Naked Pairs Carry the Ball in Hard 134


A second Kampbelmann Hard is tough on paper, but  gives way routinely to a systematic bypass.

Here is the grid well into the bypass, with a large number of cells held in reserve by box filling naked pairs.

In the trace, we’re at value 9, just before r5[258] is resolved.

The rest is routine follow up.

Next week, the third and last Kampbelmann,  Hard 143, is harder, carrying into line marking, after giving an opportunity to show a box 3-fill (West) in the trace.

Posted in Uncategorized | Tagged , , | Leave a comment

A Hard, But Bypassed Kampbelmann 50


My Basic bypass starts with a resolved 4-fill. Did yours? 

The final collapse begins with the value 8 scan resolving the naked pair left from the resolution of 3-fill c2[258].

In the bypass trace, you can discover when the previous 8 clues were found.

That was a very productive 4-fill. Here is the collapse trace, and solution.

Next week, another Kampbelmann Hard, 134, offers a 3-fill among the givens. Take it first. If it does not resolve immediately, you at least get a fill string to help later.

Posted in Basic Solving Procedures | Tagged , | Leave a comment

Box Marking Subsets Maintain a CREATORS Collapse


Sysudoku weekly posts will soon be ending. This post may be the last one from the Akron Beacon Journal CREATORS series. In this one, Sysudoku box marking rescues us from a very stingy bypass, in ABJ Creators of 4/20/22.

The bypass trace, shows no 4-fills or 3-fills.  The two 4-fills created by the bypass, c2[1234] and c5[2578], are not marked on the trace or the grid because they don’t resolve immediately. The spotting check: in c2, values 578 that see two fill cells are not missing. In c5, 3 and 6 are not missing, and 8 does not see a third fill cell. Value 5 sees three fill cells in 5-fills r6 and r7, one short.

Box marking is almost complete, when the 8 slink joins the 2-slink in the North box for a naked pair N28 to start a collapse.

The collapse carries to the solution,

when NW3 creates the second naked pair NE36.

Weekly posts continue with three Basic level puzzles from Hard Sudoku for Adults, by Kampbelmann , dated without copyright notice April 2020, among the toughest I tried on paper without tracing and full 3 and 4 fill analysis.

Next is Kampbelmann 50, which can be solved in Sysudoku Basic bypass.

Posted in Basic Solving Procedures | Tagged , | Leave a comment

An ABJ Bronze With Many 4-Fill Bypass Traces


This post demonstrates the type of bypass you get by following up every resolvable 4-fill as it appears, in a less difficult puzzle. Bronze is the least difficult level announced by ABJ Creators. A similar solution path is started on any of four other 4-fills on the CREATORS Chrome of Sunday, April 3, 2022 givens grid, that immediately resolve.

On the 4-fill r1[2479], NW2 and NW4 see two free cells in r1, and E4 sees a third, placing NE4 in r1c7. Now on the trace, you can mark the 3-fill r1[279] left in r1, or be assured that the trace reader will note that SW7 sees a second 7 left in r1, placing NW7. That leaves two r1 cells for 2 and 9 and NW2 sees one of them, placing both values. The same effects list, in a different order, happens if you notice the 7 placement first.

That’s the way it goes.  It’s easier to check for a resolution of a 4-fill before entering it in the trace. Just check the clues in boxes with two free cells for missing values. Follow up on the missing value by checking for a third free cell seeing it.  A hit signals a resolution. It’s even easier with a 3-cell box. Just place the missing value in the outside cell.

Can you use the missing value rule to spot the other 4-fills that start the bypass with a resolution? You can compare your survey results with the full report at the end of this post.

In the final grid the pencil mark values were placed as effects, but were never used as causes, so they represent an over-supply of information for the solution.

This is how the other four 4-fills start the trace.

Next week, diligent spotting yields no  bypass 4-fills and there is not much of anything else, but box marking brings in the solution.

Posted in Basic Solving Procedures | Tagged | Leave a comment

Backing up to a 5-fill


Here is the Akron Beacon Journal CREATORS of 3/30/22 at the end of tracing the follow up of a 5-fill. Scanning for 5-fills is not productive. Too many, and they almost always fail.

But this time, 4 of the 5 free cells of c7 see a given 2. It’s a 5-fill with a clue. From here at C5, the solution places itself.

The follow up trace has three more 4-fills and five resolved 3-fills.

