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Validity of analysis of summation of function of primes using Abel–Plana summation:

Consider the analytic function $g(x)$ Define $$f(x)=g(x)\frac{\sin^2\left(\frac{π\Gamma(x)}{2x}\right)}{\cos^2\left(\frac{π}{2x}\right)}$$ Note that: $$f(p)=g(p) \text{ for prime } p$$ And $f(n)=0$ ...
TPC's user avatar
  • 782
-1 votes
0 answers
347 views

On a Duality between Riemann-weil explicit formula and Abel- Plana summation of trigonometric prime counting function:

Consider the analytic function $g(x)$ Now define $f(x)=g(x)\frac{\sin^2\left(\frac{π\Gamma(x)}{2x}\right)}{\cos^2\left(\frac{π}{2x}\right)}$ Such that $|f(x+it)|=o(e^{2πt})$ uniformly for every $x$...
TPC's user avatar
  • 782
1 vote
0 answers
203 views

Construction of weight function to satisfy condition on given functional

Consider the following function : $$F(z) = \omega(z){\sin^2\left(\frac{c\Gamma(z)}{z}\right)}$$ Here, $\omega(z)$ is a weight we are going to consider The following two conditions should meet for $\...
bambi's user avatar
  • 375
4 votes
0 answers
922 views

Guessing of $n$th prime from "super- regularized" product of primes

( I've been thinking about asking this for a long time . Though this is not rigorous; It can be thought of as heuristic or extraction of information from different viewpoint.) We know "super-...
TPC's user avatar
  • 782
0 votes
2 answers
193 views

Space of functions f such that the number of primes in $ [x, x+f(x)] $ remains bounded

Given a positive integer $ n $ , let $ S_{b}(n) $ the set of functions $ f $ fulfilling the following conditions : 1) $ f $ is continuous, positive and increasing on $(n,+\infty) $ 2) for ...
Sylvain JULIEN's user avatar