RT Journal Article
T1 Geometrical entropies. The extended entropy
A1 Zoido Chamorro, Jesús Manuel
A1 Carreño Sánchez, Fernando
AB By taking into account a geometrical interpretation of the measurement process [1, 2], we define a set of measures of uncertainty. These measures will be called geometrical entropies. The amount of information is defined by considering the metric structure in the probability space. Shannon-von Neumann entropy is a particular element of this set. We show the incompatibility between this element and the concept of variance as a measure of the statistical fluctuations. When the probability space is endowed with the generalized statistical distance proposed in reference [3], we obtain the extended entropy. This element, which belongs to the set of geometrical entropies, is fully compatible with the concept of variance. Shannon-von Neumann entropy is recovered as an approximation of the extended entropy. The behavior of both entropies is compared in the case of a particle in a square-well potential.
PB Springer
SN 1434-6028
YR 2000
FD 2000-10
LK https://hdl.handle.net/20.500.14352/60297
UL https://hdl.handle.net/20.500.14352/60297
LA eng
NO Received 4 November 1999
DS Docta Complutense
RD 16 may 2024