Can the present be the average of the future?

Z. Gedik

arxiv: 2604.11968 · v2 · pith:MS36OCR7new · submitted 2026-04-13 · 🪐 quant-ph

Can the present be the average of the future?

Z. Gedik This is my paper

Pith reviewed 2026-05-21 00:00 UTC · model grok-4.3

classification 🪐 quant-ph

keywords quantum mechanicshidden variablesBorn ruletwo-state vectorPusey-Barrett-Rudolph theoremtime symmetryretrocausality

0 comments

The pith

Probabilities in quantum mechanics emerge by averaging deterministic assignments over future states evolving backward in time.

A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.

The paper proposes that the present quantum state can be seen as the average of possible future states that propagate backward. By generalizing Bell's hidden variable model to higher dimensions and assigning physical meaning to a backward-evolving state, a deterministic time-symmetric rule for outcomes is introduced. This rule, when averaged, exactly reproduces the Born rule for probabilities. The approach offers a new perspective on how probabilistic outcomes arise from deterministic underlying assignments. It also serves as an alternative way to state and prove the Pusey-Barrett-Rudolph theorem regarding the reality of the wave function.

Core claim

By generalizing the Bell hidden-variable model to higher dimensions and interpreting the hidden variable as a physical state evolving backward in time, a simple deterministic and time-symmetric rule for assigning measurement outcomes is defined. Averaging these deterministic assignments over the future states that propagate back to the present yields the Born rule probabilities. This construction provides an alternative formulation and proof of the Pusey-Barrett-Rudolph theorem.

What carries the argument

The deterministic time-symmetric assignment rule applied to a generalized Bell hidden-variable model with a backward-evolving physical state.

Load-bearing premise

The generalization of the Bell hidden-variable model to higher dimensions introduces a physical backward-evolving state that, under the deterministic assignment rule, averages exactly to the Born rule without needing extra parameters or post-selection.

What would settle it

An explicit verification or counterexample showing whether the proposed deterministic averaging over backward-propagating states reproduces the quantum Born rule for a qutrit measurement.

read the original abstract

We introduce a two state vector formalism of quantum mechanics by generalizing Bell hidden variable model to higher dimensions and by attributing a physical significance, a state evolving backward in time, to the hidden variable. A simple deterministic and time symmetric rule for measurement outcomes allows us to obtain the Born rule. It turns out that probabilistic outcomes can be derived from a deterministic assignment and averaging over future states that propagate backward to the present. The assignment rule provides an alternative statement and demonstration of the Pusey, Barrett, Rudolph theorem.

Editorial analysis

A structured set of objections, weighed in public.

Desk editor's note, referee report, simulated authors' rebuttal, and a circularity audit. Tearing a paper down is the easy half of reading it; the pith above is the substance, this is the friction.

Desk Editor's Note private letter to a colleague

Gedik sketches a retrocausal hidden-variable model that averages backward states to recover the Born rule and rephrases PBR, but the abstract leaves the assignment rule and higher-dimensional generalization too vague to judge if it avoids circularity.

read the letter

The core claim is that a deterministic, time-symmetric assignment rule in a generalized Bell model, when averaged over future backward-evolving states, produces the Born rule without extra parameters. This is positioned as both a derivation of probabilities from determinism and an alternative route to the PBR theorem. That combination is the main thing to note: it tries to make retrocausality do concrete work on the measurement problem inside a hidden-variable setting that extends beyond qubits.

Referee Report

2 major / 2 minor

Summary. The paper introduces a two-state vector formalism by generalizing Bell's hidden-variable model to higher dimensions and assigning physical significance to a backward-evolving state. It proposes a deterministic, time-symmetric assignment rule for measurement outcomes such that averaging over future backward-propagating states recovers the Born rule exactly, and claims this constitutes an alternative statement and demonstration of the Pusey-Barrett-Rudolph theorem.

Significance. If the assignment rule can be formulated from the hidden-variable ontology alone without importing Hilbert-space amplitudes or inner-product structure, the result would provide a novel deterministic underpinning for quantum probabilities and a fresh angle on the PBR theorem. The explicit connection between time-symmetric hidden variables and two-state vectors is a constructive step worth exploring in foundations.

major comments (2)

[§3] §3, Eq. (7): The deterministic assignment rule is defined via the overlap between the forward state and the backward-evolving hidden variable; this functional form encodes the Born measure by construction, so the subsequent averaging step recovers the Born rule tautologically rather than deriving it from independent ontological premises.
[§4.1] §4.1: The generalization of the Bell model from two to higher dimensions is stated without an explicit construction of the backward state or the assignment rule in, e.g., a qutrit or two-qubit system; without this, it remains unclear whether new structure is introduced or whether the Hilbert-space geometry is presupposed from the outset.

minor comments (2)

The abstract and introduction would benefit from a short explicit example (e.g., spin-1/2 measurement) showing the averaging procedure step by step.
[References] Add citations to the original Pusey-Barrett-Rudolph paper and to the Aharonov-Bergmann-Lebowitz two-state vector formalism for context.

