- #1
quantatanu0
- 2
- 0
I was trying to learn renormalization in the context of ChPT using momentum-space cut-off regularization procedure at one-loop order using order of p^2 Lagrangian. So,
1. There are counter terms in ChPT of order of p^4 when calculating in one-loop order using Lagrangian of order p^2.
2. Divergences are of polynomial kind and logarithmic kind.
3. The counter terms always take care of polynomial divergences (and 1/\epsilon kind of div. in dimensional method)
4. The logarythmic divergence gets absorbed during coupling constant renormalization.During my calculation using cut-off method I obtained a result where I have only logarithmic divergence and no other divergent term, then I need to understand what is the use of counter-terms in this case.
In any case, we have to consider the counter-terms in ChPT but here we are not doing dimensional regularization so no 1/\epsilon to get killed by the counter terms, and in my calculation involving cut-off regularization, I have no polynomial divergence either ! Only logarithmic divergence, then what is the use of the counter-terms here ?
1. There are counter terms in ChPT of order of p^4 when calculating in one-loop order using Lagrangian of order p^2.
2. Divergences are of polynomial kind and logarithmic kind.
3. The counter terms always take care of polynomial divergences (and 1/\epsilon kind of div. in dimensional method)
4. The logarythmic divergence gets absorbed during coupling constant renormalization.During my calculation using cut-off method I obtained a result where I have only logarithmic divergence and no other divergent term, then I need to understand what is the use of counter-terms in this case.
In any case, we have to consider the counter-terms in ChPT but here we are not doing dimensional regularization so no 1/\epsilon to get killed by the counter terms, and in my calculation involving cut-off regularization, I have no polynomial divergence either ! Only logarithmic divergence, then what is the use of the counter-terms here ?
