Abstract

The main aim of this paper is to consider various notions of (dense) $$m_{n}$$ -distributional chaos of type s and (dense) reiterative $$m_{n}$$ -distributional chaos of type s for general sequences of linear not necessarily continuous operators in Frechet spaces. Here, $$(m_{n})$$ is an increasing sequence in $$[1,\infty )$$ satisfying $$\liminf _{n\rightarrow \infty }\frac{m_{n}}{n}>0$$ and s could be $$0,1,2,2+,2\frac{1}{2},3,1+,2-,2_{Bd},2_{Bd}+$$ . We investigate $$m_{n}$$ -distributionally chaotic properties and reiteratively $$m_{n}$$ -distributionally chaotic properties of some special classes of operators like weighted forward shift operators and weighted backward shift operators in Frechet sequence spaces, considering also continuous analogues of introduced notions and some applications to abstract partial differential equations.

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