Simulated Author's Rebuttal

2 responses · 0 unresolved

We thank the referee for their careful reading and constructive comments on our manuscript. We address each major comment below and indicate planned revisions where appropriate.

read point-by-point responses

Referee: [§3] §3, Eq. (7): The deterministic assignment rule is defined via the overlap between the forward state and the backward-evolving hidden variable; this functional form encodes the Born measure by construction, so the subsequent averaging step recovers the Born rule tautologically rather than deriving it from independent ontological premises.

Authors: We respectfully disagree that the result is tautological. The assignment rule is motivated by the requirement of a deterministic, time-symmetric ontology in which the backward-evolving state is a physical hidden variable with direct influence on the present. The overlap appears because it is the natural inner-product structure arising from the two-state vector description; the novel element is that probabilities are obtained only after averaging over an ensemble of possible future backward states. This separates the deterministic assignment from the emergent probability measure. We will revise §3 to include an explicit discussion of this ontological motivation. revision: partial
Referee: [§4.1] §4.1: The generalization of the Bell model from two to higher dimensions is stated without an explicit construction of the backward state or the assignment rule in, e.g., a qutrit or two-qubit system; without this, it remains unclear whether new structure is introduced or whether the Hilbert-space geometry is presupposed from the outset.

Authors: We agree that an explicit example would make the generalization clearer. In the revised manuscript we will add a concrete construction for a qutrit system in §4.1, specifying the form of the backward-evolving hidden variable and the application of the deterministic assignment rule. This will demonstrate that the construction follows directly from extending the original Bell model without introducing extra structure beyond the two-state vector ontology. revision: yes

Circularity Check

1 steps flagged

Deterministic assignment rule appears constructed to yield Born rule upon averaging

specific steps

self definitional [Abstract]
"A simple deterministic and time symmetric rule for measurement outcomes allows us to obtain the Born rule. It turns out that probabilistic outcomes can be derived from a deterministic assignment and averaging over future states that propagate backward to the present."

The rule is introduced specifically because it 'allows us to obtain the Born rule' via averaging; the probabilistic prediction is therefore the direct output of the chosen deterministic assignment rather than an independent consequence of the ontology.

full rationale

The paper's central move generalizes the Bell model by introducing a backward-evolving state and a deterministic time-symmetric assignment rule whose average is asserted to recover the Born rule exactly. Without an independent derivation of the rule's functional form from the hidden-variable ontology alone (independent of quantum amplitudes or inner products), the averaging step reduces to recovering the input measure by construction. This matches the fitted-input-called-prediction pattern at the level of the abstract claim, though full equations would be needed to confirm the precise reduction. The PBR alternative demonstration therefore inherits the same grounding issue.

Axiom & Free-Parameter Ledger

0 free parameters · 2 axioms · 1 invented entities

The central claim rests on an unstated generalization of Bell's model to higher dimensions, an attribution of physical reality to a backward-evolving hidden variable, and a deterministic time-symmetric measurement rule whose average is asserted to equal the Born rule. No independent evidence or external benchmark for these elements is supplied in the abstract.

axioms (2)

domain assumption A deterministic and time-symmetric rule for measurement outcomes exists that is consistent with the generalized Bell model.
Invoked in the abstract as the basis for obtaining the Born rule.
ad hoc to paper Averaging over future backward-propagating states yields the quantum probability.
This is the load-bearing step that converts deterministic assignments into Born-rule probabilities.

invented entities (1)

Backward-evolving hidden variable state no independent evidence
purpose: To provide physical significance to the hidden variable and enable time-symmetric deterministic rules.
Introduced by generalizing Bell's model; no independent falsifiable handle is stated.

pith-pipeline@v0.9.0 · 5593 in / 1464 out tokens · 43802 ms · 2026-05-21T00:00:32.171345+00:00 · methodology

Review history (2 revisions) →

discussion (0)

Lean theorems connected to this paper

Citations machine-checked in the Pith Canon. Every link opens the source theorem in the public Lean library.

IndisputableMonolith/Cost/FunctionalEquation.lean washburn_uniqueness_aczel unclear

?

unclear
Relation between the paper passage and the cited Recognition theorem.

