About: Kaplan–Yorke conjecture

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In applied mathematics, the Kaplan–Yorke conjecture concerns the dimension of an attractor, using Lyapunov exponents. By arranging the Lyapunov exponents in order from largest to smallest , let j be the largest index for which and Then the conjecture is that the dimension of the attractor is This idea is used for the definition of the Lyapunov dimension.

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  • In applied mathematics, the Kaplan–Yorke conjecture concerns the dimension of an attractor, using Lyapunov exponents. By arranging the Lyapunov exponents in order from largest to smallest , let j be the largest index for which and Then the conjecture is that the dimension of the attractor is This idea is used for the definition of the Lyapunov dimension. (en)
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  • In applied mathematics, the Kaplan–Yorke conjecture concerns the dimension of an attractor, using Lyapunov exponents. By arranging the Lyapunov exponents in order from largest to smallest , let j be the largest index for which and Then the conjecture is that the dimension of the attractor is This idea is used for the definition of the Lyapunov dimension. (en)
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  • Kaplan–Yorke conjecture (en)
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