Related papers: Effective completeness for real computation
This paper is being withdrawn by the authors in order to correct some errors and also to introduce improved theoretical techniques.
The paper is withdrawn by the authors and replaced be an improved and extended version arxiv: 0812.2968
The paper has been withdrawn due to numerical error.
We point out that the claim of strong universality in the paper J.Phys. A 44, 015002, arXiv:1011.3321 is incorrect, as it contradicts known rigorous results.
In this remark we identify the cause of the loss of accuracy in the computation of the Faddeyeva function, w(z), near the real axis when using Algorithm 680. We provide a simple correction to this problem which allows us to restore this…
The margin of victory is easy to compute for many election schemes but difficult for Instant Runoff Voting (IRV). This is important because arguments about the correctness of an election outcome usually rely on the size of the electoral…
Notwithstanding interest and excitement building around quantum computing in the last decades, a concise statement saying where this computing can truly help is still missing. As it is shown in the present paper, equal cost of computation…
This paper has been withdrawn by the author due to a mistake in the section 4.
The paper has been withdrawn due to an error in Lemma 1.
This paper has been withdrawn by the authors, due a crucial error in the Montecarlo simulation. See hep-ph/0107112 for a correct version. If interested in the validity of the effective-W approximation see hep-ph/0109059.
The paper has been withdrawn due to a crucial error in section 3.
This paper has been withdrawn by the author because Conjecture 1 is false. Please see arXiv:0901.2093 for a justification that Conjecture 1 is false. The other main results are also available from the above URL.
The main purpose of this paper is to correct an error in the previously submitted version [*] := arXiv:2004.13749v1. [*] had been already accepted for publication in a scientific journal, but withdrawn by the author after the discovery of…
This paper has been withdrawn by the authors, due to the discovery of paper 0201028 which predates it and contains most of it's results.
This paper is withdrawn. A revised and expanded version of this work is available as hep-ph/9603323.
The paper has benn withdrawn because the computation of the external virial contains an error which invalidate the main result.
An efficient numerical algorithm for the computation of linking number is presented. The algorithm keep tracks or rounding error so that it can ensure the correctness of the results.
This paper has been withdrawn by the author due to errors.
In this paper has been withrawn by the author due the error in the proof of theoem 1.
This paper has been withdrawn by the authors due to a crucial error.