User talk:Spanu.Dumitru.Viorel

Spanu.Dumitru.Viorel (talk) 17:56, 9 August 2009 (UTC)Spanu.Dumitru.Viorel (talk) 02:19, 4 August 2009 (UTC)  I  am   willing  to contribute  at  wikipedia  site. I think  that  is  a  very  nice  work  and  I  congratulate  the  managers  of  the  site. I do  not ,  please  understand  me  ,  to  offend  with  no  reason  a  person  ,  but  your  "  contributor  "  which  didn`t give his  name ,  I  mean  that  4.153.83.1    just  stole  my  idea  from  the  text  "  Space Ubiquity . Time Ubiquity .Example "   and  "  In  Quantum  Mechanics  there is  NO  TIME  "   that  I  uploaded   on  www.scribd.com    exactly   on  at  the  date  and  prior  of  the  modification  that  4.153.83.1  ,  which  give  not  his  name  ,  use  my  Idea  of UBIQUITY  in  " his "  text. I think  that  is  totaly  unfair  and  in  no  accordance  with  the  policy  of  the   site  wikipedia  and  with  no  ethical  principle. I am  deceived  about  the  persons  which  signs  with  4.153.83.1  and  I  firmly   request  to you,  which  are  the  manager  of  a  most  respected  and  known  site  in  the  world. to ERASE    his  " contribution "  made  on  26.07.2009.

Please,  see  my  two  text  named  Space Ubiquity.Time Ubiquity. Example " and  "  In  Quantum  Mechanics  there  is  NO  TIME  "  on  www.scribd.com  .  Those  text  are  signed ,  because  are  not  stiolen  and  are  my  own  work with  my  whole  name  :  Spanu  Dumitru  Viorel.

This is  "  his  "  contribution.

Spacetime From Wikipedia, the free encyclopedia (Difference between revisions) Jump to: navigation, search Revision as of 00:12, 8 July 2009 (edit) 93.160.220.106 (talk) (→Concept with dimensions) ← Previous edit Revision as of 23:46, 26 July 2009 (edit) (undo) 4.153.83.1 (talk) (→Space-time intervals) Next edit →

Line 35:	Line 35: Spacetime entails a new concept of distance. Whereas distances in Euclidean spaces are entirely spatial and always positive, in special relativity, the concept of distance is quantified in terms of the space-time interval between two events, which occur in two locations at two times:		Spacetime entails a new concept of distance. Whereas distances in Euclidean spaces are entirely spatial and always positive, in special relativity, the concept of distance is quantified in terms of the space-time interval between two events, which occur in two locations at two times:

-	 $$s^2 = c^2\Delta t^2 - \Delta r^2\,$$  (spacetime interval), 	+	 $$s^2 = - \Delta r^2 c^2\Delta t^2 \,$$   (spacetime interval), where:		where:

In the  statement  of  the   person  signing  with  4.153.83.1   which  said :

He MUST  SPECIFIED  :  " in special relativity, the concept of distance is quantified in terms of the space-time interval between two  DIFFERENT     events, which occur in two locations at two times: "

If this  precisation  is  not  said  than  one  might  think  that  the  events  are exactly identical ,  and  this  MEANS   Space and  Time  Ubiquity. These concepts are  developped  in  my  texts "Space Ubiquity. Time Ubiquity.Example " and "  In  Quantum  Mechanics  there  is  NO  TIME  "

that I  uploaded  oon  www,scribd.com prior to  4.153.83.1  " contibutions  "

I wish  that  you  the  managers  of  the  site  wikipedia  to  be  as  fairplay  as  you  use  to  be  till  now.

Kindest regards ! Spanu Dumitru  VIorel

Spanu.Dumitru.Viorel (talk) 11:55, 4 August 2009 (UTC)  AT  QUANTUM  LEVEL   TIME  DOES  NOT  EXIST

IN QUANTUM  MECHANICS  THERE   IS                                   NO  TIME.

Stimata redactie a  revistei  VOX  PHILOSOPHIAE  ,  textul  pe  care  il  trimit  spre  publicare  este  un  text  de  fizica  ,  nu  o  disertatie filozofica ,  dar  el  poate  initia  o  dezbatere  metafizica  extrem  de  fructuoasa. De aceea  va  propun  sa-l  publicati  “  as  it  is  “. Textul are  un  aparat  matematic  in  spate,  dar  nici  o  formula  sau  demonstratie  matematica  implicata  nu  va  aparea  in  text  ,  astfel  incit  el  va  fi  foarte  accesibil.

