to Exists(WorldSeries) $$ i.e. $$ A\to B $$
By classical contraposition: $$ \neg B \to \neg A $$
That is the “if this series were removed/changed, God would be removed/changed” move in formal clothing: given “this God” as the sufficient reason of “this world-series,” you don’t get the same God with a different series.
3) “God is cause of sin” but “not author of sin” (will vs understanding; whole vs parts)
Definitions he later insists on
- To will: $Will(x,e)$ = “$x$ is delighted by $e$’s existence” (we can model it as) $$ Will(x,e)\;\overset{def}{\leftrightarrow}\; Del(x,Exists(e)) $$
- To not-will: $$ NotWill(x,e)\;\overset{def}{\leftrightarrow}\; Del(x,\neg Exists(e)) \;\;\vee\;\; Pain(x,Exists(e)) $$
- To permit: $$ Permit(x,e)\;\overset{def}{\leftrightarrow}\; Knows(x,e)\wedge \neg Will(x,e)\wedge \neg NotWill(x,e) $$
- Author: (explicitly stated in the text) $$ Author(x,e)\;\overset{def}{\leftrightarrow}\; Will(x,e)\wedge Cause(x,e) $$
The “whole does not distribute to parts” point
Let $B$ be the whole world-series. Leibniz wants:
- God wills the whole series: $$ Will(g,B) $$
- Sins are parts of the whole: $$ Sin(e)\to PartOf(e,B) $$
- But it does not follow that God wills each sinful part: $$ Will(g,B)\wedge PartOf(e,B)\;\not\vdash\; Will(g,e) $$
Formally, Leibniz blocks an invalid inference schema: $$ \forall x\forall B\forall e,\big((Will(x,B)\wedge PartOf(e,B))\to Will(x,e)\big) $$ He rejects that schema.
What he does keep
- God is (in a grounding/“physical”) sense the cause of anything in the series: $$ PartOf(e,B)\to Cause(g,e) $$
- But sins are not willed “in themselves”: $$ Sin(e)\to \neg Will(g,e) $$
- Therefore: $$ Sin(e)\to \neg Author(g,e) $$ since $Author(g,e)$ requires $Will(g,e)$.
So the structure is:
- Grounding: $Cause(g,e)$ for all $e\in B$
- Non-authorship: $Sin(e)\to \neg Will(g,e)$
- Therefore: God is not the “author” of sin though he is ultimate reason/cause of the existence of the series in which sin occurs.
4) The “fatalism” objection and Leibniz’s modal fix: necessity-in-itself vs necessity-by-hypothesis
Leibniz’s explicit definition
$$ \Box p \;\overset{def}{\leftrightarrow}\; \neg \Diamond \neg p $$ (“Necessary = opposite implies contradiction.”)
Then “contingent in itself” is: $$ Cont(p) \;:=\; \Diamond p \wedge \Diamond\neg p $$
His key denial
He rejects the unrestricted rule: $$ (\Box A \wedge (A\to p))\to \Box p $$ in the intended reading of “follows.” (He treats the relevant “follows” as hypothetical/certainty from the actual series, not as metaphysical entailment.)
So he separates:
- Absolute necessity: $\Box p$ (contradiction if not-$p$)
- Certainty given the actual harmony: think “given $H$”: $$ \Box(H\to p)\quad \text{and}\quad H $$ which yields $p$, but not $\Box p$.
This matches his line: Judas’s non-salvation is certain/foreseen/“necessary by accident” (given the actual series), while not contradictory to conceive Judas saved: $$ \Diamond(Saved(Judas)) $$ even though (in the actual world-series) ( \neg Saved(Judas)).
The reduplication point (“whatever is, necessarily is”)
He interprets “Whatever is, necessarily is” as the tautology: $$ \Box(Exists(e)\to Exists(e)) $$ not as: $$ Exists(e)\to \Box Exists(e) $$ So he’s dissolving fatalistic slogans by expanding them into what they actually mean.
