In differential geometry and in particular YangâÂÂMills theory, Uhlenbeck's singularity theorem is a result allowing the removal of a singularity of a four-dimensional YangâÂÂMills field with finite energy using gauge. It states as a consequence that YangâÂÂMills fields with finite energy on flat euclidean space arise from YangâÂÂMills fields on the curved sphere, its one-point compactification. The theorem is named after Karen Uhlenbeck, who first described it in 1982. In 2019, Uhlenbeck became the first woman to be awarded the Abel Prize, in part for her contributions to partial differential equations and gauge theory. Uhlenbeck's singularity theorem was generalized to higher dimensions by Terence Tao and Gang Tian in 2002.
For the closed disk and a vector bundle with structure group , a YangâÂÂMills connection with finite energy:
the vector bundle extends to a smooth vector bundle and the YangâÂÂMills connection extends to a smooth YangâÂÂMills connection .