Wigner's friend

Eugene Wigner designed the thought experiment to illustrate his belief that consciousness is necessary to the quantum mechanical measurement process (and therefore, that consciousness in general must be an "ultimate reality"[1] according to Descartes's "Cogito ergo sum" philosophy): "All that quantum mechanics purports to provide are probability connections between subsequent impressions (also called 'apperceptions') of the consciousness".[1]

Here, "impressions of the consciousness" are understood as specific knowledge about a (measured) system, i.e., the result of an observation. This way, the content of one's consciousness is precisely all knowledge of one’s external world and measurements are defined as the interactions which create the impressions in our consciousness. Since the knowledge about any quantum mechanical wave function is based on such impressions, the wave function of a physical system is modified once the information about the system enters our consciousness. This idea has become known as the "consciousness causes collapse" interpretation.

In the Wigner's friend thought experiment, this (Wigner's) view comes in as follows:

The friend's consciousness gets "impressed" by their measurement of the spin, and therefore they may assign a wave function to it according to the nature of their impression. Wigner, having no access to that information, can only assign the wave function ${\displaystyle \alpha (|0\rangle _{S}\otimes |0\rangle _{F})+\beta (|1\rangle _{S}\otimes |1\rangle _{F})}$to the joint system of spin and friend after the interaction. When he then asks his friend about the measurement outcome, Wigner's consciousness gets "impressed" by the friend's answer: As a result, Wigner will be able to assign a wave function to the spin system, i.e., he will assign to it the wave function corresponding to the friend's answer.

So far, there is no inconsistency in the theory of measurement. However, Wigner then learns (by asking his friend again) that the feelings/ thoughts of his friend about the measurement outcome had been in the friend's mind long before Wigner had asked about them in the first place. Therefore, the correct wave function for the joint system of spin and friend just after the interaction must have been either ${\displaystyle |0\rangle _{S}\otimes |0\rangle _{F}}$or ${\displaystyle |1\rangle _{S}\otimes |1\rangle _{F}}$, and not their linear combination. Hence, there is a contradiction, specifically in the "consciousness causes collapse" interpretation.

Wigner then follows that "the being with a consciousness must have a different role in quantum mechanics than the inanimate measuring device":[1] If the friend were replaced by some measuring device without a consciousness, the superposition state would describe the joint system of spin and device correctly. In addition, Wigner considers a superposition state for a human being to be absurd, as the friend could not have been in a state of "suspended animation"[1] before they answered the question. This view would need the quantum mechanical equations to be non-linear. It is Wigner's belief that the laws of physics must be modified when allowing conscious beings to be included.

The above and other of Wigner's original remarks about his friend appeared in his article "Remarks on the Mind-Body Question", published in the book The Scientist Speculates (1961), edited by I. J. Good. The article is reprinted in Wigner's own book Symmetries and Reflections (1967).

A counterargument is that the superimposition of two conscious states is not paradoxical – just as there is no interaction between the multiple quantum states of a particle, so the superimposed consciousnesses need not be aware of each other.[3]

The state of the observer's perception is considered to be entangled with the state of the cat. The perception state "I perceive a live cat" accompanies the "live-cat" state and the perception state "I perceive a dead cat" accompanies the "dead-cat" state. ... It is then assumed that a perceiving being always finds his/her perception state to be in one of these two; accordingly, the cat is, in the perceived world, either alive or dead. ... I wish to make clear that, as it stands, this is far from a resolution of the cat paradox. For there is nothing in the formalism of quantum mechanics that demands that a state of consciousness cannot involve the simultaneous perception of a live and a dead cat.

— Roger Penrose

The various versions of the many worlds interpretation avoid the need to postulate that consciousness causes collapse – indeed, that collapse occurs at all.

