π§Vector Field Analysis in Cylindrical Coordinates
A vector field with zero curl can still have a non-zero circulation integral if the integration path encloses a singularity, which is a point where the field is undefined. This demonstrates a crucial exception to Stokes' Theorem, which assumes the absence of such singularities within the surface of integration.
π¬the vector field having a curl of zero everywhere except at the origin
A vector field can have a non-zero circulation integral around a closed loop, even if its curl is zero everywhere along the path of the loop. This happens when the loop encloses a singularityβa point where the vector field is undefined. In this specific example, the field's divergence and curl are both zero everywhere except at the origin, which is the singularity. The non-zero circulation integral is a direct consequence of the path enclosing this singularity. This concept is a fundamental part of the generalized Stokes' Theorem in vector calculus.
ποΈMathematical Proof
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