David Berenstein, Richard Corrado
Published 1998-03-05Version 1
We study the properties of wrapped membranes in matrix theory on ALE spaces. We show that the only BPS bound states of wrapped membranes that can form are roots of the $A$-$D$-$E$ group. We determine a bound on the energy of a bound state and find the correct dependence on the blow-up parameters and longitudinal momentum expected from M-Theory. For the $A_{n-1}$ series, we construct explicit classical solutions for the wrapped membrane bound states. These states have a very rich structure and have a natural interpretation in terms of noncommutative geometry. In the $A_1$ case, we examine the spectrum of excitations around the wrapped membrane solution and provide an explicit calculation of their energies. The results agree exactly with supergravity calculations.
Comments: 23 pages LaTeX2e, 1 figure, using utarticle.cls (included), array.sty, amsmath.sty, amsfonts.sty, cite.sty, epsfig. Bibtex style: utphys.bst (.bbl file included)
Journal: Nucl.Phys. B529 (1998) 225-245
D-branes and Matrix Theory in Curved Space
Formulation of Matrix Theory at Finite Temperature
Explicit Construction of Yang-Mills Instantons on ALE Spaces