Hugh Everett III's doctoral thesis "'Relative state' formulation of quantum mechanics"[4] serves as the foundation for today's many versions of many-worlds interpretations. In the introductory part of his work, Everett discusses the "amusing, but extremely hypothetical drama" of the Wigner's friend paradox. Note that there is evidence of a drawing of the scenario in an early draft of Everett's thesis.[5] It was therefore Everett who provided the first written discussion of the problem four or five years before it was discussed in "Remarks on the mind-body question"[1] by Wigner, of whom it received the name and fame thereafter. However, Everett being a student of Wigner's, it is clear that they must have discussed it together at some point.[5]

In contrast to his teacher Wigner, who held the consciousness of an observer to be responsible for a collapse, Everett understands the Wigner's friend scenario in a different way: Insisting that quantum states assignments should be objective and nonperspectival, Everett derives a straightforward logical contradiction when letting ${\displaystyle F}$ and ${\displaystyle W}$ reason about the laboratory's state of ${\displaystyle S}$ together with ${\displaystyle F}$. Then, the Wigner's Friend scenario shows to Everett an incompatibility of the collapse postulate for describing measurements with the deterministic evolution of closed systems.[6] In the context of his new theory, Everett claims to solve the Wigner's Friend paradox by only allowing a continuous unitary time evolution of the wave function of the universe. Measurements are modelled as interactions between subsystems of the universe and manifest themselves as a branching of the universal state. The different branches account for the different possible measurement outcomes and are seen to exist as subjective experiences of the corresponding observers.

According to objective collapse theories, wave function collapse occurs when a superposed system reaches a certain objective threshold of size or complexity. Objective collapse proponents would expect a system as macroscopic as a cat to have collapsed before the box was opened, so the question of observation-of-observers does not arise for them.[7] If the measured system were much simpler (such as a single spin state) then once the observation was made the system would be expected to collapse since the larger system of the scientist, equipment, and room would be considered far too complex to become entangled in the superposition.

In the interpretation known as QBism, advocated by N. David Mermin among others, the Wigner's-friend situation does not lead to a paradox, because there is never a uniquely correct wavefunction for any system. Instead, a wavefunction is a statement of personalist Bayesian probabilities, and moreover, the probabilities that wavefunctions encode are probabilities for experiences that are also personal to the agent who experiences them.[8] As von Baeyer puts it, "Wavefunctions are not tethered to electrons and carried along like haloes hovering over the heads of saints—they are assigned by an agent and depend on the total information available to the agent."[9] Consequently, there is nothing wrong in principle with Wigner and his friend assigning different wavefunctions to the same system. A similar position is taken by Brukner, who uses an elaboration of the Wigner's-friend scenario to argue for it.[7]

QBism and relational quantum mechanics have been argued to avoid the contradiction suggested by the extended Wigner's-friend scenario of Frauchiger and Renner.[10]

The experiment was designed using a combination of arguments by Wigner[1] (Wigner's friend), Deutsch[2] and Hardy[13] (see Hardy's paradox).

The setup involves a number of macroscopic agents (observers) performing predefined quantum measurements in a given time order. Those agents are assumed to all be aware of the whole experiment and to be able to use quantum theory to make statements about other people’s measurement results. The design of the thought experiment is such that the different agents' observations along with their logical conclusions drawn from a quantum theoretical analysis yields inconsistent statements.

The scenario corresponds roughly to two parallel pairs of "Wigners" and friends: ${\displaystyle F_{1}}$ with ${\displaystyle W_{1}}$ and ${\displaystyle F_{2}}$ with ${\displaystyle W_{2}}$. The friends each measure a specific spin system, and each Wigner measures "his" friend's laboratory (which includes the friend).

The explicit steps of the thought experiment are the following:[11]

• Step at ${\displaystyle t_{0}}$:

  ${\displaystyle F_{1}}$ measures a qubit state ${\displaystyle R}$ prepared in ${\textstyle |\psi \rangle _{R}={\frac {1}{\sqrt {3}}}|h\rangle _{R}+{\sqrt {\frac {2}{3}}}|t\rangle _{R}}$ in the ${\displaystyle \{h,t\}}$-basis and gets ${\displaystyle h}$ ("heads") or ${\displaystyle t}$ ("tails") with probability ${\textstyle {\frac {1}{3}}}$ and ${\textstyle {\frac {2}{3}}}$, respectively. Depending on this outcome, ${\displaystyle F_{1}}$ prepares a spin system ${\displaystyle S}$ in state ${\displaystyle |\psi \rangle _{S}}$and sends it to ${\displaystyle F_{2}}$. Here, ${\textstyle |\psi \rangle _{S}=|{\downarrow }\rangle _{S}}$ if the outcome was ${\displaystyle h}$ and ${\textstyle |\psi \rangle _{S}=|{\rightarrow }\rangle _{S}={\frac {1}{\sqrt {2}}}|{\uparrow }\rangle _{S}+{\frac {1}{\sqrt {2}}}|{\downarrow }\rangle _{S}}$ if the outcome was ${\displaystyle t}$.

