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TRIANGULAR FUNCTIONALS ON COMMUTATIVE SEMIGROUPS
1984The author discusses conditions which allow one to begin with a functional on a commutative topological semigroup and produce a subadditive homogeneous functional with the same zero set and the same zero convergence. He establishes a result pertaining to extensions of homogeneous triangular functionals on a topological semigroup with zero.
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2001
In this chapter we deal with semigroups which are both ∛-commutative and conditionally commutative. These semigroups are called ∛C-commutative semigroups. The ∛-commutative semigroups and the conditionally commutative semigroups are examined in Chapter 5 and Chapter 6, respectively. From the results of those chapters it follows that every C-commutative
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In this chapter we deal with semigroups which are both ∛-commutative and conditionally commutative. These semigroups are called ∛C-commutative semigroups. The ∛-commutative semigroups and the conditionally commutative semigroups are examined in Chapter 5 and Chapter 6, respectively. From the results of those chapters it follows that every C-commutative
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Annihilators in zero-divisor graphs of semilattices and reduced commutative semigroups
, 2016J. LaGrange
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Divisible commutative semigroups
Let N, R+ and R denote the set of all positive integers, the set of all positive real numbers and the set of all real numbers, respectively. Let (S,+) be a semigroup. If for any element x of S and for any positive integer n, there is an element y of S such that x = ny = y + ... + y (n times), then S is said to be divisible.openaire +1 more source
Erdős-Ginzburg-Ziv theorem for finite commutative semigroups
, 2014Sukumar Das Adhikari +2 more
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Exponential space complete problems for Petri nets and commutative semigroups (Preliminary Report)
Symposium on the Theory of Computing, 1976E. Cardoza, R. Lipton, A. Meyer
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