Author :  Spanu  Dumitru  Viorel Address :  Street  Marcu  Mihaela  Ruxandra  no. 5 , Bucharest,  Romania Emails: spanuviorel@yahoo.com spanu_dumitruviorel@yahoo.com dvspanu@gmail.com Phones :  +40214131107 +40723880545

ARTICOLUL :

In quantum  mechanics  there  is  NO  TIME. Short response  to  Smarandache  hypothesis.

Florentin Smarandache  made  this  hypothesis  about pairs of entangled   photons,  trying  to  show  how  the  two  photons  communicate  their  state  at  any  distance.

Smarandache Hypothesis  :

There is  no  speed  limit  in  the  Universe.

Genius Albert   Einstein  postulates  that  the  speed  of  light  is  the  speed  limit   in  Universe.

The explanation  of  the  fact  that  a  pair  of  entangled  photons  communicate  instantly   their  state  at   any  distance   is  this : in quantum  mechanics  there  is   NO  TIME.

If there  is  NO  TIME ,  the  quantum  particles  have  the  property   of  ubiquity. This fact   is  very  known  in  quantum  mechanics.

Because time  DO  EXIST  at  macroscopic  level ,  the  complex  systems  which  are  bodies   DO   NOT  HAVE  the  property  of  ubiquity.

In traducere  :

“ In  mecanica  cuantica  nu  exista  timpul.

( La  nivel cuantic ,  timpul  nu  exista  )

Scurt raspuns  la  Ipoteza  Smarandache.

Florentin Smarandache  a  facut  aceasta   ipoteza  despre  perechile  de  fotoni  intricati  cuantic ,  incercind  sa  arate  ca  cei  doi  fotoni  isi  comunica  starile  cuantice  la  orice  distanta.

Ipoteza Smarandache  :

Nu exista  viteza  limita  in  Univers.

Geniul Albert  Einstein a  emis  urmatorul  postulat  : Viteza luminii  este  viteza  limita  in  Univers.

The explanation  of  the  fact  that  a  pair  of  entangled  photons  communicate  instantly   their  state  at   any  distance   is  this : in quantum  mechanics  there  is   NO  TIME.

Explicatia  faptului   ca   o  pereche  de  fotoni  intricati   cuantic   isi  comunica starile  instantaneu  la  orice  distanta  este  aceasta  :

in mecanica  cuantica    NU  EXISTA  TIMP. ( La  nivel  cuantic   NU   EXISTA    TIMP   .   )

( Nu  vom  insera  aparatul  matematic ,  care  nu  este  complicat  ,  dar  este  insipid  pentru  nematematicieni  .  )

If there  is  NO  TIME ,  the  quantum  particles  have  the  property   of  ubiquity. This fact   is  very  known  in  quantum  mechanics.

Daca NU  EXISTA TIMP  (  la  nivel  cuantic  ) ,  particulele  cuantice  au  proprietatea  de  ubicuitate   SPATIALA. Acest fapt  este  foarte  cunoscut  in   mecanica  cuantica.

Exemplu :  un  electron  care  coboara  pe  o  orbita  cu  un  nivel  de energie   mai  mic ,  emite  un  foton. Pina cind  nu  inregistram  fotonul (fotoelectron)  cu  o  fotocelula ,  acest  foton  exista  peste  tot  intr-un  spatiu  sferic. Intrebarea filozofica   " De unde emerge timpul ? "   al carei parinte    este fizicianul francez si filozof al stiintei Etienne Klein    invita  la  o   dezbatere  filozofica  foarte   ampla   si   textul   acesta  " In quantum mechanica there is NO TIME " incita  chiar  si  mai mult  pentru  ca vine  cu o precizare foarte  buna : La nivel cuantic, particulele au proprietatea  de   ubicuitate  spatiala  ,   dar la nivel macroscopic, intrucit timpul exista , sistemele complexe care sunt corpurile NU AU proprietatea de ubicuitate ( SPATIALA ).