• Step at ${\displaystyle t_{1}}$:

  ${\displaystyle F_{2}}$ measures the received spin ${\displaystyle |\psi \rangle _{S}}$ in the ${\displaystyle \{\uparrow ,\;\downarrow \}}$-basis.

• Step at ${\displaystyle t_{2}}$:

  ${\displaystyle W_{1}}$ measures ${\displaystyle L_{1}=R\otimes F_{1}}$ in the ${\displaystyle \{|+\rangle _{L_{1}},|-\rangle _{L_{1}}\}}$-basis where ${\textstyle |+\rangle _{L_{1}}={\frac {1}{\sqrt {2}}}|h\rangle _{R}|h\rangle _{F_{1}}+{\frac {1}{\sqrt {2}}}|t\rangle _{R}|t\rangle _{F_{1}}}$ and ${\textstyle |-\rangle _{L_{1}}={\frac {1}{\sqrt {2}}}|h\rangle _{R}|h\rangle _{F_{1}}-{\frac {1}{\sqrt {2}}}|t\rangle _{R}|t\rangle _{F_{1}}}$.

• Step at ${\displaystyle t_{3}}$:

  ${\displaystyle W_{2}}$ measures ${\displaystyle L_{2}=S\otimes F_{2}}$ in the ${\displaystyle \{|+\rangle _{L_{2}},|-\rangle _{L_{2}}\}}$-basis where ${\textstyle |+\rangle _{L_{2}}={\frac {1}{\sqrt {2}}}|{\downarrow }\rangle _{S}|{\downarrow }\rangle _{F_{2}}+{\frac {1}{\sqrt {2}}}|{\uparrow }\rangle _{S}|{\uparrow }\rangle _{F_{2}}}$ and ${\textstyle |-\rangle _{L_{2}}={\frac {1}{\sqrt {2}}}|{\downarrow }\rangle _{S}|{\downarrow }\rangle _{F_{2}}-{\frac {1}{\sqrt {2}}}|{\uparrow }\rangle _{S}|{\uparrow }\rangle _{F_{2}}}$.

• Step at ${\displaystyle t_{4}}$:

  The measurement outcomes of ${\displaystyle W_{1}}$ and ${\displaystyle W_{2}}$ are compared: If both got ${\displaystyle minus}$ the experiment is halted. Otherwise, the protocol starts at the initial step again.

Each agent measures their assigned system in a particular basis, as defined above. Upon their measurement result, the agent now starts to reason about the results of other agents by using logical arguments compatible with quantum theory. It is assumed that all agents know about the experimental protocol and they all know quantum theory. This means that, upon having received a particular measurement outcome, each agent may predict some of the measurement results of the other agents. In the end, all the logical statements of the agents are combined and, after repeating the experiment ${\displaystyle n}$ times, a contradiction arises.

Note that the Wigners ${\displaystyle W_{1}}$ and ${\displaystyle W_{2}}$ look at the laboratories ${\displaystyle L_{1}}$ and ${\displaystyle L_{2}}$ from the outside, i.e., they are assumed to see the labs as perfectly isolated. Hence, they model it as a pure state superposition up to the time they themselves have measured their lab. However, even though lab ${\displaystyle L_{2}}$ stays isolated as a system, the extended Wigner’s friend experiment is constructed such that some information about the state of ${\displaystyle S}$ is accessible to outsiders. This is achieved by letting the state of ${\displaystyle S}$ depend on the outcome of ${\displaystyle F_{1}}$'s measurement.

The analysis of the thought experiment is set in an information-theoretic context: The individual agents make logical conclusions that are based on their measurement result, aiming at predictions about other agent's measurements within the protocol. Therefore, using quantum theoretic analysis, they model systems outside of themselves within the theory and draw conclusions.

