On a projective (integral) variety $X$, is there a well defined notion of the intersection of a Weil divisor and a curve? I know that there is a definition of the intersection of a Cartier divisor and a curve (or dimension 1 cycle), and when $X$ has local rings that are UFDs (e.g. X is smooth) then a Weil divisors and Cartier divisors are in bijective correspondence so in that case the answer to my question is yes. But I can't remember if this is possible in general. A reference would be appreciated.
2026-03-26 12:13:33.1774527213
can one intersect a weil divisor and curve
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