ACEASTA PRECIZARE ( “ UBICUITATE  SPATIALA “ )  ESTE  EXTREM  DE  IMPORTANTA  ;  Vom  discuta  ca un  comentariu   ce  inseamna  o  ubicuitate  temporala. Exista doua  feluri  de  ubicuitati  temporale. Le vom  prezenta.

Primul tip  de  ubicuitate  temporala  :

Pe axa unica a  timpului ,  la  momentele  t1   si  t2  ,  diferite  intre  ele  ,  avem  acelasi  fenomen  identic si  ireversibil  (  de  exemplu  nasterea  aceluiasi  copil  .  )

Al doilea   tip  de  ubicuitate   temporala  : Sa discutam  acest  caz .Voi  insera  intrebarea  filozofului  canadian  Jason  Werbics.

“ Ubiquitous time at the quantum level.”( Timp  ubicuu  la  nivel  cuantic .) “Very interesting... “( Foarte  interesant  …) “yet if we can measure a neutron at such a level, surely time can still be found?” ( Daca putem  masura  un  neutron  la un  asemenea  nivel ,  sigur  timpul  poate  fi  totusi   gasit ? )

Raspunsul a  fost    : Ginditi-va  la  pisica  lui   Schroedinger. Ea este  atit  vie  cit  si  moarta. Cum este  posibil  acest  lucru  ? Nu ati  facut  nicio  conexiune  ? Daca avem  un  TIMP  2 - DIMENSIONAL  (  noi  discutam  acest  caz,  dar  am  putea  discuta  orice   TIMP   n- DIMENSIONAL  ) ,  id  est  un  timp  ca  o  coala  de  hirtie. Intr-o directie  temporala ,  la   momentul      t1    exista  o  pisica  vie. Intr-o directie  temporala  perpendiculara   pe   prima ,  la    t2   exista  o  pisica  moarta. Aceasta poate  fi,  pentru  noi ,  care  folosim  un  timp  cu  o  singura  axa  , un  timp  ubicuu. Remark : The  Schroedinger`s  cat  it`s   a  concept  used  by  Erwin  Schroedinger. Textul “  In quantum mechanics there is NO TIME " este  credinta  mea  puternica.

Because time  DO  EXIST  at  macroscopic  level ,  the  complex  systems  which  are  bodies   DO   NOT  HAVE  the  property  of  ubiquity.

Pentru ca  timpul  EXISTA    la  nivel  macroscopic ,  sistemele   complexe  care  sunt   corpurile  NU  AU  PROPRIETATEA  DE UBICUITATE (  SPATIALA  ).

Example of  ubiquity :

From “ Inside Science  Research  -  Physics News Update “ Number 617 #2, December 13, 2002 by Phil Schewe, James Riordon, and Ben Stein Reactor Anti-Neutrino Disappearance

“ At any point along its trajectory the generic neutrino might (if you were to capture it just then) appear as an electron neutrino, but farther along it might look like a muon neutrino, in which case it would elude detectors tuned to detect only electron nu's. “

The article  is  in  progress.

*********************************************************************************************

NEW  TALKS

Author : Spanu Dumitru Viorel

Street Marcu Mihaela Ruxandra no. 5, 061524 , Bucharest , Romania E-mail : spanuviorel@yahoo.com ; spanu_dumitruviorel@yahoo.com dvspanu@gmail.com

Phone : +40214131107 ; +40723880545

SOLVING THE  MULTIPLE  INTEGRAL  WHICH  GIVES  THE HYPERVOLUME OF  THE     n  -  HYPERSPHERE  OF  RADIUS  R.

Because of  the  length  of  multiple  integral ,  the  simple constituent integrals  were aligned  vertically. Consider that  the  whole  multiple  integral  is  written  horizontally.

The  hypervolume  of the  n – hypersphere  will   be  denoted  Vn.

Mai putem pune aceasta formula sub o forma desfasurata , extrem de comoda pentru calcule, cu conditia ca i ≥ 2. Pentru cazul i = 1 sa calculam hipervolumul hipersferei 1 – dimensionale ( adica diametrul cercului ).

I can   write  this   formulae  in   a  large  form  which  is  extremely  easy  to  calculate  , with the  condition   that   i  ≥ 2.

For the  case   i =  1 , let`s  calculate  the  hypervolume  of  the                                                            hypersphere  1-  dimensional  (  id  est  the  diameter  of  the  circle  ).

