The name of the operator $ EXP[\frac{ \theta }{2}\frac{\partial^2}{\partial \overrightarrow{v}^2}]$ is one-parameter semigroup.
For example one writes $ EXP[\frac{ \theta }{2}\frac{\partial^2}{\partial \overrightarrow{v}^2}]f$, where $f$ is a function of $\overrightarrow{v}$.
What is the meaning of this operator?
Does $ EXP[\frac{ \theta }{2}\frac{\partial^2}{\partial \overrightarrow{v}^2}]f$ mean $EXP[\frac{ \theta }{2}\frac{\partial^2 f}{\partial \overrightarrow{v}^2}]$ ?
This is a symbol which reminds that the solution of linear system of ODEs is represented as an exponential function of a matrix. This symbol represents the solution family of the heat equation, and indeed called a one-parameter semigroup (or semi-dynamical system).
Great introduction in the subject are the books of Engel and Nagel, the original one and a short version.
So $ EXP[t\frac{\partial^2}{\partial \overrightarrow{v}^2}]f$ is the solution of the partial differential equation.
$$\partial_t u(\overrightarrow{v},t)= \frac{\partial^2}{\partial \overrightarrow{v}^2}u(\overrightarrow{v},t)$$ with initial condition $$u(\overrightarrow{v},0) = f(\overrightarrow{v})$$ and appropriate boundary conditions depending on the domain and the problem at hand.