Next week’s  ABJ Creators Gold gives a choice of 4-fills for a bypass solution. We might not pick the same one.

Posted in Basic Solving Procedures | Tagged | Leave a comment

Three Ways to Bypass an ABJ CREATORS


The second Akron Beacon Journal CREATORS of 3/15/22 Sudoku turned out to be a good one for comparing Sysudoku bypass solving without 3,4-fills, with 3-fills only, and with every resolvable 4-fill. Scroll back to see the givens grid above.

My bypass trace without fills,  goes through values 1 through 7 with little follow through. Then the action is in values 8 and 9.

All three comparison traces reach the solution shown later.

Want to spot the hidden dublex Chdx9 that begins the last leg? If you played it out and are into 3-fills, you might have noticed how many you were passing up.

With 3-fills, the solution is reached on one value, 3. It’s interesting how 3 – 9 clues and subsets generated by dublexes and cross hatches are now produced by 3-fills. This shows how 3-fills add  basic solution pathways, and why harder puzzles provide fewer 3-fills.

The 3-fill trace goes on to the final solution.

As you might expect, 4-fills add more pathways to the basic solution. Since 4-fills resolve less frequently, I normally include a 4-fill in the trace only when it immediately resolves. Most of these occur because a missing value sees two or three 4-fill cells in its box. You will probably spot the exceptional case of three cells in separate boxes seeing the same value as you look for the missing value confirming the normal case.

You could do otherwise, but I normally resolve givens 3 and 4 fills before starting the 1 – 9 value list. It’s because n-fill follow up is a more systematic procedure, requiring less searching. Here, as in the all 3-fill case, we don’t get around to that list.

All three traces end with the same candidate combinations that account for the difficulty of the puzzle. The 3-fill trace ends on a 3 value leg, but both the no n-fill and 4-fill end with the same hidden dublex.

My problem with doing 3 and 4-fills exhaustively is overlooking the start of a new one. I’ve lost a lot of time going back to overlooked 3 and 4-fills on blog puzzles to be published. When you this happens in ordinary solving, you very seldom need to go back looking for an extra solution path.  Unless, of course, your oversight is caught by a fellow Sysudokie you compete with by sharing traces.

Coming next in this 4-fill clinic is Akron Beacon Journal Gold CREATORS of 3/30/22. Starting off normally in the values list, a clue revealing a 4-fill is actually a missing value in a 5-fill that resolves to the 4-fill. Actually looking for 5-fills isn’t worth the time.

Posted in Basic Solving Procedures | Tagged , , | Leave a comment

The First Beacon Journal Gold


 In the first CREATORS Gold of 3/12/22, a 4-fill created by the third clue begins a long follow up leg through a second 4-fill. A hidden dublex helps on E4. The bypass trace jumps back to continue effects lists four times.

Here’s how it looks at W5, just before several naked pairs are resolved to fill out the solution.

The BJ Gold of 3/12/22 is solved in the bypass with 3-fills only. It looks easier.

This suggests that exhaustive 4-fill analysis be deferred until 3-fills only fails. But even then, there’s no need to pass up the easily spotted placements some 4-fills provide.

Next week, the second Beacon Journal Gold of 3/15/22 falls in the bypass three ways: without 3 or 4-fills, with 3-fills only, and with 4 and 3-fills. I had to go back and correct oversights over and over, so I probably missed a few. Here’s your chance to beat the blog.

Posted in Basic Solving Procedures | Tagged , , , | Leave a comment

A Hidden Triple From Hidden Logic


Hidden pairs are rare, but hidden subsets of n > 2 are rarer still. This updated solution of Royle 17-13727, a puzzle from a large collection of puzzles of 17 givens, was an example in The Hidden Logic of Sudoku by Denis Berthier. The solution was posted November 2016 in a review of this book, and is updated here to illustrate another way that hidden subsets can arise. The update was needed because the original post was before 4-fills were normally used in Sysudoku Basic.

Here is the grid of Royle 17-13727 after the bypass creates and resolves two 4-fills, placing two naked pairs in the East box.

Follow the basic trace to see how useful the 4-fills are.

A very unpromising line marking is cut short on the second line, a 5-fill.

At that point, row 1 and column 7 demonstrate four values 3, 4, 7, and 9 in four cells of the NE box, a naked quad. The 3 NE free cells remaining must place 5, 6 and 8.

