A Note on Lipschitz Classes.
A note on matrix summability and rates on convergence
A note on spaces of entire functions represented by Dirichlet series.
A note on the convergence of transfinite sequences
A note on the effectiveness of tests for the absolute convergence and divergence of infinite series
A proof of an Aljančić hypothesis on -regularly varying sequences.
À propos d'un lemme de Tadeusz Ważewski
A Rademacher type formula for partitions and overpartitions.
A recent note on the absolute Riesz summability factors.
A remark on a generalization of monotonic sequences.
A remark on a theorem of A. B. Németh regarding the convergence of sequences of linear operators on space C[a,b]
A Remark On Generalisation Of Monotonic Sequences
A self-indexed sequence.
A sequence considered by I. J. Schoenberg?
A sequential iteration algorithm with non-monotoneous behaviour in the method of projections onto convex sets
The method of projections onto convex sets to find a point in the intersection of a finite number of closed convex sets in a Euclidean space, may lead to slow convergence of the constructed sequence when that sequence enters some narrow “corridor” between two or more convex sets. A way to leave such corridor consists in taking a big step at different moments during the iteration, because in that way the monotoneous behaviour that is responsible for the slow convergence may be interrupted. In this...
A series transformation formula and related polynomials.
A series whose sum range is an arbitrary finite set
In finite-dimensional spaces the sum range of a series has to be an affine subspace. It has long been known that this is not the case in infinite-dimensional Banach spaces. In particular in 1984 M. I. Kadets and K. Woźniakowski obtained an example of a series whose sum range consisted of two points, and asked whether it was possible to obtain more than two, but finitely many points. This paper answers this question affirmatively, by showing how to obtain an arbitrary finite set as the sum range...
A sharp double inequality for sums of powers.
A simple solution to Basel problem.
A simplified formula for calculation of metric dimension of converging sequences