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Frobenius Functors of the second kind
- Comm. Algebra
"... Abstract. A pair of adjoint functors (F, G) is called a Frobenius pair of the second type if G is a left adjoint of βFα for some category equivalences α and β. Frobenius ring extensions of the second kind provide examples of Frobenius pairs of the second kind. We study Frobenius pairs of the second ..."
Abstract
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Cited by 12 (3 self)
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Abstract. A pair of adjoint functors (F, G) is called a Frobenius pair of the second type if G is a left adjoint of βFα for some category equivalences α and β. Frobenius ring extensions of the second kind provide examples of Frobenius pairs of the second kind. We study Frobenius pairs of the second
SMARANDACHE FUNCTIONS OF THE SECOND KIND
"... The Smarandache functions of the second kind are defined in [1] thus: where S " are the Smarandache functions of the first kind (see [3]). We remark that the function SI has been defined in [4] by F. Smarandache because ..."
Abstract
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The Smarandache functions of the second kind are defined in [1] thus: where S " are the Smarandache functions of the first kind (see [3]). We remark that the function SI has been defined in [4] by F. Smarandache because
Second kinds Third kinds
"... To hold the mixed futures directly decide whether people can better profit in the futures trading of futures price, so it is more and more important to study the situation of futures price. In view of this situation, this article studies the degree of correlation and its classification of eight kind ..."
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kinds of material which take the date provided by the Shanghai futures exchange for promise, it true and reliable response to these eight kinds of material change, and for the investors to continue futures operations provided a basis. Firstly, according to various materials of different contracts
Stirling Numbers of the Second Kind and
, 2008
"... A Stirling number of the second kind is a combinatorial function which yields interesting number theoretic properties with regard to primality. The Stirling number of the second kind, S(n; k) = 1 k! kP i=0 (1)i k i (k i)n, counts the number of partitions of an n-element set into k non-empty subset ..."
Abstract
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A Stirling number of the second kind is a combinatorial function which yields interesting number theoretic properties with regard to primality. The Stirling number of the second kind, S(n; k) = 1 k! kP i=0 (1)i k i (k i)n, counts the number of partitions of an n-element set into k non
WITH A SINGULARITY OF THE SECOND KIND
, 1981
"... C.*j Approved for public release LLJ Distribution unlimited Sponsored by ..."
THE BETA APPROXIMATING OPERATORS OF SECOND KIND
, 2004
"... We shall define a general linear transform from which we obtain as particular case the beta second kind transform: Tp,qf = 1 ..."
Abstract
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Cited by 1 (1 self)
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We shall define a general linear transform from which we obtain as particular case the beta second kind transform: Tp,qf = 1
On λ-Bernoulli Polynomials of the Second Kind
, 2015
"... Abstract In this paper, we study the λ-analogues of Bernoulli polynomials of the second kind, and we derive some new identities related to those polynomials. ..."
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Abstract In this paper, we study the λ-analogues of Bernoulli polynomials of the second kind, and we derive some new identities related to those polynomials.
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