The variance of primes in short intervals relates to the Riemann Hypothesis, Montgomery's Pair Correlation Conjecture and the Hardy--Littlewood Conjecture. In regards to its asymptotics, very little is known unconditionally. We study the variance of integers without prime factors below $y$, in short intervals. We use complex analysis and sieve theory to prove an unconditional asymptotic result in a range for which we give evidence is qualitatively best possible. We find that this variance connects with statistics of $y$-friable (smooth) numbers, and, as with primes, is asymptotically smaller than the naive probabilistic prediction once the length of the interval is at least a power of $y$.Comment: Range of smoothness parameter improved. 22 ...
We are interested in classifying those sets of primes PP such that when we sieve out the integers up...
We relate the size of the error term in the Hardy-Littlewood conjectured formula for the number of p...
Assuming the Riemann Hypothesis we prove that the interval $[N,N+H]$ contains an integer which ...
In this thesis, we focus on the problem of primes in short intervals. We will explore the main ingre...
In this paper we extend the well-known investigations of Montgomery (1973) and Goldston and Montgome...
In this paper, we prove that, for any positive constants d and e and every large enough x, the inter...
This paper is concerned with the number of primes in short intervals. We prove that for every $\thet...
Consider the variance for the number of primes that are both in the interval [y, y + h] for y ∈ [x, ...
We prove that suitable asymptotic formulae in short intervals hold for the problems of representing ...
AbstractWe consider the problem of estimating the number Ψ(x, xx) − Ψ(x − xβ, xx) of integers in the...
AbstractSelberg has shown on the basis of the Riemann hypothesis that for every ε > 0 most intervals...
We show that counts of squarefree integers up to $X$ in short intervals of size $H$ tend to a Gaussi...
AbstractWe obtain second-order terms for the variance and covariance of Ω(n) and ω(n), the number of...
We introduce a new probabilistic model of the primes consisting of integers that survive the sieving...
We prove that suitable asymptotic formulae in short intervals hold for the problems of representing ...
We are interested in classifying those sets of primes PP such that when we sieve out the integers up...
We relate the size of the error term in the Hardy-Littlewood conjectured formula for the number of p...
Assuming the Riemann Hypothesis we prove that the interval $[N,N+H]$ contains an integer which ...
In this thesis, we focus on the problem of primes in short intervals. We will explore the main ingre...
In this paper we extend the well-known investigations of Montgomery (1973) and Goldston and Montgome...
In this paper, we prove that, for any positive constants d and e and every large enough x, the inter...
This paper is concerned with the number of primes in short intervals. We prove that for every $\thet...
Consider the variance for the number of primes that are both in the interval [y, y + h] for y ∈ [x, ...
We prove that suitable asymptotic formulae in short intervals hold for the problems of representing ...
AbstractWe consider the problem of estimating the number Ψ(x, xx) − Ψ(x − xβ, xx) of integers in the...
AbstractSelberg has shown on the basis of the Riemann hypothesis that for every ε > 0 most intervals...
We show that counts of squarefree integers up to $X$ in short intervals of size $H$ tend to a Gaussi...
AbstractWe obtain second-order terms for the variance and covariance of Ω(n) and ω(n), the number of...
We introduce a new probabilistic model of the primes consisting of integers that survive the sieving...
We prove that suitable asymptotic formulae in short intervals hold for the problems of representing ...
We are interested in classifying those sets of primes PP such that when we sieve out the integers up...
We relate the size of the error term in the Hardy-Littlewood conjectured formula for the number of p...
Assuming the Riemann Hypothesis we prove that the interval $[N,N+H]$ contains an integer which ...
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