sci.math.research

Date Index

Paper published by Algebraic and Geometric Topology, Geometry and Topology Journal
morphism of principal fiber bundles, principalbundles
This Week's Finds in Mathematical Physics (Week 216), John Baez
Quantum Gravity Seminar - Fall 2004, Week 8, John Baez
Non positive semidefinite?, ss54
Partial sum with at most real root-[Sylvester], alexandru . lupas
Line geometry/complex, Jean-Pierre Merlet
- Re: Line geometry/complex, Christopher J. Henrich
  - Re: Line geometry/complex, Jean-Pierre Merlet
    - Re: Line geometry/complex, Christopher J. Henrich
A polynomial, qcheng@xxxxxxxxx
Two papers published by Algebraic and Geometric Topology Publications, Geometry and Topology Journal
Reflection principle, anne
- Re: Reflection principle, Dr. Stefan Reitz
- <Possible follow-ups>
- Re: Reflection principle, mathman
Fractals: Holder/Lipschitz <=> Hurst exponents ?, John Sasso
Lie structure induced by short exact sequence, Oliver Goertsches
- Re: Lie structure induced by short exact sequence, Torsten Ekedahl
  - Re: Lie structure induced by short exact sequence, Daniel Asimov
    - Re: Lie structure induced by short exact sequence, Oliver Goertsches
Two papers published by Geometry and Topology Publications, Geometry and Topology Journal
A question on Manifolds, Toshi
- Re: A question on Manifolds, David L. Johnson
Re: Polynomials with positive roots and subresultants, Fernando Revilla
How can an isometry be surjective?, Yo Wang
- Re: How can an isometry be surjective?, Andrew D. Hwang
- <Possible follow-ups>
- Re: How can an isometry be surjective?, Ali Taghavi
New version (10.4) of mathematical visualization Software, 3D-XplorMath, dick
Ramanujan's Continued Fractions and Platonic Solids, Maarten Bergvelt
- <Possible follow-ups>
- Ramanujan's Continued Fractions and Platonic Solids, titus_piezas
Structure of the "hinge angles", Bertrand Nouvel
This week in the mathematics arXiv (16 May - 20 May), Greg Kuperberg
Open but not universally open?, Ilya Zakharevich
- Re: Open but not universally open?, Jannick Asmus
  - Re: Open but not universally open?, Ilya Zakharevich
    - Re: Open but not universally open?, Ilya Zakharevich
oscillatory solutions of difference equations, Kim
This week in the mathematics arXiv (9 May - 13 May), Greg Kuperberg
Paper published by Geometry and Topology, Geometry and Topology Journal
- <Possible follow-ups>
- Paper published by Geometry and Topology, Geometry and Topology Journal
- Paper published by Geometry and Topology, Geometry and Topology Journal
Re: Ring of Polynomials on a Manifold, Ali Taghavi
" How to reduce equation g(n(x,y), m(x,y) ) = h(g(x,y)) g unknown. ", alain verghote
quotient of S^3 by binary tetrahedral group, mwatkins
- Re: quotient of S^3 by binary tetrahedral group, Robin Chapman
What kind of problem is this?, Arash Partow
- Re: What kind of problem is this?, Richard M. Woodward
  - Re: What kind of problem is this?, Arash Partow
    - Re: What kind of problem is this?, Tim Boykett
Elliptic function as hyperbolic function series - reference, cgi-bin
- Re: Elliptic function as hyperbolic function series - reference, C Moi
  - Re: Elliptic function as hyperbolic function series - reference, cgi-bin
Limited breakdown of Riemann hypothesis, riskbert2
Riemann and prime number theorem for special sets, riskbert2
- Re: Riemann and prime number theorem for special sets, Gerry Myerson
Normalizer of the Group of isometries, Ali Taghavi
- Re: Normalizer of the Group of isometries, David C. Ullrich
- <Possible follow-ups>
- Re: Normalizer of the Group of isometries, Ali Taghavi
  - Re: Normalizer of the Group of isometries, David C. Ullrich
representing a surface in R^5, michael friedman
- Re: representing a surface in R^5, Lee Rudolph
- Re: representing a surface in R^5, Keith Ramsay
- <Possible follow-ups>
- Re: representing a surface in R^5, michael friedman
- Re: representing a surface in R^5, michael friedman
  - Re: representing a surface in R^5, Lee Rudolph
- Re: representing a surface in R^5, michael friedman
  - Re: representing a surface in R^5, gv
    - Re: representing a surface in R^5, Dave Rusin
