Let p be a prime number, E be an elliptic curve over Qₚ with good supersingular reduction, and C be a principal homogeneous space of E/Qₚ with period pⁿ. In this paper we give a sufficient condition for extensions F/Qₚ so that C (F). In particular, we show that a totally ramified abelian extension F/Qₚ splits C if F: Qₚ is sufficiently large. Moreover, in case n=1, we show that a degree p extension F/Qₚ splits C if and only if vF (D₅/ₐ䂹) =2p-1. This result is an analogue and also a complement to a result of Lang-Tate on splitting fields of principal homogeneous spaces of abelian varieties.
Cheng et al. (Thu,) studied this question.
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