On the essential decreasing of the summation order in the Abel-Lidskii sense

TL;DR

This paper investigates reducing the summation order in the Abel-Lidskii sense, demonstrating it can be decreased to any positive number from above the convergence exponent, and develops a qualitative theory with fundamental propositions.

Contribution

It establishes that the summation order can be arbitrarily decreased in the Abel-Lidskii sense, extending previous results and providing a new qualitative theoretical framework.

Findings

Summation order can be decreased to any positive number above the convergence exponent.

Develops a qualitative theory of summation in the Abel-Lidskii sense.

Provides fundamental propositions of interest in the theory.

Abstract

In this paper, we consider a problem of decreasing the summation order in the Abel-Lidskii sense. The problem has a significant prehistory since 1962 created by such mathematicians as Lidskii V.B., Katsnelson V.E., Matsaev V.I., Agranovich M.S. As a main result, we will show that the summation order can be decreased from the values more than a convergence exponent, in accordance with the Lidskii V.B. result, to an arbitrary small positive number. Additionally, we construct a qualitative theory of summation in the Abel-Lidkii sense and produce a number of fundamental propositions representing the interest themselves.