number field, local field, p-adic number, Galois field, Galois extension, Galois module, formal group, Honda formal group law, divisor tau function, prime number distribution, prime number
Subject:
algebraic number theory, theory of local fields, class field theory, formal group theory, analytic number theory, elementary number theory
Main publications:
T. L. Hakobyan, “On the P1 property of sequences of positive integers”, Proceedings of the YSU, 2016, № 2, 22-27
T. Hakobyan, “On the reduced group of principal units in cyclic extensions of local fields”, Zap. Nauchn. Sem. POMI, 455 (2017), 14-24
T. Hakobyan, S. Vostokov, “On an asymptotic property of divisor tau-function”, Lobachevskii J Math, 39:1 (2018), 77-83
Hakobyan T. L., Vostokov S. V., “Honda Formal Module in an Unramified p-Extension of a Local Field as a Galois Module”, Vestnik St. Petersburg University, Mathematics, 51:4 (2018), 317-321
T. Hakobyan, “On the reduced group of principal units in cyclic extensions of local fields”, Zap. Nauchn. Sem. POMI, 455 (2017), 14–24; J. Math. Sci. (N. Y.), 234:2 (2018), 122–129
2016
2.
T. L. Hakobyan, “On the $P_1$ property of sequences of positive integers”, Proceedings of the YSU, Physical and Mathematical Sciences, 2016, no. 2, 22–27