On Euler products with smaller than one exponents

Investigation has been made regarding the properties of the ℿ_p≤n (1 ± 1/p^s) products over the prime numbers, where we fix the s ∈ ℝ exponent, and let the n ≥ 2 natural bound grow toward positive infinity. The nature of these products for the s ≥ 1 case is known. We get approximations for the case when s ∈ [1/2, 1), furthermore different observations for the case when s<1/2.