Add to ORKGThe aim of this Note is to study the probability density with characteristic function ρα,θ,v(t) = 1/(1 + e-iθsgnt|t|α)v, where 0 < α < 2, |θ| ≤ min(πα/2, π - πα/2), and v > 0. This density, first introduced by Linnik for θ = 0, v = 1, received several applications later. It does not have any explicit representation. We consider here its integral and series representations and its analytical properties
AbstractA random vector is said to have a 1-symmetric distribution if its characteristic function is...
In this article, the primary aim is to introduce a new flexible family of circular distributions, na...
Christoph and Schreiber (1998a) studied the discrete analogue of positive Linnik distribution and ob...
The function φθα(t) =1/1 + e-iθsgnt|t|α, α ε (0, 2), θ ε (-π, π], is a characteristic function of a ...
Linnik distribution with the characteristic function φα(t) = 1/(1 + |t|α), 0 < α < 2, is shown...
Cataloged from PDF version of article.This paper studies the properties of the probability density f...
The analytic and asymptotic properties of the probability density p(alpha) (x) introduced in 1953 by...
Cataloged from PDF version of article.Linnik distribution with the characteristic function ~o,(tl =...
AbstractIn 1953, Linnik introduced the probability density pα(x) defined by means of its characteris...
AbstractIn 1953, Linnik introduced the probability density pα(x) defined in terms of its characteris...
AbstractIn this paper we consider the probability density function (pdf) of a non-central χ2 distrib...
AbstractWe prove that Linnik distributions are geometrically infinitely divisible, and clarify a cha...
In this article we obtain the characteristic functions (c.f's) for L-1-spherical distributions ...
In this article we obtain the characteristic functions (c.f.'s) for 1-spherical distributions and si...
AbstractLet X1, X2,…, be independent, identically distributed random variables. Suppose that the lin...
AbstractA random vector is said to have a 1-symmetric distribution if its characteristic function is...
In this article, the primary aim is to introduce a new flexible family of circular distributions, na...
Christoph and Schreiber (1998a) studied the discrete analogue of positive Linnik distribution and ob...
The function φθα(t) =1/1 + e-iθsgnt|t|α, α ε (0, 2), θ ε (-π, π], is a characteristic function of a ...
Linnik distribution with the characteristic function φα(t) = 1/(1 + |t|α), 0 < α < 2, is shown...
Cataloged from PDF version of article.This paper studies the properties of the probability density f...
The analytic and asymptotic properties of the probability density p(alpha) (x) introduced in 1953 by...
Cataloged from PDF version of article.Linnik distribution with the characteristic function ~o,(tl =...
AbstractIn 1953, Linnik introduced the probability density pα(x) defined by means of its characteris...
AbstractIn 1953, Linnik introduced the probability density pα(x) defined in terms of its characteris...
AbstractIn this paper we consider the probability density function (pdf) of a non-central χ2 distrib...
AbstractWe prove that Linnik distributions are geometrically infinitely divisible, and clarify a cha...
In this article we obtain the characteristic functions (c.f's) for L-1-spherical distributions ...
In this article we obtain the characteristic functions (c.f.'s) for 1-spherical distributions and si...
AbstractLet X1, X2,…, be independent, identically distributed random variables. Suppose that the lin...
AbstractA random vector is said to have a 1-symmetric distribution if its characteristic function is...
In this article, the primary aim is to introduce a new flexible family of circular distributions, na...
Christoph and Schreiber (1998a) studied the discrete analogue of positive Linnik distribution and ob...