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Journal of Mathematical Sciences, 2018
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International Journal of Foundations of Computer Science
We revisit the basic concept of quotient of a regular language [Formula: see text] by a language [Formula: see text] that is not necessarily regular. We revise the deterministic complexity upper bounds of the quotient operation, and we also address the nondeterministic case.
Stavros Konstantinidis +2 more
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We revisit the basic concept of quotient of a regular language [Formula: see text] by a language [Formula: see text] that is not necessarily regular. We revise the deterministic complexity upper bounds of the quotient operation, and we also address the nondeterministic case.
Stavros Konstantinidis +2 more
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JAMA: The Journal of the American Medical Association, 1982
To the Editor.— The description of the inhibitory quotient (IQ) by Paul D. Ellner, PhD, and Harold C. Neu, MD (1981;246:1575), was welcome, as it formalizes the thought processes that must occur whenever quantitative susceptibility data are interpreted by the clinician.
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To the Editor.— The description of the inhibitory quotient (IQ) by Paul D. Ellner, PhD, and Harold C. Neu, MD (1981;246:1575), was welcome, as it formalizes the thought processes that must occur whenever quantitative susceptibility data are interpreted by the clinician.
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Mathematical Notes, 2018
The author considers the category of equiuniform group actions, i.e., group actions \((X,G)\) which are bounded with respect to a given invariant uniformity on \(X\). Given a normal subgroup \(N \le G\), he constructs a quotient equiuniform action in the sense of category theory. This means that he constructs an equiuniform group action \((X,G)/N\) and
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The author considers the category of equiuniform group actions, i.e., group actions \((X,G)\) which are bounded with respect to a given invariant uniformity on \(X\). Given a normal subgroup \(N \le G\), he constructs a quotient equiuniform action in the sense of category theory. This means that he constructs an equiuniform group action \((X,G)/N\) and
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Emotional Quotient Scores Over Intelligence Quotient
Nursing Journal of India, 2010openaire +2 more sources
2005
Assume that the Riesz space \(L\) has a separating order dual \(L^\sim\) and is an \(f\)-module over a commutative (archimedean) \(f\)-algebra with unit \((e)\). \(L\) is called discrete w.r.t. \(Z(A)\), the center of \(A\), if for \(0 \leq y \leq x\) there exists an element \(a \in A\), \(0 \leq a \leq e\), such that \(ax=y\); \(L\) is called ...
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Assume that the Riesz space \(L\) has a separating order dual \(L^\sim\) and is an \(f\)-module over a commutative (archimedean) \(f\)-algebra with unit \((e)\). \(L\) is called discrete w.r.t. \(Z(A)\), the center of \(A\), if for \(0 \leq y \leq x\) there exists an element \(a \in A\), \(0 \leq a \leq e\), such that \(ax=y\); \(L\) is called ...
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