When is Every Order Ideal a Ring Ideal?, Melvin Henriksen, Suzanne Larson, Frank A. Smith
Suzanne Larson

Lattice-Ordered Algebras That Are Subdirect Products of Valuation Domains, Melvin Henriksen, Suzanne Larson, Jorge Martinez, R. G. Woods
Suzanne Larson

Sums of Semiprime, Z, and D L-Ideals in a Class of F-Rings, Suzanne Larson
Suzanne Larson

Lattice-Ordered Algebras That are Subdirect Products of Valuation Domains, Melvin Henriksen, Suzanne Larson, Jorge Martinez, R. G. Woods
Suzanne Larson

Pseudoprime L-Ideals in a Class of F-Rings, Suzanne Larson
Suzanne Larson

Finitely 1-convex f-rings, Suzanne Larson
Mathematics Faculty Works

Rings of Continuous Functions on Spaces of Finite Rank and the SV Property, Suzanne Larson
Mathematics Faculty Works

Constructing Rings of Continuous Functions in Which There are Many Maximal Ideals with Nontrivial Rank, Suzanne Larson
Mathematics Faculty Works

The Intermediate Value Theorem in f-Rings, Suzanne Larson
Mathematics Faculty Works

f-Rings in Which Every Maximal Ideal Contains Finitely Many Minimal Prime Ideals, Suzanne Larson
Mathematics Faculty Works

Lattice-Ordered Algebras That Are Subdirect Products of Valuation Domains, Melvin Henriksen, Suzanne Larson, Jorge Martinez, R. G. Woods
Mathematics Faculty Works

When is Every Order Ideal a Ring Ideal?, Suzanne Larson
Mathematics Faculty Works

Sums of Semiprime, Z, and D L-Ideals in a Class of F-Rings, Suzanne Larson
Mathematics Faculty Works

Minimal convex extensions and intersections of primary I-ideals in f-rings, Suzanne Larson
Mathematics Faculty Works

Primary l-Ideals in a Class of f-Rings, Suzanne Larson
Mathematics Faculty Works

Minimal convex extensions and intersections of primary I-ideals in f-rings, Suzanne Larson
Mathematics Faculty Works

Pseudoprime L-Ideals in a Class of F-Rings, Suzanne Larson
Mathematics Faculty Works

Convexity Conditions on f-Rings, Suzanne Larson
Mathematics Faculty Works