The On-Line Encyclopedia of Integer Sequences (OEIS)

Revision History for A015128 (Bold, blue-underlined text is an addition; faded, red-underlined text is a ~~deletion~~.)
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A015128

Number of overpartitions of n: an overpartition of n is an ordered sequence of nonincreasing integers that sum to n, where the first occurrence of each integer may be overlined.
(history; published version)

#263 by Michael De Vlieger at Mon Oct 14 14:31:27 EDT 2024

STATUS

reviewed

approved

#262 by Peter Luschny at Mon Oct 14 13:03:45 EDT 2024

STATUS

proposed

reviewed

Discussion

Mon Oct 14

14:16

Paul D. Hanna: OK - thanks

#261 by Stefano Spezia at Mon Oct 14 12:54:07 EDT 2024

STATUS

editing

proposed

#260 by Stefano Spezia at Mon Oct 14 12:52:58 EDT 2024

LINKS

Eric Weisstein's World of Mathematics, <a href="https://mathworld.wolfram.com/ModularEquation.html">Modular Equation</a>.

Weisstein, Eric W., <a href="https://mathworld.wolfram.com/ModularEquation.html">Modular Equation.</a> From MathWorld -- A Wolfram Web Resource. - Paul D. Hanna, Oct 14 2024

STATUS

proposed

editing

Discussion

Mon Oct 14

12:54

Stefano Spezia: Usually we do not sign links. Formatted link like the existing one

#259 by Paul D. Hanna at Mon Oct 14 11:09:37 EDT 2024

STATUS

editing

proposed

#258 by Paul D. Hanna at Mon Oct 14 11:09:32 EDT 2024

LINKS

Weisstein, Eric W., <a href="https://mathworld.wolfram.com/ModularEquation.html">Modular Equation.</a> From MathWorld -- A Wolfram Web Resource. - Paul D. Hanna, Oct 14 2024

#257 by Paul D. Hanna at Mon Oct 14 11:04:30 EDT 2024

FORMULA

G.f. A(q) satisfies (3*A(q)/A(q^9) - 1)^3 = 9*A(q)^4/A(q^3)^4 - 1. - Paul D. Hanna, Oct 14 2024

STATUS

approved

editing

#256 by Michael De Vlieger at Sat Sep 14 01:38:15 EDT 2024

STATUS

reviewed

approved

#255 by Michel Marcus at Fri Sep 13 16:59:23 EDT 2024

STATUS

proposed

reviewed

#254 by Stefano Spezia at Fri Sep 13 15:45:01 EDT 2024

STATUS

editing

proposed