# Canonical states **Canonical states** are the six single-qubit states corresponding to the six cardinal points of the [[bloch-sphere|Bloch sphere]] — the $\pm z$, $\pm x$, and $\pm y$ poles. They are the eigenstates of the three [[pauli-gates|Pauli operators]] $Z$, $X$, $Y$ and are the most frequently encountered states in single-qubit quantum computing. The $\pm z$ poles are the **computational basis states** $\lvert 0\rangle$ and $\lvert 1\rangle$: $$\lvert 0\rangle = \begin{pmatrix}1\\0\end{pmatrix} \qquad \lvert 1\rangle = \begin{pmatrix}0\\1\end{pmatrix}$$ The $\pm x$ equatorial states $\lvert +\rangle$ and $\lvert -\rangle$ are equal superpositions that differ only in the relative sign of the $\lvert 1\rangle$ amplitude: $$\lvert +\rangle = \frac{1}{\sqrt{2}}(\lvert 0\rangle + \lvert 1\rangle) \qquad \lvert -\rangle = \frac{1}{\sqrt{2}}(\lvert 0\rangle - \lvert 1\rangle)$$ The $\pm y$ equatorial states $\lvert +i\rangle$ and $\lvert -i\rangle$ are equal superpositions with a complex relative phase of $\pm i$: $$\lvert +i\rangle = \frac{1}{\sqrt{2}}(\lvert 0\rangle + i\lvert 1\rangle) \qquad \lvert -i\rangle = \frac{1}{\sqrt{2}}(\lvert 0\rangle - i\lvert 1\rangle)$$ ## Pauli eigenstates Each pair is the $+1$ and $-1$ eigenstate of one Pauli operator: | State | Pauli | Eigenvalue | | $\lvert 0\rangle$ | $Z$ | $+1$ | | $\lvert 1\rangle$ | $Z$ | $-1$ | | $\lvert +\rangle$ | $X$ | $+1$ | | $\lvert -\rangle$ | $X$ | $-1$ | | $\lvert +i\rangle$ | $Y$ | $+1$ | | $\lvert -i\rangle$ | $Y$ | $-1$ | Measuring in the $Z$ basis is the default. To measure in the $X$ basis, apply $H$ before measurement; to measure in the $Y$ basis, apply $S^\dagger H$. ## Hadamard connections The [[h-gate|Hadamard gate]] exchanges the $Z$ and $X$ eigenstates: $$H\lvert 0\rangle = \lvert +\rangle \qquad H\lvert 1\rangle = \lvert -\rangle \qquad H\lvert +\rangle = \lvert 0\rangle \qquad H\lvert -\rangle = \lvert 1\rangle$$ The $Y$ eigenstates require an additional phase gate: $HS^\dagger\lvert +i\rangle = \lvert 0\rangle$ and $HS^\dagger\lvert -i\rangle = \lvert 1\rangle$. ## Individual state articles - [[ket-0|$\lvert 0\rangle$]] - [[ket-1|$\lvert 1\rangle$]] - [[ket-plus|$\lvert +\rangle$]] - [[ket-minus|$\lvert -\rangle$]] - [[ket-plus-i|$\lvert +i\rangle$]] - [[ket-minus-i|$\lvert -i\rangle$]]