Time-dependent Aharonov-Bohm type topological effects on dipoles

TL;DR

This paper investigates how time-dependent Aharonov-Bohm effects influence magnetic and electric dipoles in dynamic fields, revealing novel topological phenomena without approximations.

Contribution

It introduces a comprehensive analysis of time-dependent topological effects on dipoles, emphasizing the roles of phase identities and dualities in 2+1 dimensions.

Findings

Topological effects on magnetic dipoles in dynamic fields analyzed.

Electric dipoles around time-varying fields studied without approximations.

Discussion of phase identities and dualities in topological effects.

Abstract

Exploring the time-dependent characteristics of AB-type effects holds significant importance in contemporary physics and its practical applications. Here, we delve into the investigation of time-dependent topological effects emerging in AB-type experimental setups. We first analyze the topological effects on magnetic dipoles moving in closed trajectories around the time-varying magnetic field source solenoid, then on electrical dipoles around a time-varying electric field source in 2+1 dimensions without any approximation. Last, we discuss the characteristics of the topological effects by considering the identity and dualities between phases from an integrated perspective.