  - Re: representing a surface in R^5, gv
- Re: representing a surface in R^5, michael friedman
- Re: representing a surface in R^5, michael friedman
New formulation for an old problem, Han de Bruijn
On left Max rings, freedom641@xxxxxxxxx
Connected Metric Space, Ali Taghavi
- Re: Connected Metric Space, Robert E. Beaudoin
An extension of Young's Inequality, Yi Fan
- Re: An extension of Young's Inequality, Dave Elliott
This week in the mathematics arXiv (2 May - 6 May), Greg Kuperberg
Statistical analysis of share- like components behavior, Fredrik
- Re: Statistical analysis of share- like components behavior, Axel Vogt
A Question On Complet Space, Ali Taghavi
- <Possible follow-ups>
- Re: A Question On Complet Space, Valeriu Anisiu
Music and Category theory?, kidane . yemane
- Re: Music and Category theory?, manuel
- Re: Music and Category theory?, Marc Olschok
  - Re: Music and Category theory?, analytic
- Re: Music and Category theory?, analytic
Deviations in the number of points on curves mod p, harald . helfgott
Re: parallel transport, Patrick Iglesias-Zemmour
Re: McDowell-Mansouri gravity, Baugh
Maximal order subgroups of Z(m;*) with m=2^n and n>3., Rafael Valls Hidalgo-Gato
- Re: Maximal order subgroups of Z(m;*) with m=2^n and n>3., Arturo Magidin
  - Re: Maximal order subgroups of Z(m;*) with m=2^n and n>3., Rafael Valls Hidalgo-Gato
- Re: Maximal order subgroups of Z(m;*) with m=2^n and n>3., Keith Ramsay
  - Re: Maximal order subgroups of Z(m;*) with m=2^n and n>3., Rafael Valls Hidalgo-Gato
    - Re: Maximal order subgroups of Z(m;*) with m=2^n and n>3., Keith Ramsay
  - Re: Maximal order subgroups of Z(m;*) with m=2^n and n>3., Rafael Valls Hidalgo-Gato
Eigenvalues of matrices in SL(n, Z), gowan4@xxxxxxxxxxx
- Re: Eigenvalues of matrices in SL(n, Z), Robin Chapman
  - Re: Eigenvalues of matrices in SL(n, Z), gowan4@xxxxxxxxxxx
This week in the mathematics arXiv (25 Apr - 29 Apr), Greg Kuperberg
This Week's Finds in Mathematical Physics (Week 215), John Baez
(Help)! Banach-Alaoglu theorem, gilevgi
- Re: (Help)! Banach-Alaoglu theorem, David C. Ullrich
non-Schauder bases, Florian Albers
Re: Lindeberg's Condition, oercim
" Cyclic Mobius Transform and roots of unity ", alain verghote
- Re: " Cyclic Mobius Transform and roots of unity ", Robin Chapman
- <Possible follow-ups>
- Re: " Cyclic Mobius Transform and roots of unity ", alain verghote
  - Re: " Cyclic Mobius Transform and roots of unity ", Robin Chapman
Quantum Gravity Seminar - Fall 2004, Week 7, John Baez
*Modern* algebraic geometry reference needed, David Roberts
- Re: *Modern* algebraic geometry reference needed, José Carlos Santos
- Re: *Modern* algebraic geometry reference needed, Paul Vojta
Banach * Algebra, singhal.sandhya@xxxxxxxxx
- Re: Banach * Algebra, Robert Israel
- Re: Banach * Algebra, Zdislav V. Kovarik
Re: Polynomial values free of prime divisors in prescribed congruence class, Don Coppersmith
Announcement:: Data Ecologies 05, Tim Boykett
Final CFP COMPLIFE 2005, allan tucker
Estimation of graph size by sampling?, William Bland
Polynomial values free of prime divisors in prescribed congruence classes, Paul Pollack
- <Possible follow-ups>
- Re: Polynomial values free of prime divisors in prescribed congruence classes, Don Coppersmith
Re: Quaternion logarithm and Riemann surfaces, Daniel Alayon Solarz
Re: hypergeometric function inequality, alexandru . lupas
Appell Polynomials, Alex.Lupas
- Re: Appell Polynomials, alexandru . lupas
Quantum Gravity Seminar - Fall 2004, Week 6, John Baez
Re: finite divisibility in probability, Herman Rubin
- <Possible follow-ups>
- Re: finite divisibility in probability, Michael J Hardy
  - Re: finite divisibility in probability, Herman Rubin
Re: Diffeomorphisms of Lie groups, David Roberts
- Re: Diffeomorphisms of Lie groups, Daniel Asimov
metrizable + zero-dimensional implies ultrametrizable ?, agelos
- Re: metrizable + zero-dimensional implies ultrametrizable ?, K. P. Hart
  - Re: metrizable + zero-dimensional implies ultrametrizable ?, Angelos Georgakopoulos
    - Re: metrizable + zero-dimensional implies ultrametrizable ?, Henno Brandsma