5) Freedom under PSR: reject “libertarian indifference,” keep spontaneity + rational choice
PSR applied to willing
$$ Will(x,e)\to \exists r,SR(r,Will(x,e)) $$
His definitional chain (compressed)
- Willing tracks what appears good/harmonious: $$ Will(x,e)\leftrightarrow AppearsGood(x,e) $$
- Appearing good depends on agent+object+medium: $$ AppearsGood(x,e)=F(Temperament(x),Object(e),Context) $$ So (holding fixed the full state), will is not “up to” a further will: $$ \neg \exists w ,(Will(x,w)\wedge SR(w,Will(x,e))) $$ on pain of regress.
The criticized definition of free will
The target is roughly:
able to act or not act with all requisites equal.
If “all requisites” includes the complete sufficient conditions for acting, then:
Let $Req(x,e)$ be the conjunction of requisites for $Do(x,e)$, and define action as: $$ Do(x,e)\leftrightarrow Req(x,e) $$ Then: $$ Req(x,e)\to Do(x,e) $$ So the libertarian demand $$ Req(x,e)\wedge \neg Do(x,e) $$ is inconsistent.
Leibniz’s positive definition (Aristotelian)
He keeps:
- Spontaneity: source of action in agent
- Freedom: spontaneity + choice (improved by knowledge)
You can model the “degree of freedom” idea as: $$ FreedomDegree(x)\uparrow \text{ as } Knowledge(x)\uparrow \text{ and } PassionNoise(x)\downarrow $$ Not a single clean FOL axiom, but the logical point is:
- no “reasonless toggling” is needed for freedom;
- freedom is compatible with PSR because the relevant explanation is: the agent acts from their own reasons/character/intellect, not from external compulsion alone.
6) Damnation as self-caused: hatred of God → maximal pain → “always damnable”
Definitions paralleling the love argument
- Love: delight at another’s happiness
- Hatred: pain at another’s happiness $$ Hates(x,y) \;\overset{def}{\leftrightarrow}\; PainAt(x,Happy(y)) $$
- God as maximal happiness: $$ MaxHappy(g) $$
- Max pain (= damnation) arises from hating maximal happiness: $$ (Hates(x,g)\wedge MaxHappy(g))\to Damned(x) $$
Persistence post mortem (a substantive premise)
He assumes: after death, no new sensory inputs, so the “last dominant orientation” persists/escalates: $$ Dies(x)\wedge LastStateIsHatred(x,g)\to \forall t>death, Hates(x,g) $$ Then: $$ \forall t>death,Damned(x) $$ But he rhetorically reframes this as: they are never “statically damned,” always “damning themselves” (an “always re-instantiating” state).
“No just complaint” structure
His complaint-blocking move is basically:
If a person is shown the consequence and has the (internal) route to avoid it conditional on willing it, then responsibility attaches to the will-state: $$ (SeesConsequence(x)\wedge CanAvoidIfWills(x))\to \neg JustifiedComplaint(x) $$ Even if the will-state itself has an explanation, punishment is keyed to the present resolved wicked will, not to tracing an infinite regress of causes.
7) “Why this soul?” dissolves into individuation-by-place-and-time
He treats “thisness” (haecceity) as fixed by spatiotemporal determination in cases of maximal similarity.
A clean way to capture the punchline:
Let $Origin(x)$ be the ordered pair $\langle t,place\rangle$.
Principle (for the “maximally similar eggs/souls” case): $$ (Origin(x)=Origin(y)\wedge Intrinsic(x)=Intrinsic(y))\to x=y $$
Then the question:
Why is this soul in these circumstances?
becomes:
Why does $x$ have $Origin(x)$?
But if you “move” the origin, you are no longer talking about the same individual: $$ Origin(x)\neq Origin(y)\to x\neq y $$ So “Why am I not born elsewhere/otherwise?” reduces to “Why am I not someone else?”, which is not a substantive complaint about justice on his view.
What ties these arguments together (one meta-schema)
Leibniz is repeatedly doing this:
-
Replace loaded terms by definitions (justice, love, will, permission, necessity).
-
Block invalid distribution rules (whole → parts, “follows” → “necessary in itself”).
-
Distinguish kinds of explanation:
- grounding/physical cause vs moral authorship,
- absolute necessity vs certainty under the actual harmony,
- freedom as rational self-determination vs “reasonless indifference.”
If you want, I can rewrite the above into a single compact “axiom set + theorems” presentation (like a mini formal system) or do a Fitch-style proof for one thread (e.g., the anti-fatalism move) in full detail.
