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The class \(T_{M,\G}\) satisfies a matroidal Hirzebruch--Riemann--Roch package. More precisely, its Hirzebruch class \[ \operatorname{ch}(\lambda_y T_{M,\G}^{\vee})\operatorname{td}(T_{M,\G}) \] specializes to the Todd class and computes the Chow polynomial of \((M,\G)\). In the realizable case, these identities agree with the usual tangent-bundle computations on the corresponding wonderful model.
As an application, we prove Chern-number inequalities for \(T_{M,\G}\), including a Miyaoka--Yau type inequality with respect to the hyperplane class.
From: Ronnie Cheng [view email]
[v1]
Sun, 21 Jun 2026 19:50:44 UTC (30 KB)
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