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Nation, James B. - Department of Mathematics, University of Hawai'i at Manoa
LARGEST EXTENSION OF A FINITE CONVEX GEOMETRY K. V. ADARICHEVA AND J. B. NATION
Closure operators and lattice extensions J. B. Nation (jb@math.hawaii.edu)
LATTICES WITH LARGE MINIMAL EXTENSIONS RALPH FREESE, JAROSLAV JEZEK, AND J. B. NATION
DUAL LINEAR SPACES GENERATED BY A NON-DESARGUESIAN CONFIGURATION
UNBOUNDED SEMIDISTRIBUTIVE LATTICES J. B. NATION
Whaley's Theorem for Finite Lattices Ralph Freese (ralph@math.hawaii.edu)
LATTICES OF THEORIES IN LANGUAGES WITHOUT J. B. NATION
Whaley's Theorem for Finite Lattices Ralph Freese (ralph@math.hawaii.edu)
UNBOUNDED SEMIDISTRIBUTIVE LATTICES J. B. NATION
Closure operators and lattice extensions J. B. Nation (jb@math.hawaii.edu)
MAXIMAL SUBLATTICES AND FRATTINI SUBLATTICES OF BOUNDED LATTICES
ORDERED DIRECT IMPLICATIONAL BASIS OF A FINITE CLOSURE SYSTEM
SOME LATTICES OF QUASI-EQUATIONAL THEORIES FROM THE UAC
A new look at the Jordan-Holder theorem for semimodular lattices
PRIME INTERVALS AND MAXIMAL CHAINS IN FINITE DIMENSIONAL SEMIMODULAR LATTICES
LATTICES OF ATOMIC THEORIES IN LANGUAGES WITHOUT EQUALITY
LATTICES OF THEORIES IN LANGUAGES WITHOUT J. B. NATION
LATTICES OF QUASI-EQUATIONAL THEORIES AS CONGRUENCE LATTICES OF SEMILATTICES WITH
A MODULAR INHERENTLY NONFINITELY BASED LATTICE
LARGEST EXTENSION OF A FINITE CONVEX GEOMETRY K. V. ADARICHEVA AND J. B. NATION
FORMAL DESCRIPTIONS OF DEVELOPING SYSTEMS: AN J. B. NATION
THE LATTICE OF COMPLETIONS OF AN ORDERED SET J. B. NATION AND ALEX POGEL
A COUNTEREXAMPLE TO THE FINITE HEIGHT J. B. NATION
LATTICES OF QUASI-EQUATIONAL THEORIES AS CONGRUENCE LATTICES OF SEMILATTICES WITH
THE LATTICE OF COMPLETIONS OF AN ORDERED SET J. B. NATION AND ALEX POGEL
FORMAL DESCRIPTIONS OF DEVELOPING SYSTEMS: AN J. B. NATION
A MODULAR INHERENTLY NONFINITELY BASED LATTICE
ABSTRACT REFLEXIVE SUBLATTICES AND COMPLETELY DISTRIBUTIVE COLLAPSIBILITY
ABSTRACT REFLEXIVE SUBLATTICES AND COMPLETELY DISTRIBUTIVE COLLAPSIBILITY
A COUNTEREXAMPLE TO THE FINITE HEIGHT J. B. NATION
Axiomatizable and Nonaxiomatizable Congruence Prevarieties
LATTICES OF QUASI-EQUATIONAL THEORIES AS CONGRUENCE LATTICES OF SEMILATTICES WITH
LATTICES OF QUASI-EQUATIONAL THEORIES AS CONGRUENCE LATTICES OF SEMILATTICES WITH