The following four statements may be derived (see the mathematical analysis below) corresponding to the agents viewpoints:

• Statement 1 by ${\displaystyle F_{1}}$: "If I get ${\displaystyle t}$, I know that ${\displaystyle W_{2}}$ will measure ${\displaystyle plus}$"
• Statement 2 by ${\displaystyle F_{2}}$: "If I get ${\displaystyle \uparrow }$, I know that ${\displaystyle F_{1}}$ had measured ${\displaystyle t}$"
• Statement 3 by ${\displaystyle W_{1}}$: "If I get ${\displaystyle minus}$, I know that ${\displaystyle F_{2}}$ had measured ${\displaystyle \uparrow }$"
• Statement 4 by ${\displaystyle W_{2}}$: "If I get ${\displaystyle minus}$, I know that there exists one round of the experiment in which ${\displaystyle W_{1}}$also gets ${\displaystyle minus}$"

Note that the first three statements are always true, the fourth one is true only with probability ${\textstyle {\frac {1}{12}}}$(see below for a derivation).

The contradiction arises when the four statements are combined for the case that the fourth statement is true, the corresponding round we define as to be round ${\displaystyle n}$. Therefore, in round ${\displaystyle n}$ of the experiment, ${\displaystyle W_{2}}$measures ${\displaystyle minus}$ and knows that ${\displaystyle W_{1}}$measures ${\displaystyle minus}$ as well. The latter part then implies that ${\displaystyle W_{2}}$knows that ${\displaystyle F_{2}}$ had measured ${\displaystyle \uparrow }$, which implies that ${\displaystyle W_{2}}$ knows that ${\displaystyle F_{1}}$ got ${\displaystyle t}$ which in turn implies that ${\displaystyle W_{2}}$ knows that he himself will measure ${\displaystyle plus}$, and hence a contradiction appears.

The theorem phrases the inconsistency found in the Extended Wigner's friend experiment as an impossibility that some three given assumptions be simultaneously valid. Roughly speaking, those assumptions are

(Q): Quantum theory is correct.

(C): Agent's predictions are information-theoretically consistent.

(S): A measurement yields only one single outcome.

More precisely, assumption (Q) involves the probability predictions within quantum theory given by the Born rule. This means that an agent is allowed to trust this rule being correct in assigning probabilities to other outcomes conditioned on his own measurement result. It is however sufficient for the Extended Wigner's friend experiment to assume the validity of the Born rule for probability-1 cases, i.e., if the prediction can be made with certainty.

Assumption (S) specifies that once an agent has arrived at a probability-1 assignment of a certain outcome for a given measurement, they could never agree to a different outcome for the same measurement.

Assumption (C) invokes a consistency among different agents' statements in the following manner: The statement "I know (by the theory) that they know (by the same theory) that x" is equivalent to "I know that x".

Assumptions (Q) and (S) are used by the agents when reasoning about measurement outcomes of other agents, and assumption (C) comes in when an agent (${\displaystyle W_{2}}$) combines other agent's statements with his own. The result is contradictory, and therefore, assumptions (Q), (C) and (S) cannot all be valid, hence the no-go theorem.

In the following it is explained how each of the agents arrives at his statement:

Statement 1 by ${\displaystyle F_{1}}$: "If I get ${\displaystyle t}$, I know that ${\displaystyle W_{2}}$ will measure ${\displaystyle plus}$"

${\displaystyle F_{1}}$, upon measuring ${\displaystyle t}$, sends the spin system in the state ${\displaystyle |{\rightarrow }\rangle _{S}}$ to ${\displaystyle F_{2}}$. When now ${\displaystyle F_{2}}$ measures ${\displaystyle S}$ in the ${\displaystyle \{\uparrow ,\downarrow \}}$-basis, ${\displaystyle F_{1}}$knows (by using quantum theory (Q)) that both outcomes are possible for ${\displaystyle F_{2}}$'s measurement. This again means that ${\displaystyle F_{1}}$ knows (again by (Q)) that the combined system ${\displaystyle L_{2}}$ of ${\displaystyle S}$ and ${\displaystyle F_{2}}$ will appear to an outside observer like ${\displaystyle W_{2}}$ as the superposition ${\textstyle {\frac {1}{\sqrt {2}}}|{\downarrow }\rangle _{S}|{\downarrow }\rangle _{F_{2}}+{\frac {1}{\sqrt {2}}}|{\uparrow }\rangle _{S}|{\uparrow }\rangle _{F_{2}}}$. As this is precisely the ${\displaystyle |+\rangle _{L_{2}}}$ state of ${\displaystyle W_{2}}$'s measurement basis, ${\displaystyle F_{1}}$ knows that ${\displaystyle W_{2}}$ will measure ${\displaystyle plus}$.

