In the beginning of the chapter on LSZ reduction, in Srednicki's book, he says that the operator $a_1 ^{\dagger}:=\int d^3k\: \text{exp}\Big[-(\textbf{k}-\textbf{k}_{1})^2/4 \sigma^2\Big] a^{\dagger}(\textbf{k})$ creates a particle that has a three momentum that is localised near $\textbf{k}_1$ and in position space it is localised around the origin. I get the momentum part, I can use the momentum operator given by $\textbf{P}=\int \frac{d^3k}{2 \omega} \textbf{k}\:a^{\dagger}a$ and show that $\textbf{P}a_1 ^{\dagger}$ acting on the vacuum state is equal to $\int d^3k\: \textbf{k}\: \text{exp}\Big[-(\textbf{k}-\textbf{k}_{1})^2/4 \sigma^2\Big] a^{\dagger}(\textbf{k})$ acting on the vacuum state. But I am having trouble understanding how $a_1 ^{\dagger}|0>$ represents a particle localised about the origin in position space. I would think that one can define the creation and annihilation operators in position space in terms of Fourier transforms $a(\textbf{x})=\int d^3k\: \text{exp}[i \textbf{p.x}] a^{\dagger}(\textbf{k})$ and then maybe we define a position operator $\textbf{X}$ and then use it to check the statement or is there some easier way of seeing it and is the above method flawed? Another lead maybe from the expression of the negative energy frequency part of $\phi(x)$ where the $x$ dependence is of the form $e^{-ik.x}$
2 Answers
The answer is really a computation. It doesn't make sense to talk about the position of a state; there's no operator $X^\mu$ to probe it. At best you can insert local operators and see what happens. In this case, the simplest thing you can look at is the one-point function $$ f(x) = \langle 0 | \phi(t=0,x) a_1^\dagger | 0 \rangle. $$ Here $f(x)$ is a completely explicit function that you can compute. I'm too lazy to do it, but by rotation invariance the function $f$ can only depend on the dimensionless variables $k_1 \cdot x$ and $\sigma^2|x|^2$. If you carefully do the computation, you'll most likely find that $$ f(x) \; \sim \; e^{i k_1 \cdot x - \sigma^2 |x|^2}. $$ So $a_1^\dagger$ creates a one-particle state, and by probing with $\phi$ you conclude that it's unlikely to find the particle outside of $|x| \gtrsim 1/\sigma$.
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The Fourier transform of a Gaussian is another Gaussian, so $a_1^{\dagger}$ can also be written as an integral of the position creation operator $a^{\dagger}(x)$ with a Gaussian. Thus it is localized in position in exactly the same way you would interpret it being localized in momentum.
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