Advantages of nonclassical pointer states in postselected weak measurements
Advantages of nonclassical pointer states in postselected weak measurements
We investigate, within the weak measurement theory, the advantages of nonclassical pointer states over semiclassical ones for coherent, squeezed vacuum, and Schr\"odinger cat states. These states are utilized as pointer states for the system operator $\stackrel{\ifmmode \hat{}\else \^{}\fi{}}{A}$ with property ${\stackrel{\ifmmode \hat{}\else \^{}\fi{}}{A}}^{2}=\stackrel{\ifmmode \hat{}\else \^{}\fi{}}{I}$, where $\stackrel{\ifmmode \hat{}\else \^{}\fi{}}{I}$ represents …