infinite families
Browder's type strong convergence theorems for infinite families of nonexpansive mappings in Banach spaces
... We prove Browder’s type strong convergence theorems for infinite families of nonexpan- sive mappings. One of our main results is the following: let C be a bounded closed convex subset of a uniformly smooth ...
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New Formulas for the Mayer and Ree Hoover Weights of Infinite Families of Graphs
... graph c which arise from the hard-core continuum gas in one dimension. These weights are computed using signed volumes of convex polytopes natu- rally associated with the graph c. In the present work, we use the method ...
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Strong convergence theorems for infinite families of nonexpansive mappings in general Banach spaces
... It is a natural problem whether or not there exists an iteration to find a common fixed point for infinite families of commuting nonexpansive mappings without assuming the strict convexity of the Banach ...
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The split common fixed point problem for infinite families of demicontractive mappings
... In this paper, we propose a new algorithm for solving the split common fixed point problem for infinite families of demicontractive mappings. Strong convergence of the proposed method is established under suitable ...
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New Green’s function and two infinite families of positive solutions for a second order impulsive singular parametric equation
... Using the theorem and properties of the fixed point index in a Banach space and applying a new method to dispose of the impulsive term, we prove that there exists a solvable interval of positive parameter λ in which the ...
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Certain finite abelian groups with the Redei $k$-property
... three infinite families of finite abelian groups such that if G is a member of one of these families, then G has the R´ edei k-property for each k with 2k > ...The families of these finite ...
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Complete Arcs and Caps in Galois Spaces
... Proposition 4.1 ([80]). Any non-trivial coset S = K ⊕ P of K in G is an arc. The plane arcs of Proposition 4.1 were investigated in [3, 23, 26, 28, 43, 68, 77, 78]. For the dimension N > 2, infinite ...
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Gracefulness of Some Super Graphs of KC4 -Snake
... certain infinite families of graceful graphs from a given graceful graph while Rosa [7] and Golomb [5] have discussed gracefulness of complete bipartite graphs and Eulerian ...
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Constructing Infinite Families of Low Differential Uniformity $(n,m)$-Functions with $m>n/2$
... an infinite family of differentially ∆-uniform (2m−1, m)-functions with m ≥ 3 achieving Nyberg’s bound with equality, which also have high nonlinearity and not too low algebraic ...an infinite family of ...
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Anticirculant Structured block weighing matrices from Williamson matrices
... Abstract: Recent advances in optical quantum computing created an interest in Hankel block Weighing matrices. This paper forwards a par- tial answer to a open problem posed by Arasu and his coworkers by constructing some ...
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A study of the infinite dimensional linear and symplectic groups
... {e(Ü,R,^) : ^ < w) of normal subgroups of E(a,R,w). , Ihe results of chapter three show that when R is d-finite each normal subgroup H of GL(OpR) determines a unique ideal p of R such that H lies between E(^,p) and ...
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Design and Analysis of High Gain Differential Amplifier Using Various Topologies
... are infinite gain, infinite bandwidth and infinite common mode rejection ratio, high input impedance and low output admittance, less distortion, ...
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An Analysis of Zeno’s View Regarding Motion
... the same throughout all changes in matter.”6 Kant's Second Law of Mechanics is “Everybody persists in its state of rest or motion, in the same direction, and with the same speed, it is not compelled by an external cause ...
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Antichains of monomial ideals are finite
... an infinite collection of artinian monomial ideals (primary to the maximal ...an infinite number of artinian monomial ideals, which are noncomparable with respect to ...
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Density Estimation in Infinite Dimensional Exponential Families
... In the following, we consider two simple scenarios of estimating a multivariate nor- mal and mixture of normals using the proposed estimator and demonstrate the superior performance of the proposed estimator over KDE. ...
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The Infinite Tree
... of infinite models, in which the number of hidden categories is not fixed, but can grow with the amount of training ...the infinite tree, a new infi- nite model capable of representing recursive branching ...
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Apropos 1+2+3+4+5+ =: Mapping Infinity in Light of the Number Circle (or Cycle), in L Euler’s Footsteps and with the Aid of Two Dimensional Infinite Series, and Replacing Negative Infinity and Positive Infinity with Just Infinity
... The number circle—that is, the notion that the largest possible positive num- bers are followed by infinity and then by the smallest possible negative num- bers—is not new. L. Euler defended it in the eighteenth century ...
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An Infinite Light and Infinite Frequency in Cosmology and Neurosciences
... an infinite-light either at time immediately after the big bang or it was already existed prior to a big bang (as the first ...an infinite-light as a fabric for our physical universe (? unifying all ...
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Plug in Estimators for Conditional Expectations and Probabilities
... In the case that conditioning happens only with respect to finitely many events, elementary tools suffice to prove con- sistency of estimators and to derive rates of convergence. However, in practice, the number of ...
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Infinite Parametric Families of Irreducible Polynomials with a Prescribed Number of Complex Roots
... an infinite family of irreducible polynomials of degree n , with integer coefficients, that has exactly n − 2 k complex non-real roots if n is even and has exactly n − 2 k − 1 complex non-real roots if n is ...
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