Incompatibility of quantum measurements

Template:Short description Template:Orphan

Template:Sidebar with collapsible lists

Incompatibility of quantum measurements is a crucial concept of quantum information, addressing whether two or more quantum measurements can be performed on a quantum system simultaneously.^[1] It highlights the unique and non-classical behavior of quantum systems.^[2] This concept is fundamental to the nature of quantum mechanics and has practical applications in various quantum information processing tasks like quantum key distribution and quantum metrology.^[1][2]

The concept of incompatibility of quantum measurements originated from Heisenberg's uncertainty principle,^[2] which states that certain pairs of physical quantities, like position and momentum, cannot be simultaneously measured with arbitrary precision.^[3] This principle laid the groundwork for understanding the limitations of measurements in quantum mechanics.^[1]

In the mid-20th century, researchers began to formalize the idea of compatibility of quantum measurements, and to explore conditions under which a set of measurements can be performed together on a single quantum system without disturbing each other.^[4] This was crucial for understanding how quantum systems behave under simultaneous observations.^[1]

The study of incompatibility of quantum measurements gained significant attention with the rise of quantum information theory. Researchers realized that measurement incompatibility is not just a limitation but also a resource for various quantum information processing tasks.^[2] For example, it plays a crucial role in quantum cryptography, where the security of quantum key distribution protocols relies on the incompatibility of certain quantum measurements.^[1]

Modern research focuses on quantifying measurement incompatibility using various measures. Quite a number of approaches involve robustness-based measures, which assess how much noise can be added to a set of quantum measurements before they become compatible.^[2]

In quantum mechanics, two measurements, ${\displaystyle M_1}$ and ${\displaystyle M_2}$, are called compatible if and only if there exists a third measurement ${\displaystyle M}$ of which ${\displaystyle M_1,M_2}$ can be obtained as margins, or equivalently, from which ${\displaystyle M_1,M_2}$ can be simulated via classical post-processingsTemplate:Disambiguation needed.^[4] More precisely, let ${\displaystyle M_1:{𝒜}_1\to ℬ(ℍ)}$ and ${\displaystyle M_2:{𝒜}_2\to ℬ(ℍ)}$ be two positive operator-valued measures (POVMs), where ${\displaystyle (X_1,{𝒜}_1),(X_2,{𝒜}_2)}$ are two measurable spaces, and ${\displaystyle ℬ(ℍ)}$ is the set of bounded linear operators on a Hilbert space ${\displaystyle ℍ}$. Then ${\displaystyle M_1,M_2}$ are called compatible (jointly measurable) if and only if there is a POVM ${\displaystyle M:{𝒜}_1\otimes {𝒜}_2\to ℬ(ℍ)}$ such that

${\displaystyle M(A_1\times X_2)=M_1(A_1),}$

${\displaystyle M(X_1\times A_2)=M_2(A_2),}$

for all ${\displaystyle A_1\in {𝒜}_1}$ and ${\displaystyle A_2\in {𝒜}_2}$. Otherwise, ${\displaystyle M_1,M_2}$ are called incompatible. The definition of compatibility of a finite number of POVMs is similar.^[4]

For a two-outcome POVM ${\displaystyle M_{\pm }}$ on a qubit it is possible to write

${\displaystyle M_{\pm }=\frac{1}{2}[(1\pm \alpha )𝐈\pm \overrightarrow{m}\cdot \overrightarrow{\sigma }],}$

where ${\displaystyle \overrightarrow{m}\cdot \overrightarrow{\sigma }=m_x{\sigma }_x+m_y{\sigma }_y+m_z{\sigma }_z}$ with ${\displaystyle {\sigma }_x,{\sigma }_y,{\sigma }_z}$ are Pauli matrices.^[2] Let ${\displaystyle M_{\pm |1}}$ and ${\displaystyle M_{\pm |2}}$ be two such POVMs with ${\displaystyle {\alpha }_1={\alpha }_2=0}$, ${\displaystyle {\overrightarrow{m}}_1=(\mu ,0,0)}$, and ${\displaystyle {\overrightarrow{m}}_2=(0,0,\mu )}$, where ${\displaystyle \mu \in [0,1]}$.^[2] Then for ${\displaystyle \mu \in [0,1/\sqrt{2}]}$ one can verify that the following POVM

