Wlowercase{eyl} lowercase {bound for p-power twist of} GL(2) L-lowercase{functions }
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Let $f$ be a cuspidal eigenform (holomorphic or Maass) on the full modular group $SL(2, \mathbb{Z})$ . Let $\chi$ be a primitive character of modulus $P$. We shall prove the following results: 1. Suppose $P = p^r$, where $p$ is a prime and $r\equiv 0 (\textrm{mod} \ 3)$. Then we have \[ L\left( f \otimes \chi, \frac{1}{2}\right) \ll_{f, \epsilon} P^{1/3 +\epsilon}, \] where $\epsilon > 0$ is any positive real number. 2. Suppose $\chi$ factorizes as $\chi= \chi_1 \chi_2$, where $ \chi_i$'s are primitive character modulo $P_i$, where $P_i$ are primes, $P^{1/2 -\epsilon} \ll P_i \ll P^{1/2 + \epsilon}$ for $i=1,2$ and $P=P_1 P_2$. We have the Burgess bound \[ L\left( f \otimes \chi, \frac{1}{2}\right) \ll_{f, \epsilon} P^{3/8 +\epsilon}, \] where $\epsilon > 0$ is any positive real number.
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