On homomorphisms of bicyclic extensions of archimedean totally ordered groups
Abstract
Let B+(G) be the bicyclic extension of a totally ordered group G which is defined in [O. Gutik, D. Pagon, and K. Pavlyk, Congruences on bicyclic extensions of a linearly ordered group, Acta Comment. Univ. Tartu. Math. 15 (2011), no. 2, 61-80, (arXiv:1111.2401)]. We show that if G and H are archimedean totally ordered groups then every o-homomorphism G H generates a monoid homomorphim B+(G) B+(H), and every monoid homomorphism B+(G) B+(H) generates o-homomorphism G H.
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