We’re rewarding the question askers & reputations are being recalculated! Read more.

Questions tagged [proof]

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 valid or invalid; only the former kind constitutes actual proof, whereas the latter kind usually refers to a flawed attempt at proof.

Filter by
Sorted by
Tagged with
1
vote
2answers
44 views

How to prove `theorem : ¬ ⊤ ≡ ⊥` in Agda?

Following The Haskell Road to Logic, Maths and Programming, one can find p.48 Theorem 2.12.1 ¬ ⊤ ≡ ⊥ and its converse ¬ ⊥ ≡ ⊤ The book uses Haskell and assumes ⊥ = False ⊤ = True which would yield ...
1
vote
1answer
21 views

Discrete Mathematics

I don’t really know where to even begin here. My first thought was that the intersection of j and k would be the universal set, but I don’t have any proof for that. I don’t have much practice with ...
0
votes
1answer
42 views

Basic Isabelle sequence limit proof

As hundreds have tried before me, I'm trying to learn Isabelle by attempting to prove extremely basic mathematical theorems. The task is hard because most Isabelle tutorials and books focus, for some ...
0
votes
2answers
43 views

Proving Not Big Omega?

I'm trying to prove that k(n^2) is not Big Omega of 2^n where k is a positive real number. I've looked at the negation of Big Omega. So I'm trying to find a n that's greater than or equal to some n0 ...
0
votes
0answers
37 views

How can I prove 2 log2 n < n for all n >= 6 [closed]

I've tried this proof using induction and tried a lot of algebraic manipulation, but I just can't seem to get the algebra down. I want to prove, either directly or by induction, that 2log2n <= n (...
-1
votes
1answer
25 views

Algebra for bitwise operators

I am trying to prove that a certain equation, with an operation defined for base 10, is equivalent to another operation (with slightly different numbers) that is only defined in base 2 (&, |, etc.)...
1
vote
2answers
110 views

How proof assistants are implemented?

What are the main blocks of a proof assistant? I am just interested in knowing the internal logic of proof checking. For example, topics about graphical user interfaces of such assistants do not ...
0
votes
1answer
42 views

Program correctness for a cubic sort program

I would like some help in proving my loop invariant for my python cubic sort program. So far I figured out the loop invariant which has two parts 0 <= i+1 <= len(L) L[0:i+1] is sorted. def ...
0
votes
0answers
14 views

Let e = Y - Ŷ be the vector of residuals. Prove that e’X = 0

I understand most of the content in my stats class, but the logical proofs get me. Please someone show me how to prove this. The more detailed the walk-through he better. Thanks!
1
vote
1answer
25 views

Need help understanding this proof (computer science)

I don't understand how it's valid to present this counterexample. It doesn't satisfy 𝑓(𝑛) = 𝑂(𝑔(𝑛)) since 𝑓(𝑛) is not 𝑂(𝑔(𝑛)). 𝑓(𝑛) = ω(𝑔(𝑛)) if f(n) is 2n and g(n) is n. So how is it ...
0
votes
1answer
39 views

Word Interop (COM) Proofing Options

I have documents that do not retain their proofing options. I have some code that now ensures all styles are set to the correct language and has proofing turned on: For Each s As Style In oDocument....
0
votes
0answers
12 views

Prove limit law

Let f and g be functions with domain (−∞, ∞). Assume that lim x→0 f(x) = 3 and lim x→0 g(x) = 2. Prove, directly from the ε − δ definition of limit, that lim x→0 [f (x) + 2g(x)] = 7. One of the ...
0
votes
1answer
64 views

Coq : How to correctly remember dependent values without messing up the induction hypothesis?

I have an induction scheme for a vector holding a leb value (x <= y), Definition vector_ind_with_leb : forall (A : Type) (P : forall n y: nat, y <= n -> vector A n -> Prop), (...
0
votes
1answer
51 views

P vs NP: How to prove that they are not equal?

so a problem is in P (=poly time) if there exists a Turing machine that can solve it in polynomial time. For NP (=non-deterministic poly time) problems there exists a witness, which the Turing machine ...
1
vote
1answer
63 views

Proof a Natural (n) is Zero

I am trying to learn the idris paradigm and still struggling. Here i have a function isZero that takes some natural Nat and returns True or False. My issue is with the non-relexive case. namespace ...
1
vote
1answer
18 views

Proof integration with magento 2.3

I've tried useproof, but it doesn't show real customers info, only imaginary ones. I would like have proof or similar extension for magento 2 site, anybody heard about free or paid extensions without ...
0
votes
1answer
18 views

