March 2004 Archives by author

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Starting: Mon Mar 1 03:31:42 CET 2004
Ending: Wed Mar 31 17:45:11 CEST 2004
Messages: 112

• puzzle   Meeussen Wouter (bkarnd)
• puzzle   Meeussen Wouter (bkarnd)
• A078039 revisited   Meeussen Wouter (bkarnd)
• No subject   Mohammed BOUAYOUN
• Another Generalized wilson theorem   Mohammed BOUAYOUN
• Rép. : Re: Another Generalized wilson theorem   Mohammed BOUAYOUN
• factoring large integers   Thomas Baruchel
• [On the importance of sequences]   Christian G. Bower
• hypergraph enumeration?   Edwin Clark
• [math-fun] some exact formulas for integer sequences,   Emeric Deutsch
• Exact formulas for integer sequences   Olivier Gerard
• A078039 revisited   Dion Gijswijt
• In One Sequence Or Another   Henry Gould
• m^j + (m+1)^k = prime   Richard Guy
• Sequential Squares -- A005842   Richard Guy
• A simple inequality   Richard Guy
• m^j + (m+1)^k = prime   Richard Guy
• Elliptic Convolution Identity   Paul D. Hanna
• Product-Over-Integers Expansion Of Real   Hans Havermann
• On the importance of sequences   Ed Pegg Jr
• Sequential Squares -- A005842   Ed Pegg Jr
• Sequential Squares -- A005842   Ed Pegg Jr
• Sequential Squares -- A005842   Ed Pegg Jr
• complementary sequences, triangular numbers, Fibonacci numbers   Kimberling, Clark
• PartitionsP[n + 1]*PartitionsP[n]   Marc LeBrun
• In One Sequence Or Another (counter-intuitive?)   Marc LeBrun
• In One Sequence Or Another (Non-Fibonacci)   Marc LeBrun
• relation between A002981,A090660,A002982,A090661   Karima MOUSSAOUI
• Sigma_2(n)   Karima MOUSSAOUI
• m^j + (m+1)^k = prime   Karima MOUSSAOUI
• Correction for A052944   Pieter Moree
• Citing sequences (was zeta(r)^zeta(r))   Pfoertner, Hugo
• Nice example for superseeker, Collatz conjecture   Pfoertner, Hugo
• Nice example for superseeker, Collatz conjecture   Pfoertner, Hugo
• UO-Sigma PN   Pfoertner, Hugo
• factoring large integers   Pfoertner, Hugo
• m^j + (m+1)^k = prime   Pfoertner, Hugo
• m^j + (m+1)^k = prime   Pfoertner, Hugo
• On the importance of sequences   Leroy Quet
• Some Sum-Of-Sum Congruences   Leroy Quet
• Pizza-Cutting With Circular Arcs   Leroy Quet
• Farideh's 2 replies to my sequences   Leroy Quet
• an integer-analog of ln(m!)   Leroy Quet
• Harmonic-Number-Related Divisibility   Leroy Quet
• Harmonic-Number-Related Divisibility   Leroy Quet
• Harmonic-Number-Related Divisibility   Leroy Quet
• zeta(r)^zeta(r)   Leroy Quet
• zeta(r)^zeta(r)   Leroy Quet
• Number-Of-Iteration Sequences   Leroy Quet
• Product-Over-Integers Expansion Of Real   Leroy Quet
• Product-Over-Integers Expansion Of Real   Leroy Quet
• In One Sequence Or Another (counter-intuitive?)   Leroy Quet
• In One Sequence Or Another (counter-intuitive?)   Leroy Quet
• In One Sequence Or Another (counter-intuitive?)   Leroy Quet
• In One Sequence Or Another   Leroy Quet
• Partitions Derived From Prime-Subset   Leroy Quet
• In One Sequence Or Another   Leroy Quet
• m^j + (m+1)^k = prime   Leroy Quet
• m^j + (m+1)^k = prime   Leroy Quet
• counting problem...   Don Reble
• What next in 0,1,6,25,96,361,1350,5041?   Don Reble
• Correction for A052944   Rainer Rosenthal
• Nice Recurrence and Explicit Formula for A001110 (Square Triangular Numbers)   Rainer Rosenthal
• A001110 again   Rainer Rosenthal
• What next in 0,1,6,25,96,361,1350,5041?   Rainer Rosenthal
• What next in 0,1,6,25,96,361,1350,5041?   Rainer Rosenthal
• increasing or decreasing subsequence   Henry in Rotherhithe
• What next in 0,1,6,25,96,361,1350,5041?   Henry in Rotherhithe
• Your favourite instructive papers in combinatorics?   Gordon Royle
• counting problem...   Gordon Royle
• counting problem   Gordon Royle
• hypergraph enumeration?   Gordon Royle
• More on hypergraph enumeration..   Gordon Royle
• Sequential Squares -- A005842   Gordon Royle
• Your favourite instructive papers in combinatorics   Frank Ruskey
• files troubles with OEIS   N. J. A. Sloane
• exact formulas for Motzkin numbers   N. J. A. Sloane
• Sequential Squares -- A005842   N. J. A. Sloane
• Some Sum-Of-Sum Congruences   Ralf Stephan
• puzzle   Ralf Stephan
• Harmonic-Number-Related Divisibility   Ralf Stephan
• Harmonic-Number-Related Divisibility   Ralf Stephan
• Harmonic-Number-Related Divisibility   Ralf Stephan
• What next in 0,1,6,25,96,361,1350,5041?   Ralf Stephan
• In One Sequence Or Another (Non-Fibonacci)   Ralf Stephan
• In One Sequence Or Another (Non-Fibonacci)   Ralf Stephan
• factoring large integers   David Wasserman
• closed-form expression for InverseErf[1/2] = A069286 ?   Eric W. Weisstein
• In-situ transposition of m X n matrix   all at abouthugo.de
• MM Problem 1654   all at abouthugo.de
• MM Problem 1654   all at abouthugo.de
• What next in 0,1,6,25,96,361,1350,5041?   benoit
• What next in 0,1,6,25,96,361,1350,5041?   benoit
• following Rainer Rosenthal   benoit
• In One Sequence Or Another (Non-Fibonacci)   benoit
• Harmonic-Number-Related Divisibility   bouyao
• Harmonic-Number-Related Divisibility   bouyao
• increasing or decreasing subsequence   bouyao
• increasing or decreasing subsequence   bouyao
• puzzle   hv at crypt.org
• from 2^n to catalan(n), the hard way 'round   wouter meeussen
• Corrected On sequence nXn where x equal 09,18,27,36,45,54,63,72,81,90   f.firoozbakht at sci.ui.ac.ir
• Indexes' Difference Divides Sum Of 2 Terms   f.firoozbakht at sci.ui.ac.ir
• Sequence: (m-k) divides a(m)*a(k)   f.firoozbakht at sci.ui.ac.ir
• Another Generalized wilson theorem   f.firoozbakht at sci.ui.ac.ir
• m^j + (m+1)^k = prime   f.firoozbakht at sci.ui.ac.ir
• A simple inequality   santi_spadaro at virgilio.it
• UO-Sigma   y.kohmoto
• Iteration of Cof_p(Sigma(m))   y.kohmoto
• UO-Sigma PN   y.kohmoto
• UO-Sigma PN   y.kohmoto
• Sigma_2(n)   y.kohmoto

Last message date: Wed Mar 31 17:45:11 CEST 2004
Archived on: Sun Jan 15 12:27:34 CET 2023

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