Research Article
Year 2017,
, 39 - 44, 11.07.2017
Abstract
Let $S$ be a g-monoid with
quotient group q$(S)$. Let $\bar {\rm F}(S)$ (resp., F$(S)$,
f$(S)$) be the $S$-submodules of q$(S)$ (resp., the fractional
ideals of $S$, the finitely generated fractional ideals of
$S$). Briefly, set f := f$(S)$, g := F$(S)$, h := $\bar{\rm
F}(S)$, and let $\{\rm{x,y}\}$ be a subset of the set $\{$f,
g, h$\}$ of symbols. For a semistar operation $\star$ on $S$,
if $(E + E_1)^\star = (E + E_2)^\star$ implies ${E_1}^\star =
{E_2}^\star$ for every $E \in$ x and every $E_1, E_2 \in$ y,
then $\star$ is called xy-cancellative. In this paper, we
prove that a gg-cancellative semistar operation
need not be fh-cancellative.
Keywords
References
- M. Fontana and K. A. Loper, Kronecker function rings: a general approach, Ideal theoretic methods in commutative algebra (Columbia, MO, 1999), Lec- ture Notes in Pure and Appl. Math., 220 (2001), 189-205.
- M. Fontana and K. A. Loper, Cancellation properties in ideal systems: A classification of e.a.b. semistar operations, J. Pure Appl. Algebra, 213(11) (2009), 2095-2103.
- M. Fontana, K. A. Loper and R. Matsuda, Cancellation properties in ideal systems: an e.a.b. not a.b. star operation, Arab. J. Sci. Eng. ASJE. Math., 35 (2010), 45-49.
- R. Gilmer, Multiplicative Ideal Theory, Pure and Applied Mathematics, 12, Marcel Dekker, Inc., New York, 1972.
- R. Gilmer, Commutative Semigroup Rings, Chicago Lectures in Mathematics, University of Chicago Press, Chicago, IL, 1984.
- F. Halter-Koch, Ideal Systems: An Introduction to Multiplicative Ideal The- ory, Monographs and Textbooks in Pure and Applied Mathematics, 211, Mar- cel Dekker, Inc., New York, 1998.
- R. Matsuda, Multiplicative Ideal Theory for Semigroups, 2nd ed., Kaisei, Tokyo, 2002.
- R. Matsuda, Note on g-monoids, Math. J. Ibaraki Univ., 42 (2010), 17-41.
- R. Matsuda, Cancellation properties in ideal systems of monoids, Int. Electron. J. Algebra, 9 (2011), 61-68.
- R. Matsuda, Note on cancellation properties in ideal systems, Comm. Algebra, 43(1) (2015), 23-28.
- R. Matsuda, A gg not gh semistar operation on monoids, Bull. Allahabad Math. Soc., 31(1) (2016), 111-119.
- D. G. Northcott, Lessons on Rings, Modules and Multiplicities, Cambridge Univ. Press, London, 1968.
Year 2017,
, 39 - 44, 11.07.2017
Abstract
References
- M. Fontana and K. A. Loper, Kronecker function rings: a general approach, Ideal theoretic methods in commutative algebra (Columbia, MO, 1999), Lec- ture Notes in Pure and Appl. Math., 220 (2001), 189-205.
- M. Fontana and K. A. Loper, Cancellation properties in ideal systems: A classification of e.a.b. semistar operations, J. Pure Appl. Algebra, 213(11) (2009), 2095-2103.
- M. Fontana, K. A. Loper and R. Matsuda, Cancellation properties in ideal systems: an e.a.b. not a.b. star operation, Arab. J. Sci. Eng. ASJE. Math., 35 (2010), 45-49.
- R. Gilmer, Multiplicative Ideal Theory, Pure and Applied Mathematics, 12, Marcel Dekker, Inc., New York, 1972.
- R. Gilmer, Commutative Semigroup Rings, Chicago Lectures in Mathematics, University of Chicago Press, Chicago, IL, 1984.
- F. Halter-Koch, Ideal Systems: An Introduction to Multiplicative Ideal The- ory, Monographs and Textbooks in Pure and Applied Mathematics, 211, Mar- cel Dekker, Inc., New York, 1998.
- R. Matsuda, Multiplicative Ideal Theory for Semigroups, 2nd ed., Kaisei, Tokyo, 2002.
- R. Matsuda, Note on g-monoids, Math. J. Ibaraki Univ., 42 (2010), 17-41.
- R. Matsuda, Cancellation properties in ideal systems of monoids, Int. Electron. J. Algebra, 9 (2011), 61-68.
- R. Matsuda, Note on cancellation properties in ideal systems, Comm. Algebra, 43(1) (2015), 23-28.
- R. Matsuda, A gg not gh semistar operation on monoids, Bull. Allahabad Math. Soc., 31(1) (2016), 111-119.
- D. G. Northcott, Lessons on Rings, Modules and Multiplicities, Cambridge Univ. Press, London, 1968.
There are 12 citations in total.
Details
| Subjects | Mathematical Sciences |
|---|---|
| Journal Section | Articles |
| Authors | |
| Publication Date | July 11, 2017 |
| Published in Issue | Year 2017 |