I shall   cite  also  from  www.mathworld.wolfram.com

Hypersphere

The -hypersphere (often simply called the  -sphere) is a generalization of the circle (called by geometers the 2-sphere) and usual sphere (called by geometers the 3-sphere) to dimensions. The -sphere is therefore defined (again, to a geometer; see below) as the set of  -tuples of points (,  , ...,  ) such that (1) where is the radius of the hypersphere.

This text    SOLVING  THE  MULTIPLE  INTEGRAL  WHICH  GIVES  THE HYPERVOLUME OF  THE     n  -  HYPERSPHERE  OF  RADIUS  R. Is   a  part    of  the   pdf   file  “ 14150789- A – Original- Method- of-Solving  the  n –Multiple- Integral. pdf. Adobe Reader “ which was   up – loaded    3  months  ago www.scribd.com and is  up – loaded   now  again.

There are  mathematics  formulas  which the  page    do  not  allow  to  be  put  in  page. All the  text ,  with  the  formulas  ,  can  be  find  on  www.scribd.com

as : "              SOLVING  THE  MULTIPLE  INTEGRAL  WHICH  GIVES  THE          HYPERVOLUME  OF  THE     n  -  HYPERSPHERE  OF  RADIUS  R  .  "

( author :  Spanu  Dumitru  Viorel  )

and also  the  text  ,which  is  complete  ( it`s a pdf  file  ) denoted  :

" 14150789-A-Original-Method-of -Solving-the-n-Multiple-Integral " ( Adobe Acrobat Document on www.scribd.com    -   author  Spanu  dumitru  Viorel  )

THE TALK  ABOUT  THE  APPLICATIONS  IN  PHYSICS  of  the A-Original-Method-of -Solving-the-n-Multiple-Integral.

The Text  contain  this  very  important  statement   of  mine  :

" Pentru orice  valoare  intreaga  a  lui  n  avem  o  proprietate  geometrica              distincta  .  "

" For each  integer  value  of   n   we  have  a  distinct  geometrical property ."

This is the whole  talk " The  applications  in  physics  of  the  Original  Method  of  Solving  the  n – Multiple  Integral .The  hypervolume  oh  the  n- hypersphere . "

Author : Spanu Dumitru Viorel Address : Street Marcu  Mihaela Ruxandra no. 5 , 061524, Bucharest , Romania Phones: +40214131107 +40723880545     Emails: spanuviorel@yahoo.com spanu_dumitruviorel@yahoo.com dvspanu@gmail.com

Physics.Essay

Aplicatiile in Fizica  ale  textului

The applications  in  physics  of  the  Original  Method  of  Solving  the  n – Multiple  Integral. The hypervolume  oh  the  n- hypersphere.

“  O  metoda  originala  de  rezolvare  a  integralei  multiple  de  ordinul  n. “ ( Hipervolumul  hipersferei  n- dimensionale ).

Probabilitatea ca  sa  gasim  particula  intr-o  mica regiune  a  spatiului  de volum d3x ,  care  contine  punctul  x  este │Ψ(x,t) │2 d3x.

What can  we  define  in  a  4-dimensional  space ? The probability  to  find  the  quantum  particle  in  a  small  region  of  the  space  having  the  volume  d3x, which  contains  the  point  x  is  │Ψ(x,t) │2  d3x.

What can  we  define  in a  1-dimensional  space  ? The case  of  the  1-dimensional  sphere ,  id  est  the  diameter   of  the  circle. Well,   the  length  of  a   string.

What can  we  define  in  a  2 – dimensional  space ? Well,  a  string  which  vibrates  creates  a  surface. See the 2-dimensional  sphere ,  id  est  the  circle.

What can  we  define  in a  3-dimensional  space. A flux  which  goes  through  a  surface  for  a  time.

Albert Einstein  said  gravity  is a geometrical   property  of  the  four   dimensional  space.

The text  “  An  original  method  of  solving  the  n-multiple   integral  “  which  gives  the  hypervolume  of  the  n- hypersphere  contains  this  proposition  :

Pentru orice  valoare  intreaga  a  lui  n  avem  o  proprietate  geometrica  distincta.

For each  integer  value  of   n   we  have  a  distinct  geometrical  property.

