Research Output per year

## Fingerprint Dive into the research topics where Kota Hattori is active. These topic labels come from the works of this person. Together they form a unique fingerprint.

- 3 Similar Profiles

Volume Growth
Mathematics

Flat Manifold
Mathematics

Symplectic Structure
Mathematics

Tangent Cone
Mathematics

Mean Curvature Flow
Mathematics

Hilbert Scheme
Mathematics

Calabi-Yau
Mathematics

Self-similar Solutions
Mathematics

## Research Output 2009 2017

## On the Taub-NUT type hyper-Kähler metrics on the Hilbert schemes of n points on C^{2}

Hattori, K., 2017 Aug 1, In : Differential Geometry and its Application. 53, p. 76-96 21 p.Research output: Contribution to journal › Article

Hilbert Scheme

Metric

Quotient

Lie groups

Complexification

## The nonuniqueness of the tangent cones at infinity of Ricci-flat manifolds

Hattori, K., 2017 Aug 15, In : Geometry and Topology. 21, 5, p. 2683-2723 41 p.Research output: Contribution to journal › Article

Volume Growth

Flat Manifold

Tangent Cone

Nonuniqueness

Infinity

## Self-similar solutions to the mean curvature flows on Riemannian cone manifolds and special Lagrangians on Toric Calabi-Yau cones

Futaki, A., Hattori, K. & Yamamoto, H., 2014 Oct 1, In : Osaka Journal of Mathematics. 51, 4, p. 1053-1079 27 p.Research output: Contribution to journal › Article

Mean Curvature Flow

Calabi-Yau

Self-similar Solutions

Cone

Einstein Manifold

## The geometry on Hyper-Kähler manifolds of type A<inf>∞</inf>

Hattori, K., 2014,*Springer Proceedings in Mathematics and Statistics.*Springer New York LLC, Vol. 106. p. 309-317 9 p.

Research output: Chapter in Book/Report/Conference proceeding › Conference contribution

Flat Manifold

Symplectic Structure

Asymptotic Behavior

Review

2
Citations
(Scopus)

## The holomorphic symplectic structures on hyper-Kähler manifolds of type A∞

Hattori, K., 2014 Oct 1, In : Advances in Geometry. 14, 4, p. 613-630 18 p.Research output: Contribution to journal › Article

Symplectic Structure

Volume Growth

Flat Manifold

Complex Manifolds

Equivariant