The calculation of the probability density of a strictly stable law at large X

Abstract

The article is devoted to the problem of calculating the probability density of a strictly stable law at x∞. To solve this problem, it was proposed to use the expansion of the probability density in a power series. A representation of the probability density in the form of a power series and an estimate for the remainder term was obtained. This power series is convergent in the case 0<α<1 and asymptotic at x∞ in the case 1<α<2. The case α=1 was considered separately. It was shown that in the case α=1 the obtained power series was convergent for any |x|>1 at N∞. It was also shown that in this case it was convergent to the density of g(x,1,θ). An estimate of the threshold coordinate xN, was obtained which determines the range of applicability of the resulting expansion of the probability density in a power series. It was shown that in the domain |x|≥slant xN this power series could be used to calculate the probability density.