Toric Hyperkahler多様体の複素構造 (多変数関数論の萌芽的研究)

We construct some examples of special Lagrangian subman- ifolds and Lagrangian self-similar solutions in almost Calabi–Yau cones over toric Sasaki manifolds.. Toric Sasaki

One is that we can construct a special Legendrian submanifold in every toric Sasaki–Einstein manifold which is not necessarily the sphere S 2n+1.. The other is that some of

Real elastic waves (earthquakes) propagate through many layers which do not necessarily lie in good order. Therefore, more general study, we extend the elastic wave equations

In this last section we construct non-trivial families of both -normal and non- -normal configurations. Recall that any configuration A is always -normal with respect to all

Tschinkel, Height zeta functions of toric bundles over flag varieties, Selecta Math. Tate, Fourier analysis in number fields, and Hecke’s zeta-functions, 1967 Algebraic Number

From Hyperk¨ ahler Manifold to Hyperbolic Geometry In this section, we recall some important theorems which make a clear bridge between groups of birational autmorphisms of a

It is an elementary result of the toric geometry of a toric ASD Einstein space M that there is a toric Fano orbifold surface X δ ∗ associated to it.. The Sasaki–Einstein space M is

Definition 28 (Toric family problem on toric surfaces) Given a complex embedded toric surface X find the minimal toric degree v(X) and the set of optimal toric families