Message #2822
From: Roice Nelson <roice3@gmail.com>
Subject: Re: [MC4D] RE: New puzzles
Date: Mon, 18 Nov 2013 11:01:31 -0600
Hi Andrey,
Thanks for your observation about this. To get the "mathematically pure"
behavior you are wanting, we can add an additional identification to each
of these puzzles, one that is a rotation only (no reflections). We can
effectively get that by marking EdgeSet 0, and using the appropriate
EndRotation… 4 for {8,3} and 5 for {10,3}.
Because of the solutions listed in the table, there is the question of
whether to edit the existing puzzles or add new ones. The existing
definitions are valid configurations too, just with a different topology.
But they are similar enough that I’m thinking we wouldn’t want separate
definitions with only this difference.
If it is ok with you and others, I will just change the behavior of the
existing puzzles and not worry about the table, but if anyone disagrees
please let me know. I’ll push the change out at the same time as the
addition of all the new colorings you’ve been making.
Thanks again,
Roice
On Sun, Nov 17, 2013 at 3:22 PM, <andreyastrelin@yahoo.com> wrote:
>
>
> Roice,
>
> something is wrong with {10,3} 6C edge-rotated puzzles. When I select
> some edge, I expect that edges on opposite sides of its decagons will be
> selected too (because mathematically they are the same). But that edges
> remain non-selected. Same is true for vertex-rotated 6C, and also for
> {10,3} 12color.
>
> Is there something missing in puzzle description?
>
>
> I see the same in {8,3} 6C… and I don’t like it because there are
> solutions of these puzzles in the table (including some of my own ones)…
> Looks like we solved puzzles that are not as "mathematically pure" as they
> should be.
>
> Andrey
>
>
> —In 4d_cubing@yahoogroups.com, <andreyastrelin@…> wrote:
>
> {7,3} F0.4:0:1 F0.8:0:1 puzzle solved!
>
> It is hyperbolic equivalent of "gigaminx" - there are two layers of
> rotation at each face. Method of solving is almost the same: I start with
> "subedge" 1-color pieces, then combine pieces at each edge, solve puzzle
> like classic Klein Quadric and at last put "subcorners" to correct place.
> Most problems are with the second stage - there are 84 edges, and it’s very
> difficult to find parts of the same edge. I did it by collecting all edge
> parts with some color around one center and working with them (nice feeling
> - when you can freely rotate almost all faces and know that you will not
> spoil anything by that).
>
> Total twist count - 7558. Maximal operation length - 24 (for rotating 3
> corners on the third stage), other operations are not longer than 8 twists.
>
>
> Andrey
>
>
> —In 4d_cubing@yahoogroups.com, <roice3@…> wrote:
>
> Yeah, awesome!
>
> Looks like another crystal cube order may be happening :D
>
> (sent from my phone)
>
> On Nov 17, 2013, at 1:57 AM, Melinda Green <melinda@…> wrote:
>
> Nice.
>
> On 11/16/2013 7:02 PM, andreyastrelin@… wrote:
>
> 100 puzzles solved :)
>
>
> Andrey
>
>
> —In 4d_cubing@yahoogroups.com, <andreyastrelin@…> <andreyastrelin@…>wrote:
>
> {10,3} 18C F0.67:0:1 solved. 2680 twists.
>
> It was easy enough (if you know how to handle pieces with wrong
> orientation).
>
>
> Andrey
>
>
> —In 4D_Cubing@yahoogroups.com, <ed.baumann@…> <ed.baumann@…> wrote:
>
>
> I’am playing with MT hyp {10,3],18C F0:0:1(not F1:0:0). 300 twists for 4
> of the 18 colors so far. I don’t care for the number of twists and use 3
> cycles all the way even early in order to not disturb anything. I also
> complete colors before starting a new one. So this puzzle is not so hard to
> solve but funny.
>
> I will complete wiki for the 60 new puzzles and effectively aim for the
> new 50%.
>
> Ed
>
>
> —– Original Message —–
> *From:* andreyastrelin@…
> *To:* 4D_Cubing@yahoogroups.com
> *Sent:* Saturday, November 16, 2013 4:02 AM
> *Subject:* RE: Re: [MC4D] New puzzles
>
>
>
> May be, but in 120-Cell you have some search tools. In 36-color tiles
> there is many similar colors that makes difficult searching of the correct
> tile (even when you make one face white and all others dark). Pieces of
> F1:0:0 are very thin, most of them are close to boundary, so you don’t even
> see them all.
>
> Topology of {10,3}, 36C is not very easy (actually, I don’t understand it
> at all). When I look for the tile, I’m not always sure that my search
> covers whole fundamental area, so I can go over the same part again and
> again. And there are problems with finding a way for tiles that doesn’t
> disturb already solved parts.
>
>
> Andrey
>
>
> —In 4D_Cubing@yahoogroups.com, <melinda@…> <melinda@…> wrote:
>
> What about it is difficult? I would guess that more colors makes it more
> tedious but not harder, similar to 3^4 versus 120-Cell.
> -Melinda
>
> On 11/15/2013 1:44 PM, andreyastrelin@… wrote:
>
> I’ve solved {10,3}, 36C, F:0:0:1. It was difficult - it has too many
> colors. Total count is 2518 twists.
>
>
> Andrey
>
>
>
>
>
>
>