Completely Random Measures and L\'evy Bases in Free probability

This paper develops a theory for completely random measures in the framework of free probability. A general existence result for free completely random measures is established, and in analogy to the classical work of Kingman it is proved that such random measures can be decomposed into the sum of a purely atomic part and a (freely) infinitely divisible part. The latter part (termed a free L\'evy basis) is studied in detail in terms of the free L\'evy-Khintchine representation and a theory parallel to the classical work of Rajput and Rosinski is developed. Finally a L\'evy-It\^o type decomposition for general free L\'evy bases is established.