General Mathematics

1901 Submissions

[6] viXra:1901.0240 [pdf] replaced on 2019-01-17 03:44:57

Riemann Hypothesis 2 Counter Examples

Authors: Toshiro Takami
Comments: 8 Pages.

It presents counter exsample which is close to 0.5 of 2 Riemann hypothesis but not 0.5. Somewhere on the net there is a memory that reads the mathematician's view that "there are countless zero points in the vicinity of 0.5", which seems to be. This is the value I gave by hand calculation, and it seems that correction by supercomputer is necessary. Among these 2, it is presumed that a true counter example and a thing that is not mixed together. zeta[0.4999944+i393939958.90878694741368323631]= 9.30660314868779... × 10^-19 + 1.342928180878699... × 10^-12 i and zeta[0.4999964+i393939964.659437163857861]= -5.914628349384624... × 10^-16 + 6.504227267123851... × 10^-13 i
Category: General Mathematics

[5] viXra:1901.0209 [pdf] submitted on 2019-01-14 17:11:15

π Formula

Authors: Yuji Masuda
Comments: 1 Page.

This is π formula.
Category: General Mathematics

[4] viXra:1901.0154 [pdf] submitted on 2019-01-11 06:25:44

Una Integral Elemental

Authors: Edgar Valdebenito
Comments: 1 Page.

Esta nota muestra una integral elemental.
Category: General Mathematics

[3] viXra:1901.0153 [pdf] submitted on 2019-01-11 06:28:59

Fractales Y Fórmulas

Authors: Edgar Valdebenito
Comments: 69 Pages.

Esta nota muestra una colección de fractales.
Category: General Mathematics

[2] viXra:1901.0100 [pdf] submitted on 2019-01-09 01:40:30

The Perturbation Analysis of Low-Rank Matrix Stable Recovery

Authors: Jianwen Huang, Jianjun Wang, Feng Zhang, Hailin Wang
Comments: 17 Pages.

In this paper, we bring forward a completely perturbed nuclear norm minimization method to tackle a formulation of completely perturbed low-rank matrices recovery. In view of the matrix version of the restricted isometry property (RIP) and the Frobenius-robust rank null space property (FRNSP), this paper extends the investigation to a completely perturbed model taking into consideration not only noise but also perturbation, derives sufficient conditions guaranteeing that low-rank matrices can be robustly and stably reconstructed under the completely perturbed scenario, as well as finally presents an upper bound estimation of recovery error. The upper bound estimation can be described by two terms, one concerning the total noise, and another regarding the best $r$-approximation error. Specially, we not only improve the condition corresponding with RIP, but also ameliorate the upper bound estimation in case the results reduce to the general case. Furthermore, in the case of $\mathcal{E}=0$, the obtaining conditions are optimal.
Category: General Mathematics

[1] viXra:1901.0025 [pdf] submitted on 2019-01-04 00:51:50

The Personalities of Numbers

Authors: Sai Venkatesh Balasubramanian
Comments: 4 Pages.

Every number, every equation carries profound meaning, not just physically, but in the bigger scheme of things. We set out to study and uncover them.
Category: General Mathematics