Results 261 to 270 of about 154,160 (293)
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On rough convergence of ρ-Cauchy sequence of triple sequences
Analysis (Germany), 2019AbstractIn this paper we define and study rough convergence of triple sequences and the set of rough limit points of a triple sequence. We also investigate the relations between the set of cluster points and the set of rough limit points of Cauchy sequences of triple sequence spaces.
Ayhan Esi, N Subramanian
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Almost Convergence of Complex Uncertain Triple Sequences
Proceedings of the National Academy of Sciences India Section A - Physical Sciences, 2020zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Birojit Das +2 more
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Results in Mathematics, 2016 In (Çanak and Totur, Georgian Math J 23(1):33–42, 2016), Çanak and Totur have extended some classical Tauberian theorems for single sequences to triple sequences.
Zerrin Önder, Umit Totur, I Canak
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Some classical Tauberian theorems for (C,1,1,1) summable triple sequences
Georgian Mathematical Journal, 2016 Let (umns) be a (C,1,1,1) summable triple sequence of real numbers. We give one-sided Tauberian conditions of Landau and Hardy type under which (umns) converges in Pringsheim's sense.
Umit Totur
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The intersection spectrum of Skolem sequences and its applications to λ-fold cyclic triple systems
Discrete Mathematics, 2012 A Skolem sequence of order n is a sequence Sn=(s1,s2,…,s2n) of 2n integers containing each of the integers 1,2,…,n exactly twice, such that two occurrences of the integer j∈{1,2,…,n} are separated by exactly j−1 integers.
Nabil Shalaby
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The Adams Spectral Sequence and the Triple Transfer
American Journal of Mathematics, 1995The main theorem of this paper shows a list of candidates of the permanent cycles of the third line \(\text{Ext}^{3,*}_{\mathcal A} (\mathbb{Z}/2,\mathbb{Z}/2)\) of the Adams spectral sequence for computing \(\pi_* (S^0)\) at the prime 2 which factor through the triple transfer \(BV_{3+} \to S^0\). Here \(V_3 = (\mathbb{Z}/2)^3\).
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Enumeration of inversion sequences avoiding triples of relations
Discrete Applied Mathematics, 2019zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Wenqin Cao, Emma Yu Jin, Zhicong Lin
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Patterns of relation triples in inversion and ascent sequences
Theoretical Computer Science, 2020zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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Pythagorean Triples from Harmonic Sequences
The Mathematics Teacher, 2001Pythagorean triples have intrigued generations of mathematics explorers, including students, since ancient times. One of their most charming features is their connection with various other areas of mathematics. In the Mathematics Teacher, for example, authors have shown that Pythagorean triples can be generated from the Fibonacci numbers (Bertucci 1991)
Angelo S. DiDomenico, Randy J. Tanner
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Sequence-Dependent Stability of Intramolecular DNA Triple Helices
Journal of Biomolecular Structure and Dynamics, 2000A set of 21 oligodeoxynucleotides were designed to fold into intramolecular triple helices of the pyrimidine motif under appropriate conditions. UV melting experiments on the triplexes which only differ in the number and distribution of third strand cytosines reveal the influence of sequence and pH on triplex stability and can be summarized as follows:
D, Leitner, K, Weisz
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