Exact solutions for Schrodinger and Gross-Pitaevskii equations and their experimental applications.

Bhalgamiya, Bhavika

12 May 2023

A prescription is given to obtain some exact results for certain external potentials �� (r) of the time-independent Gross-Pitaevskii and Schrodinger equations. The study motivation is the ability to program �� (r) experimentally in cold atom Bose-Einstein condensates. Rather than derive wavefunctions that are solutions for a given �� (r), we ask which �� (r) will have a given pdf (probability density function) �� (r). Several examples in 1 dimension (1D), 2 dimensions (2D), and 3 dimensions (3D) are presented for well-known pdfs in the position space. Exact potentials with zero, one and two walls are obtained and explained in detail. Apart from position space, the method is also applicable to obtain exact solutions for the Time-independent Schr¨odinger equation (TISE) and Gross-Pitaevskii equation (GPeq) for pdfs in momentum space. For this, we derived the potentials which are generated from the pdfs of the hydrogen atom in the real space as well as in the momentum space. However, the method was also extended for the time-dependent case. The prescription is also applicable to solve time-dependent pdfs. The aim is to find the ��(r, ��) which generates the pdf ��(r, ��). As a special case, we tested our method by studying the well known case for the Gaussian wave packet in 1D with zero potential ��(��, ��) = 0.

Bose-Einstein Condensate

Time-independent Schr¨odinger equation

Time-dependent Schr¨odinger equation

potentials

probability density function (pdf)

Gross-Pitaevskii equation

Structure of hypernuclei studied with the integrodifferential equations approach

Nkuna, John Solly

06 1900

A two-dimensional integrodi erential equation resulting from the use of potential harmonics expansion in the many-body Schr odinger equation is used to study ground-state properties of selected few-body nuclear systems. The equation takes into account twobody correlations in the system and is applicable to few- and many-body systems. The formulation of the equation involves the use of the Jacobi coordinates to de ne relevant global coordinates as well as the elimination of center-of-mass dependence. The form of the equation does not depend on the size of the system. Therefore, only the interaction potential is required as input. Di erent nucleon-nucleon potentials and hyperon-nucleon potentials are employed to construct the Hamiltonian of the systems. The results obtained are in good agreement with those obtained using other methods. / Physics

Integrodi erential equation

Hypernuclei

Schr odinger equation

Adiabatic approximation

Potential harmonics

Hyperspherical harmonics

Few-Body systems

515.38

Schrodinger equation

Few-body problem

Nuclear physics

Structure of hypernuclei studied with the integrodifferential equations approach

Nkuna, John Solly

06 1900

A two-dimensional integrodi erential equation resulting from the use of potential harmonics expansion in the many-body Schr odinger equation is used to study ground-state properties of selected few-body nuclear systems. The equation takes into account twobody correlations in the system and is applicable to few- and many-body systems. The formulation of the equation involves the use of the Jacobi coordinates to de ne relevant global coordinates as well as the elimination of center-of-mass dependence. The form of the equation does not depend on the size of the system. Therefore, only the interaction potential is required as input. Di erent nucleon-nucleon potentials and hyperon-nucleon potentials are employed to construct the Hamiltonian of the systems. The results obtained are in good agreement with those obtained using other methods. / Physics / M.Sc. (Physics)

Integrodi erential equation

Hypernuclei

Schr odinger equation

Adiabatic approximation

Potential harmonics

Hyperspherical harmonics

Few-Body systems

515.38

Schrodinger equation

Few-body problem

Nuclear physics

Sobre uma classe de equações elípticas envolvendo crescimento exponencial em ℝ2

Guimarães, Wanderson Rodrigo

16 May 2013

Made available in DSpace on 2015-05-15T11:46:22Z (GMT). No. of bitstreams: 1 arquivototal.pdf: 1317724 bytes, checksum: 6a915301a18806d377bf5c949922b304 (MD5) Previous issue date: 2013-05-16 / Coordenação de Aperfeiçoamento de Pessoal de Nível Superior / In this work, we will study the existence and multiplicity of weak solutions for a class of nonhomogeneous elliptic problems involving exponential growth Trudinger-Moser type in R2. For this, we will use the Ekeland s Variational Principle and the Mountain Pass Theorem without the Palais-Smale condition in combination with a version of the Trudinger-Moser inequality. / Teorema do Passo da Montanha, Principio variacional de Ekeland, equação de Schrodinger, Desigualdade de Trudinger-Moser, Crescimento Exponencial.

Teorema do Passo da Montanha

Princípio Variacional de Ekeland

Equação de Schrodinger

Desigualdade de Trudinger-Moser

Crescimento Exponencial

Mountain Pass Theorem

Ekeland Variational Principle

Schr¨odinger s Equation

Trudinger-Moser inequality

Exponential Growth