Two dimensional Meixner random vectors of class {mathcal M}_L

The paper is divided into two parts. In the first part we lay down the foundation for defining the joint annihilation-preservation-creation decomposition of a finite family of, not necessarily commutative random variables, and show that this decomposition is essentially unique. In the second part we show that any two, not necessarily commutative, random variables $X$ and $Y$, for which the vector space spanned by their annihilation, preservation, and creation operators equipped with the bracket given by the commutator, forms a Lie algebra, are equivalent, up to an invertible linear transformation to two independent Meixner random variables with mixed preservation operators. In particular if $X$ and $Y$ commute, then they are equivalent, up to an invertible linear transformation to two independent classic Meixner random variables. To show this we start with a small technical condition called "non-degeneracy".