A mathematical proof is any mathematical argument which demonstrates the truth of a mathematical statement. Informal proofs are typically rendered in natural language and are held true by consensus; formal proofs are typically rendered symbolically and can be checked mechanically. "Proofs" can be ...

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coq how to use apply to “extract” a implication

sorry for the weird title, I do not know how to put it in words. I'll illustrate using an example. H : R -> P -> Q H0 : R Subgoal: (Q -> P) \ / (P -> Q) so my question is how do I extract out ...
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1answer
40 views

OCaml Proof by Structural Induction

Given the following function: let rec foo l1 l2 = match (l1,l2) with ([],ys) -> ys | (x::xs,ys) -> foo xs (x::ys));; Prove the following property: foo (foo xs ys) zs = foo ys (xs@zs) So ...
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33 views

Why pumping lemma for CFG doesn't work

Language: {(a^i)(b^j)(c^k)(d^l) : i = 0 or j = k = l} We take word w = a^0 b^n c^n d^n Which obviously belongs to the language because j = k = l w = uvxyz |vxy| <= n |vy| > 1 and now v ...
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How do I prove that double bubble sort is Big-Theta(n^2)?

Double bubble sort is defined as : every other pass through the data brings down elements from last to first, instead of the normal way of getting an element from first to last. I actually have no ...
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2answers
71 views

Proof: Check if two integer arrays are permutations of each other using linear time and constant space

I was interested in creating a simple array problem with running time and space constraints. It seems that I have found a solution to my problem. Please read the initial description comment of the ...
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1answer
24 views

Idris interactive prover won't perform rewrite on an assumption

(I know the interactive prover is deprecated now in favour of elaborator reflection, but I've not got around to updating yet. Soon!) I have the following assumptions currently available in the prover ...
2
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1answer
68 views

Prove that f(n) = Θ(g(n)) iff g(n) = Θ(f(n))

I have been given the problem: f(n) are asymptotically positive functions. Prove f(n) = Θ(g(n)) iff g(n) = Θ(f(n)). Everything I have found points to this statement being invalid. For example an ...
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3answers
33 views

How to prove a prove definition in Coq

I am currently working with Coq and I am encountering a problem that I don't know how to solve. Let's say we are working with a given type, I'll take nat for the example, and I want to use a function ...
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1answer
18 views

What is a “roundabout proof” in Propositions as Types by P. Wadler?

In Propositions as Types, it is written: In 1935, at the age of 25, Gentzen15 introduced not one but two new formulations of logic—natural deduction and sequent calculus—that became ...
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29 views

Algorithm Proofs

In this case, f(n), g(n), and h(n) are asymptotically positive functions, which means that there exists an N such that f(n)/g(n)/h(n) > 0, for all n >= N. Given that: f(n) = Θ(g(n)) g(n) = Θ(h(n)) ...
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4answers
50 views

Prove that a graph is bipartite

Given a graph G in which every edge connects an even degree node with an odd degree node. How can i prove that the graph is bipartite? Thanks in advance
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Teaching proofs in Automata Theory

In most of the books related to Theory of Automata, I have encountered mathematical proofs where discrete mathematics is a pre-requisite. Is it necessary to teach proofs in Automata Theory subject?
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How do I understand the proof from CLRS appendix B.5 Trees. (Theorem B2) 3 =>4

How do I understand the proof from CLRS appendix B.5 Trees. (Theorem B2) 3 =>4. Can someone just tell me in few sentences what we do here?
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14 views

Formal verification using denotational semantics?

This might go to cs or cstheory stack exchange, but I have seen the most questions tagged with formal-verification here. Is there extensive literature on using denotational semantics for program ...
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1answer
28 views

Given a graph G = (V, E) prove e <= n(n-1)/2 for all n

I'm trying to figure out to solve this problem: Given a graph G = (V, E) prove e <= n(n-1)/2 for all n, where e is the number of edges and n is the number of vertices. I'm thinking that I should ...
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2answers
43 views

Prove that p^3 - 1 is a composite number given P > 2 [closed]