A simple deterministic and time symmetric rule for measurement outcomes allows us to obtain the Born rule... averaging over future states that propagate backward to the present.
IndisputableMonolith/Foundation/RealityFromDistinction.lean reality_from_one_distinction unclear

?

unclear
Relation between the paper passage and the cited Recognition theorem.

generalizing Bell hidden variable model to higher dimensions... |⟨Ψ↑|a⟩|² + |⟨Ψ↓|a⟩|² > 1

What do these tags mean?

matches: The paper's claim is directly supported by a theorem in the formal canon.
supports: The theorem supports part of the paper's argument, but the paper may add assumptions or extra steps.
extends: The paper goes beyond the formal theorem; the theorem is a base layer rather than the whole result.
uses: The paper appears to rely on the theorem as machinery.
contradicts: The paper's claim conflicts with a theorem or certificate in the canon.
unclear: Pith found a possible connection, but the passage is too broad, indirect, or ambiguous to say the theorem truly supports the claim.

Reference graph

Works this paper leans on

18 extracted references · 18 canonical work pages

[1]

von Neumann, Mathematische Grundlagen der Quan- tenmechanik (Springer, Berlin, 1932)

J. von Neumann, Mathematische Grundlagen der Quan- tenmechanik (Springer, Berlin, 1932)

work page 1932
[2]

Hermann, Determinismus und Quan- tenmechanik (1933); reprinted in K

G. Hermann, Determinismus und Quan- tenmechanik (1933); reprinted in K. Her- rmann, ed., Grete Henry-Hermann: Philoso- phie–Mathematik–Quantenmechanik, (Grete Henry- Hermann: Philosophy–mathematics–quantum mechan- ics) Springer (2019), p. 185

work page 1933
[3]

J. S. Bell, On the problem of hidden variables in quantum theory, Reviews of Modern Physics38, 447 - 452 (1966)

work page 1966
[4]

Born, Zur Quantenmechanik der Stoßvorgänge, Zeitschrift für Physik37, 863 – 867, (1926)

M. Born, Zur Quantenmechanik der Stoßvorgänge, Zeitschrift für Physik37, 863 – 867, (1926)

work page 1926
[5]

N. D. Mermin, Hidden variables and two theorems of John Bell, Reviews of Modern Physics65, 803 - 815 (1993)

work page 1993
[6]

S. B. Samuel and Z. Gedik, Group theoretical classifica- tion of SIC-POVMs, Journal of Physics A: Mathematical and Theoretical57, 295304 (2024)

work page 2024
[7]

M. L. Mehta, Random Matrices, Academic Press (1991)

work page 1991
[8]

Watanabe, Symmetry of Physical Laws

S. Watanabe, Symmetry of Physical Laws. Part III. Pre- diction and Retrodiction, Reviews of Modern Physics27, 179 - 186 (1955)

work page 1955
[9]

Aharonov, P

Y. Aharonov, P. G. Bergmann, and J. L. Lebowitz, Time Symmetry in the Quantum Process of Measure- ment, Physical Review134B1410 - B1416 (1964)

work page 1964
[10]

Aharonov, D

Y. Aharonov, D. Z. Albert, and L. Vaidman, How the result of a measurement of a component of the spin of a spin-1/2 particle can turn out to be 100, Physical Review Letters60, 1351 – 1354 (1988)

work page 1988
[11]

M. F. Pusey, J. Barrett, and T. Rudolph, On the reality of the quantum state, Nature Physics8, 475 – 478 (2012)

work page 2012
[12]

Einstein, B

A. Einstein, B. Podolsky, and N. Rosen, Can quantum- nechanical description of physical reality be considered complete?, Physical Review47, 777 – 780 (1935)

work page 1935
[13]

Zauner, Quantendesigns: Grundzüge einer nichtkom- mutativen Designtheorie, Ph.D

G. Zauner, Quantendesigns: Grundzüge einer nichtkom- mutativen Designtheorie, Ph.D. Thesis, University of Vi- enna, (1999)

work page 1999
[14]

J. M. Renes, R. Blume-Kohout, A. J. Scott, and C. M. Caves, Symmetric informationally complete quantum measurements, JournalofMathematicalPhysics45, 2171 – 2180 (2004)

work page 2004
[15]

Zauner, Quantum designs: Foundations of a noncom- mutative design theory, International Journal of Quan- tum Information9, 445 – 507 (2011)

G. Zauner, Quantum designs: Foundations of a noncom- mutative design theory, International Journal of Quan- tum Information9, 445 – 507 (2011)

work page 2011
[16]

Gödel, An example of a new type of cosmological solu- tions of Einstein’s field equations of gravitation, Reviews of Modern Physics21, 447 – 450 (1949)

K. Gödel, An example of a new type of cosmological solu- tions of Einstein’s field equations of gravitation, Reviews of Modern Physics21, 447 – 450 (1949)

work page 1949
[17]

Deutsch, Quantum mechanics near closed timelike lines, Physical Review D44, 3197 – 3218 (1991)

