Noncommutative Geometry Seminar
Scalar Curvature for the Noncommutative 4-Torus and its Functional Relations
Farzad Fathizadeh,
Instructor,
Mathematics,
Caltech,
I explain how the scalar curvature of
the conformally perturbed noncommutative 4-torus can
be computed by making use of a noncommutative residue.
This method justifies the remarkable cancellations that
occurred when the curvature was computed previously in a
joint work with M. Khalkhali, using the rearrangement lemma.
Furthermore, it allows to recover the 2-variable function
in the formula as the sum of a finite difference and a
finite product of the 1-variable function. The
simplification of the curvature formula for the dilatons
associated with an arbitrary projection and an explicit
computation of the gradient of the analog of the
Einstein-Hilbert action will be outlined.
For more information, please contact Farzad Fathizadeh by email at [email protected] or visit http://www.math.caltech.edu/~ncg/.
Event Series
Noncommutative Geometry Seminar Series
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