Anticyclotomic μ-invariants of residually reducible Galois representations

Abstract

Abstract Let E be an elliptic curve over an imaginary quadratic field K, and p be an odd prime such that the residual representation E [ p ] is reducible. In this article, we study the μ-invariant of the fine Selmer group of E over the anticyclotomic Z p -extension of K. We do not impose the Heegner hypothesis on E, thus allowing certain primes of bad reduction to decompose infinitely in the anticyclotomic Z p -extension. It is shown that the fine μ-invariant vanishes if certain explicit conditions are satisfied. Further, a partial converse is proven.