Criteria of irreducibility of the Koopman representations for the group GL0(2∞, R)

Abstract

Our aim is to find the irreducibility criteria for the Koopman representation, when the group acts on some space with a measure (Conjecture 1.5). Some general necessary conditions of the irreducibility of this representation are established. In the particular case of the group GL0(2∞, R) = n GL(2n-1, R), the inductive limit of the general linear groups we prove that these conditions are also the necessary ones. The corresponding measure is infinite tensor products of one-dimensional arbitrary Gaussian non-centered measures. The corresponding G-space Xm is a subspace of the space Mat(2∞, R) of infinite in both directions real matrices. In fact, Xm is a collection of m infinite in both directions rows. This result was announced in [20]. We give the proof only for m≤ 2. The general case will be studied later.