A General Version of the Nullstellensatz for Arbitrary Fields
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nullstellensatzversionarbitraryfieldsgeneralalgebraicallybelongingbezout
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We prove a general version of Bezout's form of the Nullstellensatz for arbitrary fields. The corresponding sufficient and necessary condition only involves the local existence of multi-valued roots for each of the polynomials belonging to the ideal in consideration. Finally, this version implies the standard Nullstellensatz when the coefficient field is algebraically closed.
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