Statement 2 by ${\displaystyle F_{2}}$ : "If I get ${\displaystyle \uparrow }$ , I know that ${\displaystyle F_{1}}$ had measured ${\displaystyle t}$"

If ${\displaystyle F_{2}}$ measures ${\displaystyle \uparrow }$, they know that ${\displaystyle F_{1}}$ could only have been sending the spin in state ${\displaystyle |{\rightarrow }\rangle _{S}}$ to him, as a state ${\displaystyle |{\downarrow }\rangle _{S}}$ would never result in an outcome ${\displaystyle \uparrow }$ in a spin measurement of basis ${\displaystyle \{\uparrow ,\downarrow \}}$.

Statement 3 by ${\displaystyle W_{1}}$: "If I get ${\displaystyle minus}$, I know that ${\displaystyle F_{2}}$ had measured ${\displaystyle \uparrow }$"

As ${\displaystyle W_{1}}$ models the two labs ${\displaystyle L_{1}=R\otimes F_{1}}$ and ${\displaystyle L_{2}=S\otimes F_{2}}$ within quantum theory, he writes down the state at different times. He knows that the state at time ${\displaystyle t_{0}}$ of the protocol of system ${\displaystyle L_{1}\otimes L_{2}}$(i.e., after ${\displaystyle F_{1}}$' s measurement ) is

$${\displaystyle |\psi \rangle _{L_{1}\otimes L_{2}}^{t_{0}}={\frac {1}{\sqrt {3}}}|h\rangle _{R}|h\rangle _{F_{1}}|{\downarrow }\rangle _{S}|{\perp }\rangle _{F_{2}}+{\sqrt {\frac {2}{3}}}|t\rangle _{R}|t\rangle _{F_{1}}|{\rightarrow }\rangle _{S}|{\perp }\rangle _{F_{2}},}$$

where ${\displaystyle |{\perp }\rangle _{F_{2}}}$denotes agent ${\displaystyle F_{2}}$ 's state of "ready to measure". After the next step of the protocol (${\displaystyle F_{2}}$ 's measurement at time ${\displaystyle t_{1}}$ ), this state evolves to

$${\displaystyle |\psi \rangle _{L_{1}\otimes L_{2}}^{t_{1}}={\frac {1}{\sqrt {3}}}|h\rangle _{R}|h\rangle _{F_{1}}|{\downarrow }\rangle _{S}|{\downarrow }\rangle _{F_{2}}+{\frac {1}{\sqrt {3}}}|t\rangle _{R}|t\rangle _{F_{1}}|{\downarrow }\rangle _{S}|{\downarrow }\rangle _{F_{2}}+{\frac {1}{\sqrt {3}}}|t\rangle _{R}|t\rangle _{F_{1}}|{\uparrow }\rangle _{S}|{\uparrow }\rangle _{F_{2}}}$$

which in turn can be written in the ${\displaystyle \{|+\rangle _{L_{1}},|-\rangle _{L_{1}}\}}$-basis as

$${\displaystyle |\psi \rangle _{L_{1}\otimes L_{2}}^{t_{1}}={\sqrt {\frac {2}{3}}}|+\rangle _{L_{1}}|{\downarrow }\rangle _{S}|{\downarrow }\rangle _{F_{2}}+{\frac {1}{\sqrt {6}}}|+\rangle _{L_{1}}|{\uparrow }\rangle _{S}|{\uparrow }\rangle _{F_{2}}-{\frac {1}{\sqrt {6}}}|-\rangle _{L_{1}}|{\uparrow }\rangle _{S}|{\uparrow }\rangle _{F_{2}}.}$$

From this, ${\displaystyle W_{1}}$ can conclude with certainty that ${\displaystyle F_{2}}$ must have measured ${\displaystyle \uparrow }$ if ${\displaystyle W_{1}}$ obtains the outcome ${\displaystyle minus}$.

