Abstract
We present a definition of the distance between probability distributions. Our definition is based on the L1 norm on space of probability measures. We compare our distance with the well-known Kullback–Leibler divergence and with the proper distance defined using the Fisher matrix as a metric on the parameter space. We consider using our notion of distance in several problems in gravitational wave data analysis: to place templates in the parameter space in searches for gravitational-wave signals, to assess quality of search templates, and to study the signal resolution.
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