The set of differential -forms on a manifold (example ) is a vector space and when then is the set of smooth functions. Thus smooth functions are 0-forms. Now -forms are integrated on -manifolds. For example, a 1-form can be integrated on a curve . Also differential forms can be differentiated using the operator d called the exterior operator where acts on a -form to produce a -form and that .
Now
1. if , then is a 1-form so that . Thus is the gradient operator .
2. If we have a 1-form , then which is a two form. In this case we have is the operator.
3. If we have 2-form then again get a 3-form . If we think of as a function , then again we get is the divergence operator .