Bias Mimicking: A Simple Sampling Approach for Bias Mitigation
Maan Qraitem, Kate Saenko, et al.
CVPR 2023
The configuration of the critical points of a smooth function of two variables is studied under the assumption that the function is Morse, that is, that all of its critical points are nondegenerate. A critical point configuration graph (CPCG) is derived from the critical points, ridge lines, and course lines of the function. Then a result from the theory of critical points of Morse functions is applied to obtain several constraints on the number and type of critical points that appear on cycles of a CPCG. These constraints yield a catalog of equivalent CPCG cycles containing four entries. The slope districts induced by a critical point configuration graph appear useful for describing the behavior of smooth functions of two variables, such as surfaces, images, and the radius function of three-dimensional symmetric axes. © 1984 IEEE
Maan Qraitem, Kate Saenko, et al.
CVPR 2023
Hiroshi Kanayama, Tetsuya Nasukawa
Natural Language Engineering
Paula Harder, Venkatesh Ramesh, et al.
EGU 2023
L. Joskowicz, Elisha Sacks
aaai 1994