Irreducibility of the Koopman representations for the group GL0(2∞, R) acting on three infinite rows
Abstract
Consider the inductive limit of the general linear groups GL0(2∞, R) = n GL(2n-1, R), acting on the space Xm of m rows, infinite in both directions, with Gaussian measure. This measure is the infinite tensor product of one-dimensional arbitrary Gaussian non-centered measures. In this article we prove an irreducibility criterion for m=3. In 2019, the first author [28] established a criterion for m 2. Our proof is in the same spirit, but the details are far more involved.
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