Masa ar  putea  fi  proprietatea  geometrica creata   de o  sfera  5-dimensionala.

The Mass  could  be  the  geometrical  property  created  by a  5 – dimensional  sphere.

And  so  on  ...  ( For  each  integer  value  of   n   we  have  a  distinct  geometrical  property  . )

Remark : 1-dimensional  hypersphere ,  2-dimensional  hypersphere  , … , n-dimensional  hypersphere ,  obey  the way  geometres note them  ( not  topological  ).

Work in progress.

A original method of solving the n  multiple integral
A original method of solving the  n  multiple integral which  gives  the  formula  for  the  hypevolume  of  the  n  dimensional  sphere  ;  the  hypercube ;  Work  is  in  progress ;  Because  of  the  complexity  of  formulas the  expressions  under  the  integral  sign  were  written  on  vertical  ;  consider it  just  as  them  are  written  horizontally.

This method can  be  find  on  www.scribd.com.

The URL  is  :

http://www.scribd.com/doc/14150789/A-Original-Method-of-Solving-the-n-Multiple-Integral

This method  of  method of  solving the  n  multiple integral which  gives  the  formula  for  the  hypevolume  of  the  n  dimensional  sphere    was  uploaded  on  www.scribd.com   on  11 April  2009

and it  was  first  sent  to  the  mathematical  magazine  "  Gazeta  Matematica  "  on  10  November  2007.

The author  : Spanu  Dumitru  Viorel

I like  to  point  the  fact  that  after  i  uploaded  on 11 April  2009    on   www.scribd.com   the text :

" A original method of solving the n multiple integral which gives the formula for the hypevolume of the n dimensional sphere ;  "

which is  a  pdf  file  of  99  pages which can  be  brief  described  so  :

" A original method of solving the n multiple integral which gives the formula for the hypevolume of the n dimensional sphere ; the hypercube ; Work is in progress ; Because of the complexity of formulas the expressions under the integral sign were written on vertical ; consider it just as them are written horizontally "

some contributions  to  wikipedia  appears suddenly  about  the  hypervolume  of  the  n-hypersfere ,  like  that  of  Slawomir  Bialy  et  al.

The text      "  A original method of solving the n multiple integral which gives the formula for the hypevolume of the n dimensional sphere ;  "

was first  sent  to  the  mathematical  magazine  "  Gazeta  Matematica "  from  Romania  on  10  November  2007  and  it  was  uploaded  on  www.scribd.com  on  11 April  2009.

This text  of  99  pages ,  the     "  A original method of solving the n multiple integral which gives the formula for the hypevolume of the n dimensional sphere ;  "  does  not  contain  any  mistake. It is    free  of  mistakes  and  I  have  copyright  rights  (  all  rights  reserved ).

This text  "  A original method of solving the n multiple integral which gives the formula for the hypevolume of the n dimensional sphere ; " has  the  URL  :

http://www.scribd.com/doc/14150789/A-Original-Method-of-Solving-the-n-Multiple-Integral

The author  :  Spanu  Dumitru  Viorel  —Preceding unsigned comment added by 85.186.180.247 (talk) 16:57, 4 December 2009 (UTC)

The Riemann Hypothesis  Demonstrated   By  Pankaj  Mani
Pankaj Mani   demonstrated  THE  RIEMANN  HYPOTHESIS.

The demonstration  is  uploaded  on                    http://www.scribd.com/doc/64338074/Riemann-Hypothesis-and-Game-Theory

Pankaj Mani  is  a  young  mathematician  that  uploaded  his  demonstration  of  The  Riemann  Hypothesis  on   www.scribd.com. The demonstration  is  the  intellectual  property  of Pankaj  Mani ,  from  New  Delhi  ,  India.

Spanu.Dumitru.Viorel (talk) 00:14, 10 September 2011 (UTC)

Cultural heritage of mankind
I can`t understand  why  some  contributors  to Wikipedia  do not sign  their contributions, small or  large contributions  , with  their  real  name. It is  a  honor  to  make  a  contribution  to  the  cultural  heritage of humanity. This piece of art,  which  is  in  fact  Wikipedia  ,  is  a  keeper  of  our  cultural heritage of mankind. Spanu.Dumitru.Viorel (talk) 05:16, 7 January 2012 (UTC)