In order to prove a number composite I have to prove that p^3 - 1 = ab With a and b not being 1 and itself. Its given that p > 2. I factor it out with differences of squares p^3 - 1 => (p - 1)(p^2 + ...
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2answers
71 views

arrange numbers to form largest number - proof of algorithm

There is well known algorithmic problem, given array of numbers e.g. [1, 20, 3, 14] arrange numbers in such a way that they form biggest number possible, in this case 320141. There is plenty of ...
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2answers
49 views

Proof automation in Coq how to factorize a proof

I'm following the book Software Foundation and I'm on the chapter named "Imp". The authors expose a small language that is the following : Inductive aexp : Type := | ANum : nat -> aexp | ...
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2answers
74 views

Proof with false hypothesis in Isabelle/HOL Isar

I am trying to prove a lemma which in a certain part has a false hypothesis. In Coq I used to write "congruence" and it would get rid of the goal. However, I am not sure how to proceed in Isabelle ...
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1answer
22 views

Universal Quantification in Isabelle/HOL

It has come to my attention that there are several ways to deal with universal quantification when working with Isabelle/HOL Isar. I am trying to write some proofs in a style that is suitable for ...
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1answer
46 views

Operator overloading in Isabelle

I want to use the nat type in Isabelle but I want to overload some existing definitions like for example addition. I wrote the following code: theory Prueba imports Main HOL begin primrec suma::"nat ...
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Finite Automata proof with matrix

NOTE: This is not a homework assignment. The professor mentioned this in class as an optional "fun" activity. Given an N∗N matrix which is initially colored all white, show that there exists some way ...
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3answers
51 views

What's the best way to write Mathematical Proofs on the web?

This question about displaying equations on the web is similar to what I'm asking but does not answer my question. It's about math. I'm extending that to proofs. This is a key difference because my ...
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1answer
37 views

Integral of a sign function proof

Can anyone please prove this expression below? I saw this in a paper and trying to see where it is coming from. integral(sign(A*w*cos(w*t+phi))*cos(w*t), t, 0, 2*pi/w) = 4/pi*cos(phi)
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1answer
72 views

Why does this SBV code stop before hitting the limit I set?

I have this theorem (not sure if that's the right word), and I want to get all the solutions. pairCube limit = do m <- natural exists "m" n <- natural exists "n" a <- natural ...
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58 views

How do I get symbolic square root and logarithm functions in SBV?

The only solution I can find is to do a square root approximation, but this doesn't work symbolically so I can't use it for proving.
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1answer
25 views

Proof from Axioms

Given the axioms Henry owns a bike Every bike owner loves racing No one who loves racing buys a scooter. Either Henry or Bob bought a scooter, which is named Bill Did Bob buy the scooter? This ...
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1answer
57 views

The intersection of two Turing-decidable languages is Turing-decidable

Prove the intersection of two Turing-decidable languages is Turing-decidable. (Given algorithms to decide each language, describe an algorithm to determine if a string belongs to the intersection.) I ...
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1answer
76 views

Can You Reduce K-Independent Set to 2-SAT

This is a homework question to start out. I just have some questions before I begin. Our problem is: "Reduce from k-Independent Set to 2−SAT as follows. Given a graph G with n vertices form n ...
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2answers
30 views

Not equal succesors in Coq

I am trying to prove the following lemma in Coq: Lemma not_eq_S2: forall m n, S m <> S n -> m <> n. It seems easy but I do not find how to finish the proof. Can anybody help me ...
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2answers
66 views

Prove length (h::l) = 1 + length l

I have trouble with these proofs that seem almost trivially obvious. For instance, in the inductive case if I assume the property in the title and I want to show: length (h'::h::l) = 1 + length ...
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15 views

Cannot rewrite subterm in Coq

I have a proof in Coq where one of the hypothesis is: H : m = pred q * n + (r + n) And I have a proven lemma which states: Lemma suma_conmutativa: forall m, forall n, m + n = n + m. Where + is ...
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1answer
30 views

How to prove this natural deduction?

