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Local BPS Invariants: Enumerative Aspects and Wall-Crossing
- Choi, Jinwon;
- van Garrel, Michel;
- Katz, Sheldon;
- Takahashi, Nobuyoshi
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We study the BPS invariants for local del Pezzo surfaces, which can be obtained as the signed Euler characteristic of the moduli spaces of stable one-dimensional sheaves on the surface S. We calculate the Poincare polynomials of the moduli spaces for the curve classes beta having arithmetic genus at most 2. We formulate a conjecture that these Poincare polynomials are divisible by the Poincare polynomials of ((-K-S).beta - 1)-dimensional projective space. This conjecture motivates the upcoming work on log BPS numbers [8].
- 제목
- Local BPS Invariants: Enumerative Aspects and Wall-Crossing
- 저자
- Choi, Jinwon; van Garrel, Michel; Katz, Sheldon; Takahashi, Nobuyoshi
- 발행일
- 2020-09
- 권
- 2020
- 호
- 17
- 페이지
- 5450 ~ 5475