Ergodic Theory of G - Spaces
نویسنده
چکیده
Let D be a uniform discrete subgroup of a simply connected, connected nilpotent Lie group (i.e. N D N D ... DN D N = e,N = [N,N*] andN/Dis compact). There is a unique normalised "Haar" measure m on N/D which is preserved by left translations. Let A ; N -> N, AD C D be an automorphism and let a E N. Then T(xD) = aAxD is called an affine transformation of the nilmanifold N/D. If etEN is a one-parameter group then Tt(xD) = etxD is called a nilflow. The latter flows were studied by Auslander, Green and Hahn [1]. I shall be speaking about affines and nilflows but mainly the former. Obviously affines and nilflows preserve m. N/D can be viewed as a manifold resulting from a finite number of Gf extensions starting from the trivial one-point space where Gf are torii : N/D^N/N.D -+N/N-\D-+. . .-^NjN.D -+N/N , G, = N'D/N**^.
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تاریخ انتشار 2010