Abstract
The quantum superposition principle is used to establish improved upper and lower bounds for the Maccone---Pati uncertainty inequality, which is based on a weighted-like sum of the variances of observables. Our bounds include free parameters that not only guarantee nontrivial bounds but also effectively control the bounds' tightness. Significantly, these free parameters depend on neither the state nor the observables. A feature of our method is that any nontrivial bound can always be improved. In addition, we generalize both bounds to uncertainty relations with multiple (three or more) observables, maintaining the uncertainty relations' tightness. Examples are given to illustrate our improved bounds.
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