About: Alexander–Hirschowitz theorem

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The Alexander–Hirschowitz theorem shows that a specific collection of k double points in the P^r will impose independent types of conditions on homogenous polynomials and the hypersurface of d with many known lists of exceptions. In which case, the classic polynomial interpolation that is located in several variables can be generalized to points that have larger multiplicities.

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  • The Alexander–Hirschowitz theorem shows that a specific collection of k double points in the P^r will impose independent types of conditions on homogenous polynomials and the hypersurface of d with many known lists of exceptions. In which case, the classic polynomial interpolation that is located in several variables can be generalized to points that have larger multiplicities. (en)
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  • The Alexander–Hirschowitz theorem shows that a specific collection of k double points in the P^r will impose independent types of conditions on homogenous polynomials and the hypersurface of d with many known lists of exceptions. In which case, the classic polynomial interpolation that is located in several variables can be generalized to points that have larger multiplicities. (en)
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  • Alexander–Hirschowitz theorem (en)
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