I'm trying to prove this formula but its really hard.. Here is the formula: ¬∃x.(P(x)∧R(x)) Premisse ¬∃x.(S(x)∧¬R(x)) Premisse ∀x.(A(x)→P(x)) Premisse ∀x.(A(x)→S(x)) Conclusion I'm actual in this ...
3
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1answer
45 views

Proof by case analysis in Coq

I am trying to prove a Proposition about the following function: Program Fixpoint division (m:nat) (n:nat) {measure m} : nat := match lt_nat 0 n with | false => 0 | true => match leq_nat n ...
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41 views

Proving Gauss' theorem for nat in Coq

I'd like to prove Gauss' theorem for nat. In plain (non-precise) language it says: if a divides b*c and none of a's factors are in b then they must all be in c. Require Import NPeano. Theorem ...
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1answer
30 views

Coq calculational style biconditional chain

I am trying to prove a biconditional in Coq: P <-> Q And I wrote down a proof that has this structure: P <-> S <-> T <-> Q thus: P <-> Q How can I mimic this ...
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84 views

Prove that Bellman Ford maximises objective function

Prove that Bellman-Ford when applied to the constraint graph of a linear programming problem with constraints of the form Xj - Xi <= Wij maximizes the function X1 + ... + Xn subject to constraints ...
2
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1answer
30 views

Defining interval function in Coq

I am trying to define a function in Coq called interval that given two natural numbers computes the list of all natural numbers between these two. However my definition is not primitive-recursive. ...
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2answers
73 views

Explain why x == ~(~x + 1) + 1 (two's complement and back!)

As we all know usually negative numbers in memory represents as two's complement numbers like that from x to ~x + 1 and to get back we don't do the obvious thing like ~([~x + 1] - 1) but instead ...
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1answer
29 views

Proving the correctness of a program

The function recursively finds and returns the smallest element from a array that has integer elements Min(A, b, e) if (b=e) return A[b] m = (b+e)/2 // floor is taken x = Min(A, b, m) y = Min(A, ...
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66 views

How to prove that the NormalForm in a word rewrite system is Undecidable?

This is the definition of the NormalForm: NormalForm = {⟨R, w⟩ | There exists a sequence of rewrites of w that reaches a normal form} . Basically, there is a set of rules "R" that allows you to ...
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2answers
55 views

Well founded recursion in Coq

I am trying to write a function for computing natural division in Coq and I am having some trouble defining it since it is not structural recursion. My code is: Inductive N : Set := | O : N | S ...
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2answers
74 views

Minimum spanning tree 2- dimensional graph

This is my home work problem but i dont have any clue how to proceed with this A “geometric graph” is a special type of graph where the nodes are points on a 2- dimensional surface and edges are ...
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1answer
121 views

Derive relationship between sum of all edge weights and MST in a graph satisfying the triangle inequality

A weighted, undirected graph with n vertices and m edges is said to satisfy the triangle inequality if for every edge (u, v), the weight of (u, v) is less than or equal to the length of any other ...
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1answer
36 views

Failed to refine any pending goal

I am trying to prove a theorem in Isabelle and I am stuck in this step: theorem exists_prime_factor: " (n > Suc 0) ⟶ (∃xs::nat list. prod_list xs = n ∧ all_prime xs)" proof (induct n rule: ...
3
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1answer
32 views

Prove Logical Operations Using Inference Rules

Premise 1: p ∧ q Premise 2: q → r Premise 3: s → ¬r Premise 4: ¬r → ¬u Premise 5: t ∨ s Premise 6: t → ¬p ∨ U Prove: u ∧ q Does anybody know how to solve this proof using rules of inference? I ...
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1answer
208 views

Minimum spanning tree. unique min edge vs non unique proof

So I have an exercise that I should prove or disprove that: 1) if e is a minimum weight edge in the connected graph G such that not all edges are necessarily distinct, then every minimum spanning ...
3
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1answer
30 views

Prove that one hypothesis is negation of another in Coq

For example I have these two hypotheses (one is negation of other) H : forall e : R, e > 0 -> exists p : X, B e x p -> ~ F p H0 : exists e : R, e > 0 -> forall p : X, B e x p -> F p ...
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1answer
53 views

Proof of existence of prime factorization (Educational)

I am trying to write a proof of the existence of the prime factorization of numbers. It is meant to be educational, so every function is defined, we try not to use Isabelle built in functions. Here is ...
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1answer
42 views

Termination implies existence of normal form

I would like to prove that termination implies existence of normal form. These are my definitions: Section Forms. Require Import Classical_Prop. Require Import Classical_Pred_Type. Context {A : ...