Your search keyword '"RADIUS (Geometry)"' showing total 3 results

1. New asymptotic lower bound for the radius of analyticity of solutions to nonlinear Schrödinger equation.

Author

Getachew, Tegegne and Belayneh, Birilew

Subjects

*NONLINEAR Schrodinger equation, *MAXIMAL functions, *DIFFERENTIAL equations, *CONSERVATION laws (Mathematics), *CONSERVATION laws (Physics), *RADIUS (Geometry)

Abstract

In this paper, we show that the radius of analyticity σ (t) of solutions to the one-dimensional nonlinear Schrödinger (NLS) equation i ∂ t u + ∂ x 2 u = | u | p − 1 u is bounded from below by c | t | − 2 3 when p > 3 and by c | t | − 4 5 when p = 3 as | t | → + ∞ , given initial data that is analytic with fixed radius. This improves results obtained by Tesfahun [On the radius of spatial analyticity for cubic nonlinear Schrödinger equations, J. Differential Equations 263(11) (2017) 7496–7512] for p = 3 and Ahn et al. [On the radius of spatial analyticity for defocusing nonlinear Schrödinger equations, Discrete Contin. Dyn. Syst. 40(1) (2020) 423–439] for any odd integers p > 3 , where they obtained a decay rate σ (t) ≥ c | t | − 1 for larger t. The proof of our main theorems is based on a modified Gevrey space introduced in [T. T. Dufera, S. Mebrate and A. Tesfahun, On the persistence of spatial analyticity for the beam equation, J. Math. Anal. Appl. 509(2) (2022) 126001], the local smoothing effect, maximal function estimate of the Schrödinger propagator, a method of almost conservation law, Schrödinger admissibility and one-dimensional Sobolev embedding. [ABSTRACT FROM AUTHOR]

Published

2024

2. Free Axisymmetric Vibrations of Functionally Graded Material Annular Plates via DTM.

Author

Sharma, Sumit Kumar and Ahlawat, Neha

Subjects

*FREE vibration, *TAYLOR'S series, *MODE shapes, *YOUNG'S modulus, *RADIUS (Geometry), *DIFFERENTIAL equations

Abstract

In this paper, a semi-analytical technique based on Taylor's series method namely DTM has been used to solve the differential equation which governs the motion of three types of annular FGM plates. The differential equation has been obtained using Hamilton principle and classical plate theory. The mechanical properties of the plate (Young's modulus and density) are considered to be graded in thickness direction and vary following the power-law. The behaviour of volume fraction index and radii ratio has been investigated onto first three modes of frequency parameter for all three plates. Moreover, the novelty of this paper is the application of the versatile technique DTM to study the effect of radii ratio and volume fraction index on three different types of annular FGM plates. A comparison has been made between the obtained numerical results and the results are available in the literature. A good agreement of the results verifies the accuracy of the present technique. Three-dimensional mode shapes for all three plates are also presented. [ABSTRACT FROM AUTHOR]

Published

2024

3. Radius problems for ratios of analytic functions involving sigmoid domain.

Author

Kaur, Gurpreet and Nagpal, Sumit

Subjects

UNIVALENT functions, STAR-like functions, EXPONENTIAL functions, RADIUS (Geometry)

Abstract

The univalent function ϕ SG (z) : = 2 / (1 + e − z) maps the open unit disk | z | < 1 onto a sigmoid domain | log (w / (2 − w)) | < 1. The sharp radii constants have been computed for the classes involving ratios f / g and g / (z p) of analytic functions f , g and p defined in | z | < 1 such that p is subordinate to ϕ SG , the other two ratios are subordinate to 1 + z , e z or z + 1 + z 2 and the quantity z f ′ / f lies in a certain region of the right half plane. [ABSTRACT FROM AUTHOR]

Published

2024