Statement 4 by ${\displaystyle W_{2}}$ : "If I get ${\displaystyle minus}$, I know that there exists one round of the experiment in which ${\displaystyle W_{1}}$also gets ${\displaystyle minus}$"

${\displaystyle W_{2}}$ also has knowledge of the state of both labs ${\displaystyle L_{1}=R\otimes F_{1}}$ and ${\displaystyle L_{2}=S\otimes F_{2}}$ together. He reformulates ${\displaystyle |\psi \rangle _{L_{1}\otimes L_{2}}^{t_{1}}}$ in his own measurement basis ${\displaystyle \{|+\rangle _{L_{2}},|-\rangle _{L_{2}}\}}$and obtains

$${\displaystyle |\psi \rangle _{L_{1}\otimes L_{2}}^{t_{1}}={\frac {3}{\sqrt {12}}}|+\rangle _{L_{1}}|+\rangle _{L_{2}}+{\frac {1}{\sqrt {12}}}|+\rangle _{L_{1}}|-\rangle _{L_{2}}-{\frac {1}{\sqrt {12}}}|-\rangle _{L_{1}}|+\rangle _{L_{2}}+{\frac {1}{\sqrt {12}}}|-\rangle _{L_{1}}|-\rangle _{L_{2}}.}$$

From this he may conclude that if ${\displaystyle W_{1}}$and he himself perform their measurements, with probability ${\textstyle {\frac {1}{12}}}$, both ${\displaystyle W_{1}}$ and ${\displaystyle W_{2}}$ get outcome ${\displaystyle minus}$.

The four statements can be easily read off from the total state ${\displaystyle |\psi \rangle _{L_{1},L_{2}}}$ for the combined ${\displaystyle L_{1}\otimes L_{2}}$, when this state is rewritten with respect to different basis states, each choice of basis states adapted for the statement under consideration. The numbering of the rewritings below, corresponds to the numbering of the statements (1) till (4) :

From the construction as described in the steps at ${\displaystyle t_{0}}$ and ${\displaystyle t_{1}}$, that is, after the measurements within the two labs ${\displaystyle L_{1}}$ and ${\displaystyle L_{2}}$ ${\displaystyle |\psi \rangle _{L_{1},L_{2}}={\frac {\sqrt {2}}{\sqrt {3}}}|t\rangle _{R,F_{1}}{\frac {1}{\sqrt {2}}}(|{\downarrow }\rangle _{S}|{\downarrow }\rangle _{F_{2}}+|{\uparrow }\rangle _{S}|{\uparrow }\rangle _{F_{2}})+{\frac {1}{\sqrt {3}}}|h\rangle _{R,F_{1}}|{\downarrow }\rangle _{S}|{\downarrow }\rangle _{F_{2}}}$

(1) rewritten when concentrating on the tail / head dichotomy in Lab ${\displaystyle L_{1}}$ : ${\displaystyle |\psi \rangle _{L_{1},L_{2}}={\frac {\sqrt {2}}{\sqrt {3}}}|t\rangle _{R,F_{1}}|+\rangle _{S,F_{2}}+{\frac {1}{\sqrt {3}}}|h\rangle _{R,F_{1}}|{\downarrow }\rangle _{S,F_{2}}}$

(2) rewritten when concentrating on the Up / Down dichotomy in Lab ${\displaystyle L_{2}}$ : ${\displaystyle |\psi \rangle _{L_{1},L_{2}}={\frac {1}{\sqrt {3}}}|t\rangle _{R,F_{1}}|{\uparrow }\rangle _{S,F_{2}}+{\frac {\sqrt {2}}{\sqrt {3}}}|+\rangle _{R,F_{1}}|{\downarrow }\rangle _{S,F_{2}}}$

