Consider an infinite-dimensional linear space equipped with a Gaussian
measure and the group GL(∞) of linear transformations that send the
measure to equivalent one. Limit points of GL(∞) can be regarded as
'spreading' maps (polymorphisms). We show that the closure of GL(∞) in
the semigroup of polymorphisms contains a certain semigroup of operator
colligations and write explicit formulas for action of operator colligations by
polymorphisms of the space with Gaussian measure.Comment: 21p