${\displaystyle M_{+,+}:=\frac{1}{4}[𝐈+\mu ({\sigma }_x+{\sigma }_z)],}$

${\displaystyle M_{-,+}:=\frac{1}{4}[𝐈+\mu (-{\sigma }_x+{\sigma }_z)],}$

${\displaystyle M_{+,-}:=\frac{1}{4}[𝐈+\mu ({\sigma }_x-{\sigma }_z)],}$

${\displaystyle M_{-,-}:=\frac{1}{4}[𝐈+\mu (-{\sigma }_x-{\sigma }_z)],}$

is a compatiblizer of ${\displaystyle M_{\pm |1}}$ and ${\displaystyle M_{\pm |2}}$, despite the fact that ${\displaystyle M_{\pm |1}}$ and ${\displaystyle M_{\pm |2}}$ are noncommutative for ${\displaystyle \mu \in (0,1/\sqrt{2}]}$.^[2] As for ${\displaystyle \mu \in (1/\sqrt{2},1]}$, it was shown that ${\displaystyle M_{\pm |1},M_{\pm |2}}$ are incompatible.^[5]

Let ${\displaystyle M_1,M_2}$ be two two-outcome POVMs on a qubit. It was shown that ${\displaystyle M_1,M_2}$ are compatible if and only if

${\displaystyle (1-C_1^2-C_2^2)(1-\frac{{\alpha }_1^2}{C_1^2}-\frac{{\alpha }_2^2}{C_2^2})⩽{({\overrightarrow{m}}_1\cdot {\overrightarrow{m}}_2-{\alpha }_1{\alpha }_2)}^2,}$

where ${\displaystyle C_i=\frac{1}{2}[\sqrt{(1+{\alpha }_i{)}^2-{\left|{\overrightarrow{m}}_i\right|}^2}+\sqrt{(1-{\alpha }_i{)}^2-{\left|{\overrightarrow{m}}_i\right|}^2}],}$ for ${\displaystyle i=1,2}$.^[6] Moreover, let ${\displaystyle M_1,M_2,M_3}$ be three two-outcome POVMs on a qubit with ${\displaystyle {\alpha }_1={\alpha }_2={\alpha }_3=0}$. Then it was proved that ${\displaystyle M_1,M_2,M_3}$ are compatible if and only if

${\displaystyle \underset{\overrightarrow{n}\in {ℝ}^3}{\min }{\displaystyle \sum _{j=0}^3}|{\overrightarrow{n}}_j-\overrightarrow{n}|⩽4,}$

where ${\displaystyle {\overrightarrow{n}}_0={\overrightarrow{m}}_1+{\overrightarrow{m}}_2+{\overrightarrow{m}}_3}$, and ${\displaystyle {\overrightarrow{n}}_j=2{\overrightarrow{m}}_j-{\overrightarrow{n}}_0}$ for ${\displaystyle j=1,2,3}$.^[7]

For a finite number of POVMs ${\displaystyle \{M_{x|i}\}}$ on a finite-dimensional quantum system, with a finite number of measurement outcomes (labeled by ${\displaystyle x}$), one can cast the following semidefinite program (SDP) to decide whether they are compatible or not:

${\displaystyle \mathrm{g}\mathrm{i}\mathrm{v}\mathrm{e}\mathrm{n}\{M_{x|i}\},\{p(x|i,\lambda )\}}$

