Toshihiro Shoda scite author profile

In the previous work, the first author established an algorithm to compute the Morse index and the nullity of an n-periodic minimal surface in R n . In fact, the Morse index can be translated into the number of negative eigenvalues of a real symmetric matrix and the nullity can be translated into the number of zero-eigenvalue of a Hermitian matrix. The two key matrices consist of periods of the abelian differentials of the second kind on a minimal surface, and the signature of the Hermitian matrix gives a new invariant of a minimal surface. On the other hand, H family, rPD family, tP family, tD family, and tCLP family of triply periodic minimal surfaces in R 3 have been studied in physics, chemistry, and crystallography. In this paper, we first determine the two key matrices for the five families explicitly. As its applications, by numerical arguments, we compute the Morse indices, nullities, and signatures for the five families.

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On bifurcation and local rigidity of triply periodic minimal surfaces in $\mathbb R^3$

Koiso¹,

Piccione²,

Shoda³

2014

Preprint

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Metrics on a closed surface of genus two which maximize the first eigenvalue of the Laplacian

Nayatani

Shoda

2017

Preprint

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New Components of the Moduli Space of Minimal Surfaces in 4-Dimensional Flat Tori

Shoda¹

2004

J. London Math. Soc.

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Toshihiro Shoda

Metrics on a closed surface of genus two which maximize the first eigenvalue of the Laplacian

The Morse index of a triply periodic minimal surface

On bifurcation and local rigidity of triply periodic minimal surfaces in $\mathbb R^3$

Metrics on a closed surface of genus two which maximize the first eigenvalue of the Laplacian

New Components of the Moduli Space of Minimal Surfaces in 4-Dimensional Flat Tori

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