It’s a hidden triple, in that no candidates of other values can be added to those three cells in line marking. The triple confines 7 to r1, a boxline bringing NW4.

Here’s the grid a few steps into the collapse. The box slinks created along the way are included in the trace, marked with “m”.  A follow up preserving every option requires care to avoid treating a line as fully marked when it is not.

Sysudoku will soon be in page mode. In this mode, weekly posting of new puzzles is suspended. The home page will be a changing report on current updates and offer a brief guide to site features and navigation options. Permanent updating Sysudoku pages will be in The Guide, the About page, and other menu items. Over 500 posted posts will remain accessible by date from the monthly archives, indexed by collection review, title and subject tags. The most recently posted Sudoku will be accessible by simply scrolling back to them.

Weekly posted puzzles will end with several basic level puzzles selected from a series of puzzles that follows the Dave Green Conceptis series in my newspaper, the Akron Beacon Journal. The series is named SUDOKU CREATORS in the ABJ. The puzzles  alternate  with three levels of increasing rank of difficulty labeled as Bronze, Silver and Gold. Those selected for these ending posts are Gold level and compare in difficulty to the 4-star Dave Green puzzles found throughout the blog. I say 4-star, because the CREATORS Golds consistently solve in the bypass without requiring box and line fill stages, as many Dave Green 5-stars do.

To match your basic traces with mine, take maximum advantage of 4-fills, ignoring those that fail to immediately resolve. The first of these appeared In the ABJ March 12, 2022. Writing a trace and listing the 3 and 4 fills is a good way to keep up with their entangled effects.

Posted in Basic Solving Procedures | Tagged , | 1 Comment

Sysudoku Basic Subsets in a Sunday 5-Star


In this post, a Dave Green Sunday 5-star illustrates how naked and hidden subsets are spotted in Sysudoku Basic, a 3-stage process to identify candidates, and solve many Sudoku puzzles in the process.    Sysudoku Basic finds clues and subsets while accumulating candidates. Many solvers and most Sudoku literature use the keypad style of representing candidates, and a mechanical process that generates all of the candidates permitted by the given clues before any solving begins .

In this post, a Dave Green Sunday 5-star illustrates how naked and hidden subsets are spotted in Sysudoku Basic, a 3-stage process to identify candidates, and solve many Sudoku puzzles in the process.    Sysudoku Basic finds clues and subsets while accumulating candidates. Many solvers and most Sudoku literature use the keypad style of representing candidates, and a mechanical process that generates all of the candidates permitted by the given clues before any solving begins .

In this post, a Dave Green Sunday 5-star illustrates how naked and hidden subsets are spotted in Sysudoku Basic, a 3-stage process to identify candidates, and solve many Sudoku puzzles in the process.    Sysudoku Basic finds clues and subsets while accumulating candidates. Many solvers and most Sudoku literature use the keypad style of representing candidates, and a mechanical process that generates all of the candidates permitted by the given clues before any solving begins.

The purpose of Sysudoku Basic is to identify clues, subsets and strong links (slinks) and all candidates consistent with them, without generating many candidates that are eliminated before they contribute to solving.

A strong link is a pair of candidates, which includes at least one true candidate. The first stage of Sysudoku Basic is the Bypass, so called because it records on the grid along with clues, only the candidates of subsets. Strong links are recorded in a two further stages, box marking and line marking.

Here is the general definition of a subset:

How can a set of n values in a set of n cells be known to be the solution values? In a naked subset, there are no other values in these n cells. A single candidate of each value must eventually be placed in each cell. Candidates of these values in the line or box outside the subset are removed.

In the hidden subset n values in a box or line are found to be confined to n cells. Each of these cells will eventually claim one of these values, so candidates of other values can be removed from the confining cells.

As to singles, a naked single is a cell with a single value in it.  A hidden single is the only cell in the house with the value in it. The keypad number scanned grid is great for spotting singles. But in Sysudoku Basic, we get a lot farther, while looking for clues, not singles.   Let’s just do the bypass and see how the subsets show up.

Here is the grid after the bypass. Two 4-fills occurred and one was resolved. In the bypass, we’re into clue patterns, not candidate patterns.   Of the 10 clues found, there was one naked single and five hidden singles.

In the keypad grid, see if you can use the candidates to find the naked single and hidden singles. In the bypass, we don’t look for them. It’s not the right time.

