TY - JOUR
T1 - Constructing rings of continuous functions in which there are many maximal ideals with Nontrivial rank
AU - Larson, Suzanne
N1 - Suzanne Larson (2003) Constructing Rings of Continuous Functions in Which There Are Many Maximal Ideals with Nontrivial Rank, Communications in Algebra, 31:5, 2183-2206, DOI: 10.1081/AGB-120018991
PY - 2003/5/1
Y1 - 2003/5/1
N2 - Let X be a topological space, and let C (X) denote the f-ring of all continuous real-valued functions defined on X. For x ∈ X, we define the rank of x to be the number of minimal prime ideals contained in the maximal ideal M x = {f ∈ C (X) : f(x) = 0} if there are finitely many such minimal prime ideals, and the rank of x to be infinite if there are infinitely many minimal prime ideals contained in M x . We call X an SV-space if C (X)/P is a valuation domain for each minimal prime ideal P of C (X). A construction of topological spaces is given showing that a compact SV-space need not be a union of finitely many compact F-spaces and that in a compact space where every point has finite rank, the set of points of rank one need not be open.
AB - Let X be a topological space, and let C (X) denote the f-ring of all continuous real-valued functions defined on X. For x ∈ X, we define the rank of x to be the number of minimal prime ideals contained in the maximal ideal M x = {f ∈ C (X) : f(x) = 0} if there are finitely many such minimal prime ideals, and the rank of x to be infinite if there are infinitely many minimal prime ideals contained in M x . We call X an SV-space if C (X)/P is a valuation domain for each minimal prime ideal P of C (X). A construction of topological spaces is given showing that a compact SV-space need not be a union of finitely many compact F-spaces and that in a compact space where every point has finite rank, the set of points of rank one need not be open.
KW - f-Ring
KW - Rank of a maximal ideal
KW - Rings of continuous functions
KW - SV-ring
KW - SV-space
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U2 - 10.1081/AGB-120018991
DO - 10.1081/AGB-120018991
M3 - Article
AN - SCOPUS:0037767122
SN - 0092-7872
VL - 31
SP - 2183
EP - 2206
JO - Communications in Algebra
JF - Communications in Algebra
IS - 5
ER -