English

Constructing Mironov cycles in complex Grassmannians

Symplectic Geometry 2020-05-06 v1 Algebraic Geometry

Abstract

A. Mironov proposed a construction of lagrangian submanifolds in Cn\mathbb{C}^n and CPn\mathbb{C} \mathbb{P}^n; there he was mostly motivated by the fact that these lagrangian submanifolds (which can have in general self intersections, therefore below we call them lagrangian cycles) present new example of minimal or Hamiltonian minimal lagrangian submanifolds. However the Mironov construction of lagrangian cycles itself can be directly extended to much wider class of compact algrebraic varieties: namely it works in the case when algebraic variety XX of complex dimension nn admits TkT^k - action and an anti - holomorphic involution such that the real part XRXX_{\mathbb{R}} \subset X has real dimension nn and is transversal to the torus action. For this case one has families of lagrangian submanifolds and cycles. In the present small text we show how the construction of Mironov cycles works for the complex Grassmannians, resulting in simple examples of smooth lagrangian submanifolds in Gr(k,n+1){\rm Gr}(k, n+1), equipped with a standard Kahler form under the Pl\"{u}cker embedding. For sure the text is not complete but in the new reality we would like to fix it, hoping to continue the investigations and to present in a future complete list of Mironov cycles in Gr(k,n+1){\rm Gr}(k, n+1).

Keywords

Cite

@article{arxiv.2005.02002,
  title  = {Constructing Mironov cycles in complex Grassmannians},
  author = {Nikolai A. Tyurin},
  journal= {arXiv preprint arXiv:2005.02002},
  year   = {2020}
}

Comments

5 pages

R2 v1 2026-06-23T15:18:54.346Z