Space-Dependent Probabilities for $K^0-\bar{K^0}$ Oscillations

Details Space-Dependent Probabilities for $K^0-\bar{K^0}$ Oscillations Space-Dependent Probabilities for $K^0-\bar{K^0}$ Oscillations

1996-05-31

arxiv.org/abs/hep-ph/9605454v1

Phys.Lett. B389 (1996) 149-156

Physics

High Energy Physics

High Energy Physics - Phenomenology

11 pages, latex

Scientific paper

10.1016/S0370-2693(96)01246-4

We analyze $K^0-\bar{K^0}$ oscillations in space in terms of propagating wave packets with coherent $K_S$ and $K_L$ components. The oscillation probabilities $P_{K^0 \to K^0} (x)$ and $P_{K^0 \to \bar{K^0}} (x)$ depending only on the distance $x$, are defined through the time integration of a current density $j(x,t)$ . The definition is such that it coincides with the experimental setting, thus avoiding some ambiguities and clarifying some controversies that have been discussed recently.

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