# Search Results

## Abstract

*α*and it is expressed in terms of the matrix coefficients determining the linear summation method. The author also proves the analogue of the well-known theorem by S. M. Nikol'skii on the necessary and sufficient condition for the summability of trigonometric Fourier series.

*f∈L*(0,2π),

*f*

_{ k }— коэффициенты Ф урье функции

*f*. Получе ны условия на ϕ, при котор ых существует такая функция

*f*∈L(0, 2π), чт о последовательност ь {σ

_{ ϕ, n }(

*f, x*)} расходится для почти всех

*x*∈(0,2π).

## Summary

The problem of convergence of linear means is considered for the Laguerre-Fourier series of continuous functions. An upper estimate is obtained for the Laguerre-Lebesgue function in terms of the entries of the matrix which determines the linear summability method in question. This allows us to prove for such series an analogue of the well-known theorem by S. M. Nikol'skii which provides necessary and sufficient conditions for the summability of trigonometric Fourier series. A theorem on the regularity of the summability methods is also established.

## Abstract

Let (*X*
_{
k
}) be a sequence of independent r.v.’s such that for some measurable functions *gk* : **R**
^{
k
} → **R** a weak limit theorem of the form

*G*. By a general result of Berkes and Csáki (“universal ASCLT”), under mild technical conditions the strong analogue

*d*

_{ k }) is a logarithmic weight sequence and

*D*

_{ N }= ∑

_{ k=1}

^{ N }

*d*

_{ k }. In this paper we extend the last result for a very large class of weight sequences (

*d*

_{ k }), leading to considerably sharper results. We show that logarithmic weights, used traditionally in a.s. central limit theory, are far from optimal and the theory remains valid with averaging procedures much closer to, in some cases even identical with, ordinary averages.

Generalizing results of Schatte [11] and Atlagh and Weber [2], in this paper we give conditions for a sequence of random variables to satisfy the almost sure central limit theorem along a given sequence of integers.

Three DTA peaks (two endo and one exothermic) were replotted in the form of ∑ peak area.*Δa*, or ∑ peak magnitude,*ΔT*, as a function of temperature. The integral sigmoid curves were plotted in the form of log*g(α) vs.* 1/*T* or log log*g(α)/T*
^{2}
*vs.* 1/*T*. Both of the proposed summation methods gave satisfactory straight lines (*F*
_{1} function), characterized by the same activation energies, correlation coefficients and standard deviations. Integration of the peak areas by Simpson's rule resulted in the same values as obtained by the summation procedure. Analysis by the suggested integral method resulted in activation energies that show a logarithmic divergence relative to the magnitude of*E*
_{
a
} estimated directly from the DTA peaks.

## Abstract

The aim of this paper is to continue our investigations started in [15], where we studied the summability of weighted Lagrange
interpolation on the roots of orthogonal polynomials with respect to a weight function *w*. Starting from the Lagrange interpolation polynomials we constructed a wide class of discrete processes which are uniformly
convergent in a suitable Banach space (*C*
_{ρ}, ‖‖_{ρ}) of continuous functions (ρ denotes (another) weight). In [15] we formulated several conditions with respect to *w*, ρ, (*C*
_{ρ}, ‖‖_{ρ}) and to summation methods for which the uniform convergence holds. The goal of this part is to study the special case when
*w* and ρ are Freud-type weights. We shall show that the conditions of results of [15] hold in this case. The order of convergence
will also be considered.

## Abstract

A computer program has been worked out for the following requirements: (1) The program is to render a listing of the elements detected, together with their respective concentrations, not just an evaluation of the gamma-spectrum (peak energies and areas). (2) There should be no necessity to intermediate decisions, i.e. execution of the program should be possible by auxiliary personnel. (3) Gamma-ray spectra recorded under widely different conditions should be amenable to evaluation. This implies a large range of variation of the number of channels per peak. (4) In order to have the most extensive capability of executing multi-element analyses instrumentally, it must be possible to evaluate complex spectra with many superpositions. The program involves the fitting of Gaussians. It is shown that this evaluation method gives more precise peak area determinations than the summation method and also yields reasonable results in the case of strong superposition.

The aim of our study is to determine the design ground acceleration values at the whole territory of Debrecen and to accomplish the seismic risk map of Debrecen using synthetic seismograms. Synthetic seismograms are computed by the so called ``hybrid technique" along 11 different profiles crossing the city. The hybrid technique consists of the modal summation method, followed by finite difference modelling. 11 independent computations have been performed using the same seismic source but different profiles. The seismic source has been located in the so called “Mobile Zone”, which is a seismically active fault system in Érmellék region. The focal mechanism and the homogeneous and heterogeneous parts of the profiles are known from geophysical and geological data of the investigated area. As the results of the computations PGA grid maps of Debrecen for the 3 different components and the spectral acceleration (response spectra, SA) charts of the synthetic seismograms for the transversal components came into existence. The seismic risk map of the city has been completed from the SA charts created from the synthetic seismograms and from the grid map of the buildings in Debrecen with different number of floors by applying GIS tools.