On the Characterization off-Ideals

“…In [1], the authors characterized the f -ideals of degree 2. This result was then generalized for unmixed f -ideals for degree d ≥ 2 in [2]. Later on the notion of f -graph was introduced in [9].…”

On the connectedness of f-simplicial complexes

“…In [1], the authors characterized the f -ideals of degree 2. This result was then generalized for unmixed f -ideals for degree d ≥ 2 in [2]. Later on the notion of f -graph was introduced in [9].…”

On the connectedness of f-simplicial complexes

“…In order to characterize f -ideals for any degree, it was needed to see it through combinatorial and topological aspects too. The characterization of f -ideals for homogeneous unmixed square-free monomial ideals of any degree d was given in [2], in which combinatorial aspects were also considered. Later on, the notion of f -graphs (in [13]) and f -simplicial complex (in [14]) was introduced.…”

“…Later on, the notion of f -graphs (in [13]) and f -simplicial complex (in [14]) was introduced. These notions have been studied for it various properties in the papers [1], [2], [5], [10], [11], [12], [13], [14] and [15]. In Computational Algebraic Geometry and Commutative Algebra, the notion of Hilbert polynomial and Hilbert series are very useful and important invariants of any finitely generated standard graded algebra over some field.…”

Quasi f-Ideals

“…By Lemma 3.1 and the equation (1.1) in Section 1, (1) is clear. In order to prove (2), it will suffice to show that there exists a perfect set with cardinality t = n−d+2 i=5…”

“…The formal definition of an f -ideal appeared first in [1], and it is then studied in [2]. In [7], a monomial ideal I of K[x 1 , .…”

ON THE (n, d)^thf-IDEALS