Gnatenko K. One- and many-particle problems in noncommutative space

Українська версія

Thesis for the degree of Candidate of Sciences (CSc)

State registration number

0416U004557

Applicant for

Specialization

  • 01.04.02 - Теоретична фізика

20-10-2016

Specialized Academic Board

Д 35.051.09

Ivan Franko National University of Lviv

Essay

In the thesis one- and many-particle systems are studied. The noncommutative algebra which is equivalent to noncommutative algebra of canonical type and is rotationally-invariant was built. The hydrogen atom was studied in the noncommutative space with recovered rotational symmetry. A problem of particles motion in uniform field was solved exactly in rotationally-invariant noncommutative space. The conditions for the recovering of the equivalence principle in rotationally-invariant noncommutative space were proposed.

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