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We prove that SO (3) modular functors in genus 0 have geometric origin and support integral variations of Hodge structures for any odd level r and r-th root of unity ᵣ. We identify the TQFT intersection forms and integral structures with the geometric ones. Moreover, the gluing property of the modular functors is recovered geometrically as a K\"unneth formula. The construction is based on the homological models of Felder-Wieczerkowski and Martel.
Pierre Godfard (Mon,) studied this question.