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Join congruence relations and closure relations
Algebra Universalis, 2003zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Bogart, Kenneth P., Montague, Laura H.
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CONGRUENCES RELATED TO MODULAR FORMS
International Journal of Number Theory, 2010Let f be a modular form of weight k for a congruence subgroup Γ ⊂ SL 2(Z), and t a weight 0 modular function for Γ. Assume that near t = 0, we can write f = ∑n≥0bn tn, bn ∈ Z. Let ℓ(z) be a weight k + 2 modular form with q-expansion ∑γnqn, such that the Mellin transform of ℓ can be expressed as an Euler product. Then we show that if [Formula: see text]
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Congruence relations on de Morgan algebras
Algebra Universalis, 1989A de Morgan algebra is an algebra (L;\(\vee,\wedge,\sim,0,1)\) of type (2,2,1,0,0) such that (L;\(\vee,\wedge,0,1)\) is a distributive (0,1)- lattice, \(\sim\) is a dual (0,1)-lattice endomorphism (so that \(\sim (a\vee b)=\sim a\wedge \sim b\), \(\sim (a\wedge b)=\sim a\vee \sim b\), \(\sim 0=1\), and \(\sim 1=0)\), and \(\sim \sim a=a)\).
Adams, M. E., Beazer, R.
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Congruences Related to the Wilson Quotient
2022See the abstract in the attached pdf.
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Congruence relations on some hyperstructures
Annals of Mathematics and Artificial Intelligence, 2009zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Cabrera, Inma P. +4 more
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Dynamical systems and congruence relations
International Journal of General Systems, 2018This study is an endeavour to construct the tensor products and the direct limits of dynamical systems through the utilization of the congruence relations and also to investigate the basic properti...
S. Ostadhadi-Dehkordi, M. Karimi Amaleh
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2018
In this chapter, we define and explore the most basic properties of the important relation of congruence modulo n > 1. Our central goal is to prove the famous Fermat’s little theorem, as well as its generalization, due to Euler. The pervasiveness of these two results in elementary Number Theory owes a great deal to the fact that they form the starting ...
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In this chapter, we define and explore the most basic properties of the important relation of congruence modulo n > 1. Our central goal is to prove the famous Fermat’s little theorem, as well as its generalization, due to Euler. The pervasiveness of these two results in elementary Number Theory owes a great deal to the fact that they form the starting ...
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CONGRUENCE RELATIONS ON MULTILATTICES
Computational Intelligence in Decision and Control, 2008P. Cordero +4 more
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