${\displaystyle \underset{\{G_{\lambda }\}}{\max }\mu }$

${\displaystyle \mathrm{s}\mathrm{u}\mathrm{b}\mathrm{j}\mathrm{e}\mathrm{c}\mathrm{t}\mathrm{t}\mathrm{o}\sum _{\lambda }p(x|i,\lambda )G_{\lambda }=M_{x|i},\mathrm{\forall }x,i,}$

${\displaystyle G_{\lambda }⩾\mu 𝐈,\mathrm{\forall }\lambda \mathrm{a}\mathrm{n}\mathrm{d}\sum _{\lambda }{G}_{\lambda }=𝐈.}$

where ${\displaystyle \{p(x|i,\lambda )\}}$ is a deterministic classical post-processing (i.e., ${\displaystyle 0}$ or ${\displaystyle 1}$ valued conditional probability density).^[2] If for all ${\displaystyle \{p(x|i,\lambda )\}}$ the maximizer ${\displaystyle \{G_{\lambda }\}}$ leads to a negative ${\displaystyle \mu }$, then ${\displaystyle \{M_{x|i}\}}$ are incompatible. Otherwise, they are compatible.^[2]

Let ${\displaystyle \{M_{x|i}\}}$ be a finite number of POVMs. Incompatibility noise robustness ${\displaystyle R_{\mathrm{n}}}$ of ${\displaystyle \{M_{x|i}\}}$ is defined by

${\displaystyle R_{\mathrm{n}}(\{M_{x|i}\})=\inf \{p\in [0,1]|\{(1-p)M_{x|i}+p\mathrm{I}/|x|\}\text{are compatible}\},}$

where ${\displaystyle |x|}$ denotes the number of outcomes.^[8] This quantity is a monotone under quantum channels since (i) it vanishes on ${\displaystyle \{M_{x|i}\}}$ that are compatible, (ii) it is symmetric under the exchange of POVMs, and (iii) it does not increase under the pre-processing by a quantum channel.^[8]

Incompatibility weight ${\displaystyle W}$ of POVMs ${\displaystyle \{M_{x|i}\}}$ is defined by

${\displaystyle W(\{M_{x|i}\})=\inf \{q⩾0:\left\{\frac{M_{x|i}-q{N}_{x|i}}{1-q}\right\}\text{are compatible}\},}$

where ${\displaystyle \{N_{x|i}\}}$ is any set of POVMs.^[9] This quantity is a monotone under compatibility nondecreasing operations that consist of pre-processing by a quantum instrument and classical post-processing.^[9]

Incompatibility robustness ${\displaystyle R}$ of POVMs ${\displaystyle \{M_{x|i}\}}$ is defined by

${\displaystyle R(\{M_{x|i}\})=\inf \{r⩾0:\left\{\frac{M_{x|i}+r{N}_{x|i}}{1+r}\right\}\text{are compatible}\},}$

where ${\displaystyle \{N_{x|i}\}}$ is any set of POVMs.^[10] Similar to incompatibility weight, this quantity is a monotone under compatibility nondecreasing operations.^[10]

All these quantifiers are based on the convex distance of incompatible POVMs to the set of compatible ones under the addition of different types of noise.^[2] Specifically, all these quantifiers can be evaluated numerically, as they fall under the framework of SDPs.^[2] For instance, it was shown that incompatibility robustness can be cast as the following SDP:

${\displaystyle \mathrm{g}\mathrm{i}\mathrm{v}\mathrm{e}\mathrm{n}\{M_{x|i}\}}$

${\displaystyle \underset{(\{G_{\lambda }\},\{p(x|i,\lambda )\})}{\min }\frac{1}{d}\sum _{\lambda }\mathrm{t}\mathrm{r}(G_{\lambda })}$

${\displaystyle \mathrm{s}\mathrm{u}\mathrm{b}\mathrm{j}\mathrm{e}\mathrm{c}\mathrm{t}\mathrm{t}\mathrm{o}\sum _{\lambda }p(x|i,\lambda )G_{\lambda }⩾M_{x|i},\mathrm{\forall }x,i,}$

