A
-
Archimedean ring
The ring of real-continuous functions on a topoframe [Volume 4, Issue 1, 2016, Pages 75-94]
C
-
Cantor
Birkhoff's Theorem from a geometric perspective: A simple example [Volume 4, Issue 1, 2016, Pages 1-8]
F
-
Fitting ideals
A characterization of finitely generated multiplication modules [Volume 4, Issue 1, 2016, Pages 63-74]
G
-
Girth
On zero divisor graph of unique product monoid rings over Noetherian reversible ring [Volume 4, Issue 1, 2016, Pages 95-114]
-
Grothendieck spectrum
Birkhoff's Theorem from a geometric perspective: A simple example [Volume 4, Issue 1, 2016, Pages 1-8]
H
-
Hilbert
Birkhoff's Theorem from a geometric perspective: A simple example [Volume 4, Issue 1, 2016, Pages 1-8]
M
-
Monoid rings
On zero divisor graph of unique product monoid rings over Noetherian reversible ring [Volume 4, Issue 1, 2016, Pages 95-114]
P
-
Polynomial rings
On zero divisor graph of unique product monoid rings over Noetherian reversible ring [Volume 4, Issue 1, 2016, Pages 95-114]
R
-
Reflexive Graphs
Birkhoff's Theorem from a geometric perspective: A simple example [Volume 4, Issue 1, 2016, Pages 1-8]
-
Reversible rings
On zero divisor graph of unique product monoid rings over Noetherian reversible ring [Volume 4, Issue 1, 2016, Pages 95-114]
-
Ring of real continuous
functions
The ring of real-continuous functions on a topoframe [Volume 4, Issue 1, 2016, Pages 75-94]
T
-
Topoframe
The ring of real-continuous functions on a topoframe [Volume 4, Issue 1, 2016, Pages 75-94]
U
-
Unique product monoids
On zero divisor graph of unique product monoid rings over Noetherian reversible ring [Volume 4, Issue 1, 2016, Pages 95-114]
Z
-
Zero-divisor graphs
On zero divisor graph of unique product monoid rings over Noetherian reversible ring [Volume 4, Issue 1, 2016, Pages 95-114]
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