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 Bundle equations for bases > 2 tommy1729 Ultimate Fellow Posts: 1,605 Threads: 363 Joined: Feb 2009 04/18/2015, 12:24 PM Currently im considering bases > 2. I just write exp ignoring the base in notation. A bundle is a partition of a subset of the complex plane by continu functions that can be ordered. Consider the bundle ; Exp^[y](x) for real x and 0 < y < 1 d/dx exp^[y](x) > 0 d^2/d^2x exp^[y](x) > 0 Exp^[y](x) is real-analytic in x. This bundle is not Unique by those conditions. The question is , is it Unique by adding ; Exp^[1/2](- oo ) = c d/dx exp^[y](1-x) = 1 for 0 < x < 1/2. ?? Existance and uniqueness questions as usual. Regards Tommy1729 « Next Oldest | Next Newest »

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