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One-parameter group of transformations |
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| Aug29-12, 09:15 AM | #1 |
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One-parameter group of transformations
I'm trying to understand what a one-parameter group of transformations really is. At one lecture I was told that they are trivial lie groups. In Arnold's "Ordinary Differential Equations" they are defined as an action by the group of real numbers; a collection of transformations parametrised by the real parameter t (time), and as being the mathematical equivalent of a two-sided deterministic process. I can more or less understand all this, but still feel some confusion. For example, is there such a thing as a two-parameter group of transformations? n-parameter?
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| Aug30-12, 04:09 PM | #2 |
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Yes, there are multiparameter Lie groups of transformations. But they are more complex in their structure; in particular, they are isomorphic with systems of PDEs, not of ODEs as the one-parameter groups are.
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