Cohomological chi-dependence of ring structure for the moduli of one-dimensional sheaves on mathbb{P}²
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modulidifferentone-dimensionalsheavesalgebraicbetticharacteristicschoices
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We prove that the cohomology rings of the moduli space $M_{d,\chi}$ of one-dimensional sheaves on the projective plane are not isomorphic for general different choices of the Euler characteristics. This stands in contrast to the $\chi$-independence of the Betti numbers of these moduli spaces. As a corollary, we deduce that $M_{d,\chi}$ are topologically different unless they are related by obvious symmetries, strengthening a previous result of Woolf distinguishing them as algebraic varieties.
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