Liam O’Carroll scite author profile

This paper takes a new look at ideals generated by 2×2 minors of 2×3 matrices whose entries are powers of three elements not necessarily forming a regular sequence. A special case of this are the ideals determining monomial curves in three dimensional space, which were already studied by Herzog. In the broader context studied here, these ideals are identified as Northcott ideals in the sense of Vasconcelos, and so their liaison properties are displayed. It is shown that they are set-theoretically complete intersections, revisiting the work of Bresinsky and of Valla. Even when the three elements are taken to be variables in a polynomial ring in three variables over a field, this point of view gives a larger class of ideals than just the defining ideals of monomial curves. We then characterize when the ideals in this larger class are prime, we show that they are usually radical and, using the theory of multiplicities, we give upper bounds on the number of their minimal prime ideals, one of these primes being a uniquely determined prime ideal of definition of a monomial curve. Finally, we provide examples of characteristic-dependent minimal prime and primary structures for these ideals.

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F-Inverse Semigroups

McFadden

O’Carroll

1971

Proceedings of the London Mathematical Society

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Embedding theorems for proper inverse semigroups

O’Carroll

1976

Journal of Algebra

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Liam O’Carroll

Joins and Intersections

Joins and Intersections

Ideals of Herzog–Northcott type

F-Inverse Semigroups

Embedding theorems for proper inverse semigroups

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