(3) rewritten when concentrating on w1 +/− dichotomy in Lab ${\displaystyle L_{1}}$ : ${\displaystyle |\psi \rangle _{L_{1},L_{2}}={\frac {1}{\sqrt {3}}}{\frac {1}{\sqrt {2}}}|+\rangle _{R,F_{1}}(2|{\downarrow }\rangle _{S,F_{2}}+|{\uparrow }\rangle _{S,F_{2}})-{\frac {1}{\sqrt {3}}}{\frac {1}{\sqrt {2}}}|-\rangle _{R,F_{1}}|{\uparrow }\rangle _{S,F_{2}}}$

(4) concentrating on combinations of plus and minus for both Labs : ${\displaystyle |\psi \rangle _{L_{1},L_{2}}={\frac {1}{2{\sqrt {3}}}}(|-\rangle _{R,F_{1}}(|-\rangle _{S,F_{2}}-|+\rangle _{S,F_{2}})+|+\rangle _{R,F_{1}}(|-\rangle _{S,F_{2}}+3|+\rangle _{S,F_{2}})}$

(To check the correctness of these rewritings, replace in statements (1) till (3) all states by linear combinations of "+" and "−", like for instance replace ${\displaystyle |t\rangle _{R,F_{1}}}$ by ${\displaystyle {\frac {1}{\sqrt {2}}}(|+\rangle _{R,F_{1}}-|-\rangle _{R,F_{1}})}$, and check after these substitutions, that all three will end up like rewriting number (4).)

The meaning and implications of the Extended Wigner's friend thought experiment are still highly debated. A number of assumptions taken in the argument are very foundational in content, and therefore cannot be given up easily. However, the questions remains whether there are "hidden" assumptions that do not explicitly appear in the argument. The authors themselves seem to favour the rejection of their (implicit) assumption that macroscopic agents can be modelled as physical systems by quantum theory. Their rejection then renders their conclusion that "quantum theory cannot be extrapolated to complex systems, at least not in a straightforward manner".[11] On the other hand, one presentation of the experiment as a quantum circuit models the agents as single qubits and their reasoning as simple conditional operations.[14]

The impact of the Extended Wigner's friend thought experiment on current discussion about the foundations of quantum theory is highlighted by the fact that none of the different interpretations of quantum mechanics is able to provide a universally accepted explanation.

Looking at the rewritings used for the proofs of the four statements, it can be seen why the reasoning that combines the first three statements can lead to a conclusion (${\displaystyle W_{1}}$ gets "−" implies ${\displaystyle W_{2}}$ gets "+") that is in contradiction with the constructed overall state, in which the combined probability for (${\displaystyle W_{1}}$ gets "−" and ${\displaystyle W_{2}}$ gets "−"), is not zero, but equals ${\displaystyle {\frac {1}{12}}}$ (see rewriting (4)). The reason is that the statements have implicit assumptions that contradict each other. For instance, statement (1) about a later ${\displaystyle W_{2}}$ measurement, supposes that laboratory ${\displaystyle L_{2}}$ is in a superposition of "up" and "down" states, ie that the observer ${\displaystyle F_{2}}$ is in two states, namely thinking "the spin is up" and thinking "the spin is down". If ${\displaystyle W_{2}}$ wants to measure with respect to the ${\displaystyle |\pm \rangle _{S,F_{2}}={\frac {1}{\sqrt {2}}}(|{\downarrow }\rangle _{S,F_{2}}\pm |{\uparrow }\rangle _{S,F_{2}})}$ basis, then ${\displaystyle W_{2}}$ has two possibilities: Either (i) she constructs her projection-test-operator such that a "plus" state for ${\displaystyle F_{2}}$ will become a superposition of "up" and "down", i.e. she does not leave a univocal ${\displaystyle F_{2}}$ to stay univocal, or (ii) she changes the state of ${\displaystyle F_{2}}$ to a single state not coupled any more to the "up" or "down" of the spin (the coupling was the result of a measurement as a unitary evolution, as described in the step at ${\displaystyle t_{1}}$, and any measurement that is realized as a unitary transformation, can be undone in principle, if enough information is given to prevent entropy increase during the transformation). In both cases, the starting point of statement (2) is gone. So, the inference about a later ${\displaystyle W_{2}}$ measurement, such as made in statement (1) can only be done, when the starting point of statement (2), namely ${\displaystyle F_{2}}$ univocally thinks the spin ${\displaystyle S}$ is ${\displaystyle \uparrow }$, will be made unfullfilled.