Uma Krishna Swamy Pillai

We don’t have enough information about this author to calculate their statistics. If you think this is an error let us know.
Learn More
The aim of this paper is to introduce procedural steps for extension of the 1D<lb>homodyne phase correction for k-space truncation in all gradient encoding<lb>directions. Compared to the existing method applied to 2D partial k-space,<lb>signal losses introduced by the phase correction filter is observed to be<lb>minimal for the extended approach. In(More)
Signal space models in both phase-encode, and frequencyencode directions are presented for extrapolation of 2D partial kspace. Using the boxcar representation of low-resolution spatial data, and a geometrical representation of signal space vectors in both positive and negative phase-encode directions, a robust predictor is constructed using a series of(More)
  • 1