Smectic pores and defect cores - Concepedia

Concepedia

Publication | Open Access

Smectic pores and defect cores

DOI Full Paper Access

15

Citations

17

References

2012

Year

Elisabetta A. Matsumoto, Randall D. Kamien, Christian D. Santangelo

Interface Focus

Materials SciencePore StructureGlobal GeometryEngineeringGeometric Partial Differential EquationPhysicsGeometryRiemannian GeometryApplied PhysicsMinimal SurfacesPorosityHanded HelicoidsNonlinear SumGlobal AnalysisComplex GeometryPorous BodyMicrostructureSmectic Pores

Abstract

Riemann's minimal surfaces, a one-parameter family of minimal surfaces, describe a bicontinuous lamellar system with pores connecting alternating layers. We demonstrate explicitly that Riemann's minimal surfaces are composed of a nonlinear sum of two oppositely handed helicoids.

References

	Year	Citations

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