As it happens, an advanced technique does begin here, showing how the uncluttered basic grid supports more than basic. As you mark the r6 4-fill, you might notice that C5 and SW5 leave only the same two columns for 5 in r1. That establishes a 5-wing in r1 and r6.

In the bypass trace, we put the 5-fill on the top line. It’s there to account for the 5-wing. Note how a subset pair (a subset with n =2) is marked in the trace.

The red symbols mark the  5-wing in r1 and r6. The wing will remove 5 candidates in c3 and c8, as the rows are marked.  In the bypass and box marking, how are box, row and column slink partner candidates distinguished?

The box marking trace lists the boxes containing a slink for each value. A box slink is exactly two candidates of a value in a box, a strong link. The list includes aligned triples, marked by “t” after the box name. Slinks are listed as effects, when they are caused by another slink.

A hidden pair 56 occurs in r1 above, when 6 is limited, along with 5, to the same two cells in r1. It’s a “hidden” pair because these two cells are reserved for 5 and 6. When r1 is marked, any other candidates, like the number scanned 1, 3 and 7 candidates on the keypad grid above, will be removed.

In line marking, the lines with fewer unfilled cells go first. Filling a line can effect other lines, changing the order. The list starts with 3 and 4 fills, then comes  r1, and a naked triple.

After the ouside 1,3,7 candidates, of the hidden pair 56 are removed,  the naked triple subset becomes obvious. As other rows are marked, no 5 candidates will be added to c3 and c8.

As lines and boxes are covered in line marking, ‘look for subsets as we begin to see all candidates in each line and box. We watch the values smaller in number. Naked subsets are the more obvious.

When we get to r2, the first 6-fill, you probably saw the naked triple 137 as soon as the line was filled. But a hidden is there as well. Let’s consider how to find them, based on this example.

For naked subsets, look for cells containing the same values. For hidden subsets, look for values limited to fewer cells. Here’s a definition designed for finding them.

The keyword is “confined”. We found the r1 hidden pair when we knew 5’s were confined to columns 3 and 8, and we realized that 6 in r1 was confined to the same 2 cells. In r2, we see the two values 2 and 4 in only two cells for a  hidden pair.

There is another hidden triple in r2, but the hidden pair 24 in r23 and r25 eliminates additional candidate 5r23 for the clue NE5, which destroys the 5-wing, but adds two more 5-clues. .We picture subsets by curves surrounding the candidates and diamonds around eliminations.

The collapse :

This post concludes the series of Dave Green Conceptis puzzles illustrating techniques in recent Sysudoku Basic.

We’ll follow with a few basic level puzzles from a new series replacing the Dave Green Conceptis puzzles in my newspaper, the Akron Beacon Journal.

But first, next post is an updated basic solving of Royle 17-13727 earlier posted 11/15/2016. You can look that post up by date by the monthly archive list on the right. The post next week features its 4-fill resolutions and its box hidden triple, and illustrates looking up a puzzle by subject tag.

As to 4-fills, I went back to the KrazyDad Insane review of a very tough collection which was updated before I used 4-fills extensively, to see if 4-fills would make a decisive difference. There was not one resolvable 4-fill in the review.

If you want to look up a collection review in on the monthly archives list, go to the Titles page and slide right onto the collections titles for post titles with monthly archive dates. Try it out. You might be surprised.

Posted in Basic Solving Procedures, Green, Puzzle Reviews | Tagged , , | Leave a comment

Dave’s Octuplet 


In this post, 3-fills leave a near solution in the bypass, with an entirely blank box. Box marking resolves it systematically.

Seeing the four 5-fills and box corner candidates, you might suspect that this is a follow up on the 4-star of the last post. But really, you should ignore the 5-fills until you’ve rung out the 3-fills.

That goes swiftly with both 3-fills resolved and the bypass ending in a near collapse. Except for the Center box.

The bypass trace shows what it takes to get there.

Box marking does the walls and the C box. Whenever you get slinks of more than a few values in a unit, start counting values and covering cells.  You may spot a subset. Here,  8 values slink into 8 C cells, a naked octuplet.  But that also means 3, the missing value, must be placed in r6c6.

Everything then falls into place.

Next week, we conclude this series of Dave Green basic level Sudoku with the Sunday 5-star of 10/3/21, which illustrates the essential facts about hidden subsets. Try it out beforehand.

Posted in Basic Solving Procedures, Gould, Puzzle Reviews | Tagged , , , , | Leave a comment