Why can't a computer program be proven just as a mathematical statement can? A mathematical proof is built up on other proofs, which are built up from yet more proofs and on down to axioms - those …

So I saw this question and was curious as to what the Pumping Lemma was (Wikipedia wasn't much help). I understand that its basically a theoretical proof that must be true in order for a language to …

When we start getting into algorithm design and more discrete computer science topics, we end up having to prove things all of the time. Every time I've seen somebody ask how to become really good at …

When writing a mathematical proof, one goal is to continue compressing the proof. The proof gets more elegant but not necessarily more readable. Compression translates to better understanding, as …

Does anyone know any examples of the following? Proof developments about regular expressions (possibly extended with backreferences) in proof assistants (such as Coq). Programs in dependently-typed …

Multithread algorithms are notably hard to design/debug/prove. Dekker's algorithm is a prime example of how hard it can be to design a correct synchronized algorithm. Tanenbaum's Modern operating …

Martin Fowler has a Money class that has a money allocation routine. This routine allocates money according to a given list of ratios without losing any value through rounding. It spreads any …

Does a general proof exist for the equivalence of two (deterministic) finite state machines that always takes finite time? That is, given two FSMs, can you prove that given the same inputs they will …

How does one go about determining the height of a recursion tree, built when dealing with recurrence run-times? How does it differ from determining the height of a regular tree? edit: sorry, i …

Does anybody know how to prove that if two binary trees have the same inorder and preorder traversals, then they are identical? (perhaps by showing that you can't have two different binary trees with …

How does one prove (forall x, P x /\ Q x) -> (forall x, P x) in Coq? Been trying for hours and can't figure out how to break down the antecedent to something that Coq can digest. (I'm a newb, …

I'm trying out Coq, but I'm not completely sure what I'm doing. Is: Theorem new_theorem : forall x, P:Prop /\ Q:Prop Equivalent to: Ax ( P(x) and Q(x) ) (where A is supposed to be the universal …

If T is a balanced BST with n elements, L its left subtree and R its right one, how can I prove that its depth is less than or equal to 2log(n) + 1? There is a proof by induction which I have but I …

I have a computer program that reads in an array of chars that operands and operators written in postfix notation. The program then scans through the array works out the result by using a stack as …

Prove the following facts by induction on n. Let G be an undirected simple graph with n vertices and m edges. a) if G is connected, then m >= n − 1 b) if G is a tree, then m = n − 1 im not really too …