On some products taken over the prime numbers
Abstract
This paper is devoted to study some expressions of the type Πp pxf(p), where x is a nonnegative real number, f is an arithmetic function satisfying some conditions, and the product is over the primes p. We begin by proving that such expressions can be expressed by using the lcm function, without any reference to prime numbers; we illustrate this result with several examples. The rest of the paper is devoted to study the two particular cases related to f(m) = m and f(m) = m - 1. In both cases, we found arithmetic properties and analytic estimates for the underlying expressions. We also put forward an important conjecture for the case f(m) = m - 1, which depends on the counting of the prime numbers of a special form.
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