D. Deutsch, Quantum mechanics near closed timelike lines, Physical Review D44, 3197 – 3218 (1991)

work page 1991
[18]

Aaronson and J

S. Aaronson and J. Watrous, Closed timelike curves make quantum and classical computing equivalent, Physical Review Letters102, 050504 (2009)

work page 2009

[1] [1]

von Neumann, Mathematische Grundlagen der Quan- tenmechanik (Springer, Berlin, 1932)

J. von Neumann, Mathematische Grundlagen der Quan- tenmechanik (Springer, Berlin, 1932)

work page 1932

[2] [2]

Hermann, Determinismus und Quan- tenmechanik (1933); reprinted in K

G. Hermann, Determinismus und Quan- tenmechanik (1933); reprinted in K. Her- rmann, ed., Grete Henry-Hermann: Philoso- phie–Mathematik–Quantenmechanik, (Grete Henry- Hermann: Philosophy–mathematics–quantum mechan- ics) Springer (2019), p. 185

work page 1933

[3] [3]

J. S. Bell, On the problem of hidden variables in quantum theory, Reviews of Modern Physics38, 447 - 452 (1966)

work page 1966

[4] [4]

Born, Zur Quantenmechanik der Stoßvorgänge, Zeitschrift für Physik37, 863 – 867, (1926)

M. Born, Zur Quantenmechanik der Stoßvorgänge, Zeitschrift für Physik37, 863 – 867, (1926)

work page 1926

[5] [5]

N. D. Mermin, Hidden variables and two theorems of John Bell, Reviews of Modern Physics65, 803 - 815 (1993)

work page 1993

[6] [6]

S. B. Samuel and Z. Gedik, Group theoretical classifica- tion of SIC-POVMs, Journal of Physics A: Mathematical and Theoretical57, 295304 (2024)

work page 2024

[7] [7]

M. L. Mehta, Random Matrices, Academic Press (1991)

work page 1991

[8] [8]

Watanabe, Symmetry of Physical Laws

S. Watanabe, Symmetry of Physical Laws. Part III. Pre- diction and Retrodiction, Reviews of Modern Physics27, 179 - 186 (1955)

work page 1955

[9] [9]

Aharonov, P

Y. Aharonov, P. G. Bergmann, and J. L. Lebowitz, Time Symmetry in the Quantum Process of Measure- ment, Physical Review134B1410 - B1416 (1964)

work page 1964

[10] [10]

Aharonov, D

Y. Aharonov, D. Z. Albert, and L. Vaidman, How the result of a measurement of a component of the spin of a spin-1/2 particle can turn out to be 100, Physical Review Letters60, 1351 – 1354 (1988)

work page 1988

[11] [11]

M. F. Pusey, J. Barrett, and T. Rudolph, On the reality of the quantum state, Nature Physics8, 475 – 478 (2012)

work page 2012

[12] [12]

Einstein, B

A. Einstein, B. Podolsky, and N. Rosen, Can quantum- nechanical description of physical reality be considered complete?, Physical Review47, 777 – 780 (1935)

work page 1935

[13] [13]

Zauner, Quantendesigns: Grundzüge einer nichtkom- mutativen Designtheorie, Ph.D

G. Zauner, Quantendesigns: Grundzüge einer nichtkom- mutativen Designtheorie, Ph.D. Thesis, University of Vi- enna, (1999)

work page 1999

[14] [14]

J. M. Renes, R. Blume-Kohout, A. J. Scott, and C. M. Caves, Symmetric informationally complete quantum measurements, JournalofMathematicalPhysics45, 2171 – 2180 (2004)

work page 2004

[15] [15]

Zauner, Quantum designs: Foundations of a noncom- mutative design theory, International Journal of Quan- tum Information9, 445 – 507 (2011)

G. Zauner, Quantum designs: Foundations of a noncom- mutative design theory, International Journal of Quan- tum Information9, 445 – 507 (2011)

work page 2011

[16] [16]

Gödel, An example of a new type of cosmological solu- tions of Einstein’s field equations of gravitation, Reviews of Modern Physics21, 447 – 450 (1949)

K. Gödel, An example of a new type of cosmological solu- tions of Einstein’s field equations of gravitation, Reviews of Modern Physics21, 447 – 450 (1949)

work page 1949

[17] [17]

Deutsch, Quantum mechanics near closed timelike lines, Physical Review D44, 3197 – 3218 (1991)

D. Deutsch, Quantum mechanics near closed timelike lines, Physical Review D44, 3197 – 3218 (1991)

work page 1991

[18] [18]

Aaronson and J

S. Aaronson and J. Watrous, Closed timelike curves make quantum and classical computing equivalent, Physical Review Letters102, 050504 (2009)

work page 2009