Tagged Questions

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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Binary search tree prove number of leaves

I have to prove that in binary search tree, number of nodes with two children is one less than number of leaves. I found some proofs by induction on the internet, but I wanted to approach this problem ...
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Prove that all prefix sums are non negative

We have an array having n integers whose sum is non negative. I need to prove that there exists an index i, such that starting from i, all prefix sums are non negative, till we reach i again ...
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How to prove sset (cycle xs) = set xs

When working with Isabelle’s infinite stream data type, I need this obviously true lemma, but I am unable to figure out how to prove it (as I am not well versed with coinduction yet). How would I go ...
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Proof of Suffix tree root edges

I was wondering how to write a proof that the number of branches or root edges in a suffix tree are equal to the size of alphabet of the string S. Say if we have S = {aaabaac}, alphabet={a,b,c}, size ...
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A Paradox in graph theory?

I was reading minimum spanning trees in CLRS and came across the following corollary which is basis of algorithms to compute minimum spanning tree: Corollary 23.2 Let G = (V,E) be a ...
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Finding error in proof stating the language L = {0^(n)1^(n) | n>0} is a regular expression

Proof: Let M be the following NFA: Automata for L Now, if x is in L, then x = 0^(n)1^(n). Thus while processing x, M will start in state q0, loop in state q0 n times, then transition to state q1 on ...
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g-sorted-ness is not affected by later h-sorting : is proof correct?

Hypothesis : An array A is g-sorted. I.e. for all integers x and a specific integer g, A[x] < A[x+g] < A[x+2g] ... Now, if we h sort after copying it into array B, to achieve the condition : ...
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Proving commutativity of add, Take 2

This question is a follow up to the following question isabelle proving commutativity for add, my followup was too long to be a comment. The problem as stated was to show the commutativity of the add ...
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BST successor proof

I study CS in the university and I've got a question I'm having problem proving. Prove that the successor "Y" of node "X" on BST, when "X" doesn't have right son, is the lowest ancestor of "X" that ...
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Propositional Logic Formal Proof

I'm trying to formally prove the following equation, as practice ahead of my logic exam. However, I'm having a little difficulty working out the steps. Here are the rules that I'm using; A ∧ A ≡ A, ...
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How to implement mathematics induction on Haskell

data Nat = Zero | Succ Nat type Predicate = (Nat -> Bool) -- forAllNat p = (p n) for every finite defined n :: Nat implies :: Bool -> Bool -> Bool implies p q = (not p) || q basecase :: ...
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Proof n^2 - 4n = Big-Theta(2^n)

I should prove or disprove the equation n^2 - 4n = Big-Theta(2^n) As far as i know i need to prove the following two equations: f = O(g) g = O(f) I started to solve f = O(g) n^2 - 4n = c * ...
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Show a complete graph with n vertices, the weight of a MST is less than or equal to the min weight of cycle that passes through all vertices

I am really struggling with this proof and would really appreciate a detailed explanation: Show a complete graph with n vertices, the weight of a MST is less than or equal to the min weight of cycle ...
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Simplifying Boolean Exressions [closed]

I have constructed truth tables to prove that: ABC + ABC'+ AB'C A'BC = AB+AC+BC, but how do i prove it by simplifying the expression? I'm fairly new to boolean algebra and have tried to use the ...
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The number of connected (!) subgraphs is exponential?

i want to show that for an example graph family the nummer of connected subgraphs grows expnential with n. That is easy to show for a complete graph, because a complete graph has n(n-1)/2 = n over ...
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Linear Temporal Logic (LTL) questions

[] = always O = next ! = negation <> = eventually Wondering is it []<> is that equivalent to just []? Also having a hard time understanding how to distribute temporal logic. [][] ...
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Can theorems in coq (or in general) be proven without the use of previously proven lemmas?

Given that proofs in coq are simply highly complex functions that can be built in any of a variety of ways, it seems to make sense that there would exist a coq proof of every theorem that involves ...
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Can we show that finding the (1-D) closest pair has to be at least n log n?

How can we show that using comparison methods only, 1-D closest pair is Ω(n log n)? I think that the only reasonable way is to somehow show an equivalence to sorting, but I cannot see how. Can ...
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Proof by counterexample in Coq

After proving tens of lemmas in propositional and predicate calculus (some more challenging than others but generally still provable on an intro-apply-destruct autopilot) I hit one starting w/ ~forall ...
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Use semantics to prove that the postcondition is true following the execution of the program assuming the precondition is true

I am trying to study for a test in my programming language concepts class. I am trying to understand how to solve this problem. Our professor said we don't need to use formal notation to prove the ...
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Can a red node have just 1 black child in a red-black tree?

The rules for a Red-Black Tree: Every node is either red or black. The root is black. Every leaf (NIL) is black. If a node is red, then both its children are black. For each node, all simple paths ...
582 views

If two things are not not equal, are they equal?

If two values in Agda, or some other dependently typed language, you can prove that v₁ is not not equal to v₂, can you prove v₁ equals v₂? Like, is there a function of the type ((v₁ ≡ v₂ → ⊥) → ⊥) → ...
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Is there a tool to check proofs of haskell code properties?

There are ways (for example, https://jeltsch.wordpress.com/2012/04/30/dependently-typed-programming-and-theorem-proving-in-haskell/, PromotedDataKinds extension) to fake dependent types in haskell, ...
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Isabelle - Count occurences in a list

I am trying to count occurences in a list. I have defined the following function: fun count :: "'a ⇒ 'a list ⇒ nat" where "count x Nil = 0" | "count x (Cons y ys) = (if x=y then Suc (count x ys) ...
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Haskell: Is it true that function application distributes over list concatenation?

After reading this question: Functional proofs (Haskell) And after looking at the inductive proof of forall xs ys. length (xs ++ ys) = length xs + length ys from the Haskell School of Music (page ...
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Proof of optimal efficiency of A* Search

It is mentioned in Norvig's Artificial Intelligence that A* Search is optimally efficient. However, I could not figure out why nor find on the web the proof. Does anyone happen to have a proof?
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Proving a theorem about ordered lists

This should be a straight forward thing to prove, but I keep getting stuck. Would be grateful for help... Require Import Arith. Fixpoint At n (l:list nat) := match n with | 0 => match l ...
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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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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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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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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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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 ...
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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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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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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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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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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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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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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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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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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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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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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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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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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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What's the best way to write Mathematical Proofs on the web? [closed]

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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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)