Akifumi Sako
Published 2002-09-17, updated 2002-12-29Version 3
We show that the integral of the first Pontrjagin class is given by an integer and it is identified with instanton number of the U(n) gauge theory on noncommutative ${\bf R^4}$. Here the dimension of the vector space $V$ that appear in the ADHM construction is called Instanton number. The calculation is done in operator formalism and the first Pontrjagin class is defined by converge series. The origin of the instanton number is investigated closely, too.
Comments: 6 color figures, 27 pages, some comments and references are added,typos fixed
Journal: JHEP 0304 (2003) 023
On Perturbative Gravity and Gauge Theory
Mass Generation in Continuum SU(2) Gauge Theory in Covariant Abelian Gauges
Gauge Theories, D-Branes and Holography
