Travelling salesman problem is said to be practically "unsolvable" when number of nodes increase.
What other programming problems that are considered unsolvable?
Travelling salesman problem is said to be practically "unsolvable" when number of nodes increase. What other programming problems that are considered unsolvable? 


If you're looking for problems that are similar to the traveling salesman problem then I suggest you google for NPcomplete problems. This is a class of problems which doesn't have any know efficient solution, meaning an algorithm which computes the result in polynomial time. The intriguing thing with the class of NP problems is that noone has been able to show that any algorithm for solving them must take exponential time. It's perhaps the biggest unsolved question in computer science. It should be said though that it is often rather easy to find a solution to an NP problem, the tricky business is to find the optimal solution. Here's a list of other NPcomplete problems:
I could go on but I think most other problems I know are rather theoretical. You'd be better off googling by yourself. 


NP Complete questions are like that. 


The Halting Problem. Proven unsolvable. 


I find the knapsack problem particularly interesting as it's applicable to so many different domains. 


First, there's a big difference between unsolvable problems and problems that are difficult to solve. I know that sounds obvious, but a lot of people label hard problems (such as traveling salesman) as unsolvable when it's better to say that they're not solvable efficiently, i.e., in polynomial time. The best known unsolvable problem is the halting problem. See this page for more info. One common technique to show that a problem is unsolvable is to show that it's equivalent to the halting problem. 


Getting all three of: scope (features), timeframe (schedule), budget (resources—developers); instead of "pick two". 


Problems which are undecidable can not be solved with any algorithm. http://en.wikipedia.org/wiki/Undecidable%5Fproblem NP Complete problems can be solved in polynomial time nondeterministically. So they are indeed solvable, especially quickly on a quantum computer. Examples of undecidable problems include the Halting problem, which says: given an algorithm, decide if the algorithm eventually ends or continues on forever (eg: in an infinite loop). Alan Turing proved that the Halting problem is undecidable. 


creating an unbreakable DRM for non interactive content, where intended users still can use the content ... 


Getting programmers to document their code. 


As many people have already responded, the urproblem which is impossible to solve is the halting problem: write a program Why is the halting problem unsolvable? The proof is pretty simple and rather fun:
Assume that we can write the program
A brief explanation is in order. The next step is really cool: apply
Bummer! Both the alternatives ( There are many interesting problems which are uncomputable that derive from the halting problem. Some of my favorites come from compiler technology. For example: finding the smallest equivalent program. Another one is this: given that you've annotated your program with assertions, write a program which checks if any of the assertions will be violated at runtime. Such a program is sometimes called a model checker, and they can be really useful but they can never be complete, i.e. they sometimes have to answer "I don't know" when the problem gets too hard. 


Actually, NPcomplete problems, like the Traveling Salesman, are hard to solve in general, but a specific instance (or even most instances of them in some domain [eg compiling Haskell code]) may be easy to solve! There are a lot of problems that are, in theory, incredibly difficult – but because the difficult cases are very rare and rather contrived, they’re actually very easy to solve. Two examples of this that I find particularly interesting are both NP complete. Type checking in Haskell is one of them: in fact, the general type inference in Haskell is worse that NP complete: the type validation is NPcomplete; type inference is NPhard. But on real code, it’s effectively approximately linear. The other one is a logic problem called 3SAT. I once attended a great talk by a guy named Daniel Jackson, talking about a formal specification language he’d designed called Alloy. Alloy reduces its specification checking to 3SAT. Dan explained this saying: “The bad news is, analyzing Alloy specifications is 3SAT, so it’s exponential and NPcomplete. But the good news is that analyzing Alloy specifications is 3SAT, so we can solve it really quickly — MarkCC 


Trying to find a dev who is happy with the code they've written! 


Given two lists of words (a1, a2, .., an) and (b1, b2, .., bn), find a sequence of indices so that the concatenated words are equal. E.g. given the lists (1: a, 2: ab, 3: bba) and (1: baa, 2: aa, 3: bb), the sequence (3, 2, 3, 1) is a solution since bba+ab+bba+a = bb+aa+bb+baa. This problems looks like there should be an algorithm solving it (we're just talking about finding a sequence so that the strings match, nothing complex like Turing Machines is involved); but it's undecidable just like the halting problem. 


Not all programming languages can have solveable problems. For example I would rather do a regrep with perl then applescript. Most programming languages such as PHP have "bugs" that are unsolveable until someone at the php team fixes the php engine. He might mean that the code gets very very complicated and not worth completing the project because it takes too much time 


Internet Explorer 6 


Many answers have mentioned the Halting Problem. Other examples of unsolvable problems include languages not accepted by Turing machines. An example of such a language is the language of Turing Machines that do not accept their own encoding. 

