Elliptic Functions and non Existence of Complete Minimal Surfaces of Certain Type

Using Jacobian elliptic functions we construct a one-parameter family of regular complete minimal surfaces of genus one with total curvature – 16π and having four embedded planar ends. The explicit formulas obtained reveal that two ends are asymptotic to one and the same plane.

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Minimal Surfaces of Codimension One

10.1016/s0304-0208(08)x7038-0 ◽

1984 ◽

Keyword(s):

Minimal Surfaces ◽

Codimension One

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THE EXISTENCE OF SURFACE PATCHES FOR PERIODIC MINIMAL SURFACES

Le Journal de Physique Colloques ◽

10.1051/jphyscol:1990727 ◽

1990 ◽

Vol 51 (C7) ◽

pp. C7-265-C7-271 ◽

Cited By ~ 1

Author(s):

J. C.C. NITSCHE

Keyword(s):

Minimal Surfaces ◽

Surface Patches

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Complete Minimal Surfaces of Finite Total Curvature. Mathematics and its applications. Vol. 294.

Zeitschrift für Kristallographie - Crystalline Materials ◽

10.1524/zkri.1995.210.12.976a ◽

1995 ◽

Vol 210 (12) ◽

Author(s):

W. Fischer

Keyword(s):

Minimal Surfaces ◽

Total Curvature ◽

Finite Total Curvature

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Extended F-Expansion Method for Solving the modified Korteweg-de Vries (mKdV) Equation

Al-Jabar Jurnal Pendidikan Matematika ◽

10.24042/ajpm.v11i1.5153 ◽

2020 ◽

Vol 11 (1) ◽

pp. 93-100

Author(s):

Vina Apriliani ◽

Ikhsan Maulidi ◽

Budi Azhari

Keyword(s):

Wave Equation ◽

Exact Solutions ◽

Internal Waves ◽

Water Waves ◽

Wave Equations ◽

Elliptic Functions ◽

Expansion Method ◽

Mkdv Equation ◽

Innovative Methods ◽

De Vries

One of the phenomenon in marine science that is often encountered is the phenomenon of water waves. Waves that occur below the surface of seawater are called internal waves. One of the mathematical models that can represent solitary internal waves is the modified Korteweg-de Vries (mKdV) equation. Many methods can be used to construct the solution of the mKdV wave equation, one of which is the extended F-expansion method. The purpose of this study is to determine the solution of the mKdV wave equation using the extended F-expansion method. The result of solving the mKdV wave equation is the exact solutions. The exact solutions of the mKdV wave equation are expressed in the Jacobi elliptic functions, trigonometric functions, and hyperbolic functions. From this research, it is expected to be able to add insight and knowledge about the implementation of the innovative methods for solving wave equations.

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On different notions of calibrations for minimal partitions and minimal networks in ℝ2

Advances in Calculus of Variations ◽

10.1515/acv-2019-0005 ◽

2019 ◽

Vol 0 (0) ◽

Author(s):

Marcello Carioni ◽

Alessandra Pluda

Keyword(s):

Minimal Surfaces ◽

Steiner Problem ◽

Minimal Networks

Abstract Calibrations are a possible tool to validate the minimality of a certain candidate. They have been introduced in the context of minimal surfaces and adapted to the case of the Steiner problem in several variants. Our goal is to compare the different notions of calibrations for the Steiner problem and for planar minimal partitions that are already present in the literature. The paper is then complemented with remarks on the convexification of the problem, on nonexistence of calibrations and on calibrations in families.

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Robust H∞ Loop Shaping Controller Synthesis for SISO Systems by Complex Modular Functions

Mathematical and Computational Applications ◽

10.3390/mca26010021 ◽

2021 ◽

Vol 26 (1) ◽

pp. 21

Author(s):

Ahmad Taher Azar ◽

Fernando E. Serrano ◽

Nashwa Ahmad Kamal

Keyword(s):

Design Methodology ◽

Closed Loop ◽

Complex Analysis ◽

Controller Design ◽

Filter Design ◽

Design Procedure ◽

Elliptic Functions ◽

Loop System ◽

Closed Loop System ◽

Loop Shaping

In this paper, a loop shaping controller design methodology for single input and a single output (SISO) system is proposed. The theoretical background for this approach is based on complex elliptic functions which allow a flexible design of a SISO controller considering that elliptic functions have a double periodicity. The gain and phase margins of the closed-loop system can be selected appropriately with this new loop shaping design procedure. The loop shaping design methodology consists of implementing suitable filters to obtain a desired frequency response of the closed-loop system by selecting appropriate poles and zeros by the Abel theorem that are fundamental in the theory of the elliptic functions. The elliptic function properties are implemented to facilitate the loop shaping controller design along with their fundamental background and contributions from the complex analysis that are very useful in the automatic control field. Finally, apart from the filter design, a PID controller loop shaping synthesis is proposed implementing a similar design procedure as the first part of this study.

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