Probability distribution solutions of a general linear equation of infinite order, II
Tom 99 / 2010
Annales Polonici Mathematici 99 (2010), 215-224
MSC: Primary 60E05, 39B12; Secondary 39B22.
DOI: 10.4064/ap99-3-1
Streszczenie
Let $(\Omega, {\cal A},P)$ be a probability space and let $\tau\colon\mathbb R\times\Omega\to\mathbb R$ be a mapping strictly increasing and continuous with respect to the first variable, and ${\cal A}$-measurable with respect to the second variable. We discuss the problem of existence of probability distribution solutions of the general linear equation $$ F(x)=\int\limits_\Omega F (\tau (x,\omega )) \, P(d\omega ). $$ We extend our uniqueness-type theorems obtained in Ann. Polon. Math. 95 (2009), 103–114.
