Adam Ward

Doctor of Philosophy, (Mathematics)
Study Completed: 2014
College of Sciences

Citation

Thesis Title
On Essential Self-adjointness,Confining Potentials & the Lp-Hardy Inequality

Read article at Massey Research Online: MRO icon

In layman’s terms, a Schrodinger (Sh–row-din–ger) operator is essentially self-adjoint  if a particle under the influence of the associated potential is unable to come into contact with the boundary of a domain. The problem of determining the minimal criteria under which a Schrodinger operator is essentially self-adjoint can be phrased in terms of a balancing act between the quantum tunnelling effect and the uncertainty principle, the latter effect being given precise embodiment by the L2-Hardy inequality. It appears that the necessary and sufficient conditions required for a domain to admit this inequality depend intimately on the dimension of the boundary.

Supervisors
Distinguished Professor Gaven Martin

Massey Contact Centre Mon - Fri 8:30am to 4:30pm 0800 MASSEY (+64 6 350 5701) TXT 5222 contact@massey.ac.nz Web chat Staff Alumni News Māori @ Massey