The distribution of singular points of the sum of a series of exponential monomials on the boundary of its domain of convergence

Abstract: The problem of the distribution of the singular points of the sum of a series of exponential monomials on the boundary of the domain of convergence of the series is considered. Sufficient conditions are found for a singular point to exist on a prescribed arc on the boundary; these are stated in purely geometric terms. The singular point exists due to simple relations between the maximum density of the exponents of the series in an angle and the length of the arc on the boundary of the domain of convergence t… Show more

“…Let r > 0 and p(r) be the maximal number of disk B p (1) having a non-empty intersection with B(0, r). Then r |λ k(p) |(1 − δ) and by 7, (9) we obtain:…”

“…First of all, we study the influence of some characteristics of Λ on the presence of singular points for g Λ,a on R-arcs. We assume (see [9], [11])…”

Singular Points for the Sum of a Series of Exponential Monomials

“…Let r > 0 and p(r) be the maximal number of disk B p (1) having a non-empty intersection with B(0, r). Then r |λ k(p) |(1 − δ) and by 7, (9) we obtain:…”

“…First of all, we study the influence of some characteristics of Λ on the presence of singular points for g Λ,a on R-arcs. We assume (see [9], [11])…”

Singular Points for the Sum of a Series of Exponential Monomials

Domain of Existence of the Sum of a Series of Exponential Monomials

An Existence Domain of the Sum of Exponential Monomials Series