On freely quasi-infinitely divisible distributions

Inspired by classical quasi-infinitely divisible distributions, this paper introduces freely quasi-infinitely divisible (FQID) distributions on $\mathbb{R}$. The FQID distributions are characterized by the free Levy-Khintchine-type representation with a signed Levy measure. Based on the representation form, we obtain various examples and distributional properties of FQID distributions. Moreover, interesting facts about FQID distributions that do not hold in the classical framework are observed--some FQID distributions admit a negative Gaussian part, and the total mass of the signed Levy measure for some FQID distributions may be negative.