dailysudoku.com

[Clement]

[JC Van Hay]

Hint : analysis of the puzzle from the 2 solutions of B3.

[arkietech]

[Clement]

[dongrave]

This puzzle seems like it's perfect to use to ask a few questions that I have about Sudoku chains and Eureka. Not too long ago I discovered what I've been referring to as 'Van Hay' chains. I've been calling them this because I learned about them from him and I don't know what they're really called. The solutions go as follows: A or B; if A then C; if B then C; therefore C. When I recently sent one of these solutions to Marty and asked him to represent it in Eureka, I was surprised to find that he transformed this 'double path' chain to one continuous one. Since then I've read that many Sudoku experts prefer chains that work in both directions over single direction chains and if that's true, then I'm thinking that they also must prefer single chains over these 'double path' ones.

Beginning with the diagram of either of the two solutions posted above, I discovered the following 'Van Hay' solution: r2c3 is 2 or 9; if it's 2, r9c3=2 so r9c5=2 so r13c5=9 so r3c6=7; if it's 9, then r2c9=5 so r5c9=9 so r5c6=5 so r3c6=7; therefore r3c6=7.

After looking at it for a while and thinking about how Marty represented my previous 'Van Hay' solution as a single chain, I realized that this one could also be represented as a single chain like: (7=9)r3c6-r13c5=r9c5-(9=2)r9c3-(2-9)r2c3-(9=5)r2c9-r5c9=r5c6 => r3c6=7 (contradiction).

Could one of you Eureka experts let me know if this expression is correct? You'll probably also notice that I shifted the starting point of this chain for
this chain. The reason was that I wasn't exactly sure how to represent the nodes at the very end of the this expression when they appeared in the middle of the chain. Could someone also show me how this chain would look if you shift the starting point to some other cell (like maybe r2c3?) Thanks in advance, Don.

[arkietech]

[dongrave]

Whoops! I knew that was strong link. I really need to be more careful. I see now that I also had a typo in my Van Hay solution ('if it's 2, r9c3=2' s.b. 'r9c3=9'). Thanks for the input Arkitech! (I think Marty has referred to you as Dan in previous posts.) I was really surprised at how little I was able to find on Eureka notation when I searched the internet. One link that I did find though had a great example of the type of chain that I'm not used to seeing. It was the following example that Marty posted a couple of years ago. He said that he got it from someone named Ted and I noticed that the discussion also included input from you, keith, and van hay.

[arkietech]

[dongrave]

[arkietech]

[dongrave]