Idris proof with RHS as function definition

I'm trying to get my head around some simple proofs by trying to prove the equivalence of a computational method of computing triangular numbers to the closed form of them. So far, all I've managed to ...
3
votes
1answer
58 views

Finite multisets as a HIT in Cubical Agda

In the standard library of Cubical Agda, there are finite multisets whose elegant definitions I reproduce below: {-# OPTIONS --cubical --safe #-} open import Cubical.Foundations.Prelude infixr 20 _∷...
0
votes
1answer
37 views

Logical Coq Proof related to map function

I am trying to prove the following Lemma: forall (A B : Type) (f : A -> B) (l : list A) (y : B), In y (map f l) <-> exists x, f x = y /\ In x l. I begin by splitting to handle the ...
4
votes
1answer
115 views

CoNat : proving that 0 is neutral to the left

I am experimenting with the definition of CoNat taken from this paper by Jesper Cockx and Andreas Abel: open import Data.Bool open import Relation.Binary.PropositionalEquality record CoNat : Set ...
3
votes
2answers
70 views

Proof of Correctness of Codeforces Problem: Boxers (rated 1500)

Consider this problem appearing in Codeforces (rated 1500): There are n boxers, the weight of the i-th boxer is ai. Each of them can change the weight by no more than 1 before the competition (the ...
3
votes
2answers
65 views

Coq simpl / unfold only once. (Replace part of goal with the result of one iteration of a function.)

I am an instructor at university for a class titled Type Systems of Languages and the professor used the following example for inductive proofs in Type Theory on the board last lecture: Suppose, ...
0
votes
1answer
37 views

Prove recursion: Show that M(n) >= 1/2 (n + 1) lg(n + 1)

I want to show that the recursion of quicksort run on best time time on n log n. i got this recursion formula M(0) = 1 M(1) = 1 M(n) = min (0 <= k <= n-1) {M(K) + M(n - k - 1)} + n show that ...
1
vote
1answer
21 views

Can I extract a proof of bounds from an enumeration expression?

Consider this trivial program: module Study g : Nat -> Nat -> Nat g x y = x - y f : Nat -> List Nat f x = map (g x) [1, 2 .. x] It gives an obvious error: | 4 | g x y = x - y | ...
0
votes
1answer
31 views

Idris: Proving some contradiction cases

I am new to Idris and Proofs in general but I am progressing through Software Foundations ported to Idris. I am working on an exercise namespace Booleans data Bool = True | False andb : ...
0
votes
0answers
30 views

Proving linear build heap using depth instead of height

I'm studying algorithms for an upcoming interview and I understand the proof for building a heap in linear time when it uses height for the summation. However, I'm wondering if it is possible to do ...
2
votes
1answer
61 views

Coq: Proving relation between < and ≤

I am learning Coq right now and in a larger proof I have become stumped by the following sub-proof: Theorem sub : ∀ n m : nat, n ≤ m → n ≠ m → n < m. Or, once unfolded: Theorem sub : ∀ n m : ...
0
votes
0answers
29 views

Interfaces with required proofs, in Idris

I've been trying to learn Idris in the past few days, following the book Type-Driven development with Idris. After reading the part about equality proofs, I started to think about having an interface ...
1
vote
1answer
45 views

Coq: Proving simple theorem using Fixpoints and Induction

I am learning to use Coq right now and I have stumbled on a theorem I can't seem to prove. Below is the theorem and my current attempt. Fixpoint nateq (n m : nat) : bool := match n with | ...
0
votes
1answer
118 views

coq - applying the inductive hypothesis to a hypothesis in eqb_list_true_iff

I am working my way through the software foundations book in my free time and this problem is particularly challenging for me. Here is where it gets stuck: Fixpoint eqb_list {A : Type} (eqb : A -> ...
2
votes
1answer
54 views

Idris proof with simplification causing “type mismatch” error

I am learning Idris by following along with this book: https://idris-hackers.github.io/software-foundations/pdf/sf-idris-2018.pdf I kind of hit a snag when getting to the section on proof with ...
1
vote
1answer
213 views

Equivalence of two ways of reversing a list

Let's say I have two different functions that reverse a list: revDumb : List a -> List a revDumb [] = [] revDumb (x :: xs) = revDumb xs ++ [x] revOnto : List a -> List a -> List a revOnto ...
7
votes
1answer
112 views

