The On-Line Encyclopedia of Integer Sequences (OEIS)

Revision History for A346124

(Bold, blue-underlined text is an addition; faded, red-underlined text is a ~~deletion~~.)
Showing entries 1-10 | older changes

A346124

Numbers m such that no self-avoiding walk of length m + 1 on the square lattice fits into the smallest circle that can enclose a walk of length m.
(history; published version)

#14 by Peter Luschny at Wed Aug 25 03:17:56 EDT 2021

STATUS

reviewed

approved

#13 by Joerg Arndt at Wed Aug 25 03:04:16 EDT 2021

STATUS

proposed

reviewed

#12 by Hugo Pfoertner at Tue Aug 24 15:33:42 EDT 2021

STATUS

editing

proposed

#11 by Hugo Pfoertner at Tue Aug 24 15:32:55 EDT 2021

CROSSREFS

Cf. A037245, A122224, A127399, A127400, A127401, A266549, A316194, A346993, A346994, A346995.

STATUS

approved

editing

#10 by Peter Luschny at Sun Aug 08 01:38:14 EDT 2021

STATUS

reviewed

approved

#9 by Joerg Arndt at Sun Aug 08 01:29:46 EDT 2021

STATUS

proposed

reviewed

#8 by Hugo Pfoertner at Sat Aug 07 15:54:20 EDT 2021

STATUS

editing

proposed

#7 by Hugo Pfoertner at Sat Aug 07 15:50:22 EDT 2021

CROSSREFS

The squared radii of the enclosing circles are a subset of A192493/A192494.

#6 by Hugo Pfoertner at Sat Aug 07 15:41:35 EDT 2021

DATA

1, 4, 6, 8, 12, 14, 15, 16, 18, 20, 21, 23, 24, 25, 26, 27, 28, 32, 34, 36, 38, 44, 46, 48, 52, 56, 58, 60

EXAMPLE

See link for illustrations of terms corresponding to diameters D < 78.085.

CROSSREFS

Cf. A037245, A122224, A127399, A127400, A127401, A266549, A316194, A346123, A346132.

Cf. A346123-A346132 similar to this sequence with other sets of turning angles.

STATUS

approved

editing

#5 by Susanna Cuyler at Sun Aug 01 16:41:14 EDT 2021

STATUS

proposed

approved