Probing the octant of θ23 with very long baseline neutrino oscillation experiments: a global look

Abstract

We investigate the baseline range in which the θ23 degeneracy in neutrino oscillation probabilities is absent for fixed values of θ13 and CP violation phase δ CP. We begin by studying sensitivities of neutrino oscillation probabilities to θ13, θ23 and δ CP for very-long-baseline neutrino oscillations. We show contour graphs of the muon-neutrino survival probability P(μ μ) and the appearance probability P(e μ) on the 2θ23- 2θ13 plane for baseline lengths L=1000, 5000, \ 10000, and 12000 km. For each baseline length, it is found that P(μ μ) is more sensitive to 2θ13 at energies around its local maximum while it is more sensitive to 2θ23 at energies around its local minimum. On the other hand, the appearance probability P(e μ) is sensitive to 2θ13 and 2θ23 only near its local maximum. We observe that the θ23 degeneracy in P(μ μ) is absent at energies around the local maximum of this probability, provided θ13 is sufficiently large. The θ23 degeneracy is also absent in general near the local maximum of P(e μ). Using analytic approximations for neutrino oscillation probabilities, we demonstrate that the above observations for L=1000, 5000, 10000, and 12000 km are in fact valid for all distances. The implications of these results on probing the octant of θ23 are discussed in details.

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