On Gauss factorials and their connection to the cyclotomic λ-invariants of imaginary quadratic fields

“…if and only if λ p (Q(i)) > 1 (see Theorem 1.1 in [7]). In the same paper, the author establishes a connection between the 1-exceptional primes for m = 3 and 4, and the Glaisher and Euler numbers respectively (see Corollaries 1.3 and 1.4 of [7]). Thus we have, Theorem 6.1.…”

On CM elliptic curves and the cyclotomic $λ$-invariants of imaginary quadratic fields

“…if and only if λ p (Q(i)) > 1 (see Theorem 1.1 in [7]). In the same paper, the author establishes a connection between the 1-exceptional primes for m = 3 and 4, and the Glaisher and Euler numbers respectively (see Corollaries 1.3 and 1.4 of [7]). Thus we have, Theorem 6.1.…”

On CM elliptic curves and the cyclotomic $λ$-invariants of imaginary quadratic fields

On CM elliptic curves and the cyclotomic λ-invariants of imaginary quadratic fields