Some local-convexity theorems for the zeta-function-like analytic functions
Balasubramanian, R ; Ramachandra, K
HAL, hal-01104306 / Harvested from HAL
In this paper we investigate lower bounds for $$I(\sigma)= \int^H_{-H}\vert f(\sigma+it_0+iv)\vert^kdv,$$ where $f(s)$ is analytic for $s=\sigma+it$ in $\mathcal{R}=\{a\leq\sigma\leq b, t_0-H\leq t\leq t_0+H\}$ with $\vert f(s)\vert\leq M$ for $s\in\mathcal{R}$. Our method rests on a convexity technique, involving averaging with the exponential function. We prove a general lower bound result for $I(\sigma)$ and give an application concerning the Riemann zeta-function $\zeta(s)$. We also use our methods to prove that large values of $\vert\zeta(s)\vert$ are ``rare'' in a certain sense.
Publié le : 1988-07-04
Classification:  functional equation,  analytic functions,  local-convexity,  [MATH]Mathematics [math]
@article{hal-01104306,
     author = {Balasubramanian, R and Ramachandra, K},
     title = {Some local-convexity theorems for the zeta-function-like analytic functions},
     journal = {HAL},
     volume = {1988},
     number = {0},
     year = {1988},
     language = {en},
     url = {http://dml.mathdoc.fr/item/hal-01104306}
}
Balasubramanian, R; Ramachandra, K. Some local-convexity theorems for the zeta-function-like analytic functions. HAL, Tome 1988 (1988) no. 0, . http://gdmltest.u-ga.fr/item/hal-01104306/