Simple congruence proof error with Liquid Haskell - Liquid Type Mismatch

I'm following the official tutorial on Liquid Haskell, and stumbled upon what seems to be a "bug" in it. The following code is present in the tutorial, and Liquid Haskell was supposed to check that ...
0
votes
0answers
19 views

Solving an exercise from the book monographs in computer science

I've been trying to solve exercise 21 in the book 'monographs in computer science - on a method of multi-programming' from W.H.J Feijen and A.J.M van Gasteren for a few days now, but I am kind of ...
0
votes
0answers
23 views

Proof for NP hard or P equation below

So I want to solve The formal statement of Traveling Salesman: Input a complete, weighted, directed graph G, and a target integer k Output true if there is a path through G that 1) visits every ...
4
votes
1answer
76 views

how to run mizar on mac

If this is not the right stack exchange site for this type of question please let me know where would be more appropriate. Also let me know if there are better tags for this question and I'll add them ...
4
votes
1answer
48 views

How to prove integer division inequality in Coq

I need to prove: 256 * (x / 256) <= 256 * x / 256, or more generally forall a b c : N, c > 0 -> a * (b / c) <= a * b / c. This is true since either b is divisible by c and they are equal ...
0
votes
0answers
17 views

How can i proof the correctness of a right/left rotation in a binary tree?

this is my first post in this forum and i hope i dont violate some rules. My question is how can i proof that the correctness of a binary tree keeps given after a right/left rotation? Its for a ...
0
votes
3answers
78 views

Reducing knapsack problem to an inverse knapsack problem

1)Suppose we have a common 0-1 knapsack problem. Given a set of n items numbered from 1 up to n, each with a weight w_i and a value v_i, along with a maximum weight capacity W. Here we need to select ...
3
votes
1answer
55 views

Stuck proving lemma with unprovable subgoals

I'm trying to prove a lemma that's based on the following definitions. Section lemma. Variable A : Type. Variable P : A -> Prop. Variable P_dec : forall x, {P x}+{~P x}. Inductive vector : nat -...
0
votes
1answer
34 views

The security of Zero knowledge proof performance

I recently learned to study the security of zero-knowledge proofs. It seems from the Wikipedia, that the most popular example is the Ali Baba cave. I have a question about the security of the zero-...
0
votes
1answer
29 views

Experimenting with cong in the Idris REPL

TL;DR: I'd like an example or two of using cong in the Idris REPL to help me understand it better. The generic equality type is conceptually defined like so: data (=) : a -> b -> Type where ...
2
votes
1answer
138 views

membership proof

I need to prove the following: lemma "m = min_list(x#xs) ⟹ m ∈ set (x#xs)" In plain English, I need to prove that the return value from "min_list (x#xs)" is always a member of (x#xs) I tried: ...
2
votes
0answers
38 views

foldrImpl and proofs

I've been using the Vect datatype a lot in my code. Frequently, I find myself having to prove something involving library functions over Vects which use foldr. Since foldr is implemented on top of ...
1
vote
2answers
101 views

Is the Proof of Elapsed Time consensus mechanism in blockchains Byzantine Fault Tolerant?

I was looking at consensus mechanisms other than the common PoW and PoS, and found a scheme known as proof of elapsed time. I am struggling to find any research or proofs to show that this is in fact ...
2
votes
1answer
53 views

Can't stop Prolog nodes creation by caching / memorizing

How can I memorize terms on a tree in Prolog? I thought my reasoning was fine but nodes like commutation keeps adding creating more nodes with the same previous value, the program works but I would ...
1
vote
1answer
31 views

Understanding Truth Proofs in relation to proof tables

I have been doing discrete structures and learning truth proofs and the sort (ETC. ((A→B)∨B)→C, (¬p→q)⊕¬q, etc, can know how those work and how to arrive at an answer, however recently things similar ...
0
votes
1answer
296 views

How to prove something obviously logical - list_get problem in Prop

The problem is that I cannot apply induction on H without skipping a step. I was supposed to get Some instr0 to apply the standard lemma : Lemma get_Some {A} (l:list A) n x : list_get l n = Some x -...
1
vote
1answer
61 views

How to make algebraic manipulations in Coq easier?

I'm experimenting with Coq's standard libraries for integers and rationals. So far my proofs are very time-consuming and look terrible. I guess I miss some important proof techniques. Such simple ...
1
vote
1answer
27 views

Proof there is no instance for a given UML-Diagram

Given the diagram in the top-right corner, I'm supposed to decide whether there is any valid instance of it. Now the given image is a counterproof by example ('wegen' means 'because of'). The ...