${\displaystyle G_{\lambda }⩾0,\mathrm{\forall }\lambda \mathrm{a}\mathrm{n}\mathrm{d}\sum _{\lambda }{G}_{\lambda }=\frac{𝐈}{d}[\sum _{\lambda }\mathrm{t}\mathrm{r}(G_{\lambda })],}$

where ${\displaystyle \{p(x|i,\lambda )\}}$ is a deterministic classical post-processing, and ${\displaystyle d}$ is the dimension of the Hilbert space on which ${\displaystyle \{M_{x|i}\}}$ are performed.^[10] If the minimizer is ${\displaystyle (\{G_{{\lambda }^{\prime }}\},\{p(x|i,\lambda {)}^{\prime }\})}$, then ${\displaystyle R(\{M_{x|i}\})=\frac{1}{d}\sum _{\lambda }\mathrm{t}\mathrm{r}(G_{{\lambda }^{\prime }})-1}$.^[10]

Measurement incompatibility is intrinsically tied to the nonclassical features of quantum correlations.^[2] In fact, in many scenarios, it becomes evident that incompatible measurements are necessary to exhibit nonclassical correlations.^[2] Since such correlations are essential for tasks like quantum key distribution or quantum metrology, these connections underscore the resource aspect of measurement incompatibility.^[2]

Bell nonlocality is a phenomenon where the correlations between quantum measurements on entangled quantum states cannot be explained by any local hidden variable theory.^[11] This was first demonstrated by Bell through Bell's Theorem, which showed that certain predictions of quantum mechanics are incompatible with the principle of locality (an idea that objects are only directly influenced by their immediate surroundings).^[11]

If the POVMs on Alice's side are compatible, then they will never lead to Bell nonlocality.^[12] However, the converse is not true. It was shown that there exist three binary measurements on a qubit, pairwise compatible but globally incompatible, yet not leading to any Bell nonlocality.^[13]

Quantum steering is a phenomenon where one party (Alice) can influence the state of a distant party's (Bob's) quantum system through local measurements on her own quantum system.^[14] This was first introduced by Schrödinger and is a form of quantum nonlocality. It demonstrates that the state of Bob's quantum system can be "steered" into different states depending on the local measurements performed by Alice.^[14]

For quantum steering to occur, the local measurements performed by Alice must be incompatible.^[14] This is because steering relies on the ability to create different outcomes in Bob's system based on Alice's measurements, which is only possible if those measurements are not compatible. Further, it was shown that if the following POVMs ${\displaystyle \left\{{\sigma }_i^{-1/2}{\sigma }_{x|i}{\sigma }_i^{-1/2}\right\}}$ are incompatible, then a state assemblage ${\displaystyle \{{\sigma }_{x|i}\}}$ is steerable, where ${\displaystyle {\sigma }_i=\sum _x{\sigma }_{x|i}}$.^[2]

Quantum contextuality refers to the idea that the outcome of a quantum measurement cannot be explained by any pre-existing value that is independent of the measurement context.^[15] In other words, the result of a quantum measurement depends on which other measurements are being performed simultaneously. This concept challenges classical notions of reality, where it is assumed that properties of a system exist independently of measurement.^[15]

It was proved that any set of compatible POVMs leads to preparation noncontextual correlations for all input quantum states.^[2] Conversely, the existence of a preparation noncontextual model for all input states implies compatibility of the involved POVMs.^[2]

Template:Div col

• Generalized probabilistic theory
• Mathematical formulation of quantum mechanics
• Qudit
• Quantum information

Template:Div col end

Template:Reflist

• Template:Cite book
• Template:Cite book
• Template:Cite book
• Template:Cite book
• Template:Cite book
• Template:Cite book

Template:Quantum information Template:Quantum mechanics topics Template:Optimization Template:Measure theory