@article{1453, abstract = {In this Letter we exhibit a one-parameter family of new Taub-NUT instantons parameterized by a half-line. The endpoint of the half-line will be the reducible Yang-Mills instanton corresponding to the Eguchi-Hanson-Gibbons L2 harmonic 2-form, while at an inner point we recover the Pope-Yuille instanton constructed as a projection of the Levi-Civitá connection onto the positive su(2)+ ⊂ so(4) subalgebra. Our method imitates the Jackiw-Nohl-Rebbi construction originally designed for flat R4. That is we find a one-parameter family of harmonic functions on the Taub-NUT space with a point singularity, rescale the metric and project the obtained Levi-Civitá connection onto the other negative su(2)- ⊂ so(4) part. Our solutions will possess the full U(2) symmetry, and thus provide more solutions to the recently proposed U(2) symmetric ansatz of Kim and Yoon.}, author = {Etesi, Gábor and Hausel, Tamas}, issn = {0370-2693}, journal = {Physics Letters, Section B: Nuclear, Elementary Particle and High-Energy Physics}, number = {1-2}, pages = {189 -- 199}, publisher = {Elsevier}, title = {{Geometric construction of new Yang-Mills instantons over Taub-NUT space}}, doi = {10.1016/S0370-2693(01)00821-8}, volume = {514}, year = {2001}, }