Jörg Neunhäuserer
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Registered User
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For information have a look at my homepage.
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May 12 |
answered | Modern Mathematical Achievements Accessible to Undergraduates |
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May 10 |
awarded | ● Critic |
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May 9 |
awarded | ● Yearling |
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May 8 |
comment |
Is it difficult to prove that nature is chaotic? Dear Anthony, i understand what You mean. But sometimes I wonder if it is necessary to use the machinery of (non-uniform) hyperbolic dynamics to prove that a systems is chaotic. If you directly construct an appropriate dynamical partition, you may prove that a system is chaotic without showing hyperbolicity (or?). In fact beside toy models I do not know a strategy to find such a partition, but may be there is a (black magic) way. |
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May 8 |
comment |
Is it difficult to prove that nature is chaotic? Dear Gerry, of course You are right. Please apologize the provoking title. |
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May 7 |
asked | Is it difficult to prove that nature is chaotic? |
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May 7 |
answered | How do we recognize a Markov partition? |
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Apr 19 |
accepted | Schur-Cohn Stability Test. |
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Apr 15 |
answered | Schur-Cohn Stability Test. |
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Mar 20 |
answered | Applications of discrete-time dynamics |
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Mar 20 |
answered | Open problems in PDEs, dynamical systems, mathematical physics |
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Mar 10 |
answered | Applied examples of (non)uniformly hyperbolic and/or ergodic systems |
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Feb 16 |
comment |
Linear numeration systems Many thanks for the reference. Best 9i |
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Feb 15 |
asked | Linear numeration systems |
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Feb 8 |
awarded | ● Popular Question |
