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[Earl]

The March 15 DB is a bit challenging. I had to use a six-step xy-chain to eliminate the 3 in R3C1. Any sophisticated solutions?


Earl

[keith]

Basics get you to here:

[Marty R.]

After taking out a 6 to break up the DP in the 36 UR, I didn't spot anything, but it succumbs pretty easily to a Medusa wrap.

[Asellus]

First just a comment on Keith's Medusa: Those <3> and <8> eliminations are standard Medusa traps.

Rather than Medusa after that XY-Wing, I started looking directly for AIC possibilities. It didn't take long to find a loop based largely on an XY Chain. Consider the 6-cell XY Chain from r3c6 to r9c5 via r3, c1 and r9. It "starts" with <8> and "ends" with <3>. Due to the <7> strong link in b8, we can extend that end to <7> in r7c6.

Now, either r3c6 is <8> or <3>. If <3>, then the chain says r7c6 is <7>, so r4c6 would have to be <8>. Thus, the <8>s in r34c6 are strongly linked and the other <8>s in c6 are eliminated.

But, this isn't all. If I'm not mistaken, the fact that that alternate <3> in r3c6 is involved together with the r7c6 <7> in determining the <8> in r4c6 in the "r3c6 is not <8>" case means that this is a branched AIC that forms a continuous loop. Thus, the <3>s in r3c6 are also strongly linked, eliminating <3> from r1c6 and <7> from r4c6 and solving the puzzle. (If a branched AIC continuous loop is not valid and I was just lucky, I trust someone will post and let me know.)

Note that this AIC loop did not depend upon that first XY Wing. So, it could be considered a one-step solution.

For those interested, this could be expressed in Eureka as:

[ravel]

[Victor]

Earl asked: