Hypernuclear bound states with two /\-Particles

Grobler, Jonathan

11 1900

The double hypernuclear systems are studied within the context of the hyperspherical approach. Possible bound states of these systems are sought as zeros of the corresponding three-body Jost function in the complex energy plane. Hypercentral potentials for the system are constructed from known potentials in order to determine bound states of the system. Calculated binding energies for double- hypernuclei having A = 4 − 20, are presented. / Physics / M.Sc. (Physics)

Jost function

Bound state

Hypernucleus

Hyperspherical harmonics

Complex rotation

Hypercentral potential

Bound states (Quantum mechanics)

Three-body problem

Nuclear physics

Mathematical physics

539.70151535

Hypernuclear bound states with two /\-Particles

Grobler, Jonathan

11 1900

The double hypernuclear systems are studied within the context of the hyperspherical approach. Possible bound states of these systems are sought as zeros of the corresponding three-body Jost function in the complex energy plane. Hypercentral potentials for the system are constructed from known potentials in order to determine bound states of the system. Calculated binding energies for double- hypernuclei having A = 4 − 20, are presented. / Physics / M.Sc. (Physics)

Jost function

Bound state

Hypernucleus

Hyperspherical harmonics

Complex rotation

Hypercentral potential

Bound states (Quantum mechanics)

Three-body problem

Nuclear physics

Mathematical physics

539.70151535

Bound states for A-body nuclear systems

Mukeru, Bahati

03 1900

In this work we calculate the binding energies and root-mean-square radii for A−body nuclear bound state systems, where A ≥ 3. To study three−body systems, we employ the three−dimensional differential Faddeev equations with nucleon-nucleon semi-realistic potentials. The equations are solved numerically. For this purpose, the equations are transformed into an eigenvalue equation via the orthogonal collocation procedure using triquintic Hermite splines. The resulting eigenvalue equation is solved using the Restarted Arnoldi Algorithm. Ground state binding energies of the 3H nucleus are determined. For A > 3, the Potential Harmonic Expansion Method is employed. Using this method, the Schr¨odinger equation is transformed into coupled Faddeev-like equations. The Faddeevlike amplitudes are expanded on the potential harmonic basis. To transform the resulting coupled differential equations into an eigenvalue equation, we employ again the orthogonal collocation procedure followed by the Gauss-Jacobi quadrature. The corresponding eigenvalue equation is solved using the Renormalized Numerov Method to obtain ground state binding energies and root-mean-square radii of closed shell nuclei 4He, 8Be, 12C, 16O and 40Ca. / Physics / M. Sc. (Physics)

Potential Harmonic basis

Coupled differential equations

Orthogonal collocation procedure

Eigenvalue equation

Restarted Arnoldi Algorithm

Renormalized Numerov Method

Closed shell nuclei

539.70151535

Bound states (Quantum mechanics)

Three-body problem

Nuclear physics

Mathematical physics

Differential equations

Bound states for A-body nuclear systems

Mukeru, Bahati

03 1900

In this work we calculate the binding energies and root-mean-square radii for A−body nuclear bound state systems, where A ≥ 3. To study three−body systems, we employ the three−dimensional differential Faddeev equations with nucleon-nucleon semi-realistic potentials. The equations are solved numerically. For this purpose, the equations are transformed into an eigenvalue equation via the orthogonal collocation procedure using triquintic Hermite splines. The resulting eigenvalue equation is solved using the Restarted Arnoldi Algorithm. Ground state binding energies of the 3H nucleus are determined. For A > 3, the Potential Harmonic Expansion Method is employed. Using this method, the Schr¨odinger equation is transformed into coupled Faddeev-like equations. The Faddeevlike amplitudes are expanded on the potential harmonic basis. To transform the resulting coupled differential equations into an eigenvalue equation, we employ again the orthogonal collocation procedure followed by the Gauss-Jacobi quadrature. The corresponding eigenvalue equation is solved using the Renormalized Numerov Method to obtain ground state binding energies and root-mean-square radii of closed shell nuclei 4He, 8Be, 12C, 16O and 40Ca. / Physics / M. Sc. (Physics)

Potential Harmonic basis

Coupled differential equations

Orthogonal collocation procedure

Eigenvalue equation

Restarted Arnoldi Algorithm

Renormalized Numerov Method

Closed shell nuclei

539.70151535

Bound states (Quantum mechanics)

Three-body problem

Nuclear physics

Mathematical physics

Differential equations