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Paper detail

How to Integrate a Polynomial over a Simplex

This paper settles the computational complexity of the problem of integrating a polynomial function f over a rational simplex. We prove that the problem is NP-hard for arbitrary polynomials via a generalization of a theorem of Motzkin and Straus. On the other hand, if the polynomial depends only on a fixed number of variables, while its degree and the dimension of the simplex are allowed to vary, we prove that integration can be done in polynomial time. As a consequence, for polynomials of fixed total degree, there is a polynomial time algorithm as well. We conclude the article with extensions to other polytopes, discussion of other available methods and experimental results.

preprint2009arXivOpen access
Velleda BaldoniNicole BerlineJesus De LoeraMatthias KöppeMichèle Vergne
math.MGComputational ComplexitySymbolic Computation
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Velleda BaldoniNicole BerlineJesus De LoeraMatthias KöppeMichèle Vergne

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