Abstract: Magnetic monopoles—and their electrically charged generalization, dyons—are rich field-theoretic objects with important implications for particle phenomenology, particularly in axion dynamics. In this talk, I explore a novel connection between dyon loops and instantons. I construct Abelian gauge field configurations in Euclidean space that carry non-zero instanton number, corresponding to Dirac monopoles endowed with electric charge propagating along closed loops. To provide a UV completion of these configurations, I embed them in the SU(2) Georgi–Glashow model using Julia–Zee dyons, and show that the resulting dyon loops can be interpreted as deformations of standard (Higgsed) BPST instantons. Upon projecting out the non-Abelian W-boson degrees of freedom, I show that the instanton number effectively resides in the remaining Abelian sector. I conclude by outlining potential applications and directions for future work.