Certain Observations on Ideals Associated With Weighted Density Using Modulus Functions

Abstract

In this article our main object of investigation is the simple modular density ideals Zg(f) introduced in [Bose et al., Indag. math., 2018] where g is a weight function, more precisely, g∈ G, G=\g:ω [0,∞):kg(k) 0 and \:\: g(k) ∞ as \:\:k ∞ \ and f is an unbounded modulus function. We mainly investigate certain properties of these ideals in line of [Kwela et al, J. math. Anal. Appl., 2019]. For an unbounded modulus function f it is shown that there are 1 or many functions g∈ G generating the same ideal Zg(f). We then obtain certain interactive results involving the sequence of submeasures \φk\k∈ ω generating the ideal Zg(f) and the functions g,f. Finally, we present some observations on Zg(f) ideals related to the notion of increasing-invariance.