Integrated vertex operators
It is interesting to follow what happens when we deform 
.
In string theory, such deformations correspond to integrated vertex operators.
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| | | | | | |
| | | | | ← local operator of conformal dimension  |
|
| | |
In order for this new
to satisfy the Master Equation to the first order in
we require:
Such deformations correspond to deforming the target space. A natural question is:
It turns out that we also
have to deform 
. For every
we have to find such
that:
| | | | | | |
| | | | | | |
| deformation of  |
| deformation of  |
| | | | |
Moreover, the quadratic function
defined by the equation
also
deforms:
Remember that the construction of equivariant form
requires solving the equation:
| | | | | | | |
| | | | linear in  |
| quadratic in |
| | |
And the string measure deforms:
In the base form
we substitute for
the curvature of the connection — the 2-form.
Therefore:
when we turn on the vertex operator, we should also deform the 2-form part of the measure
If the theory has ghost number, then
has ghost number zero and
has ghost number
.
, what happens to our subspace
