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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How to prove functions equal, knowing their bodies are equal?

How can we prove the following?: Lemma forfun: forall (A B : nat->nat), (forall x:nat, A x = B x) -> (fun x => A x) = (fun x => B x). Proof.
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I need to prove that this is NP-Hard

This seems to be NP-Hard, but I don't know how to prove it, can anyone help? A finite set X = {x_1, ..., x_N}; Let s be a subset of X, |s| = n; A finite set S of all possible combination ...
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2answers
56 views

Idris proof by definition

I can write the function powApply : Nat -> (a -> a) -> a -> a powApply Z f = id powApply (S k) f = f . powApply k f and prove trivially: powApplyZero : (f : _) -> (x : _) -> ...
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42 views

Proving a property of functional dependencies

I need to prove the following claim: Let R be a relation, and F a set of functional dependencies on it. Further more, let's assume that each dependency in F has exactly one attribute on its right ...
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12 views

proving or disproving a property of AVL tree

let T be an AVL tree, let Tr and Tl be the and right and left subtrees of the root, let |Tr| and |Tl| be the number of nodes in the sub trees, then |Tl|=Big-Theta(|Tr|). I thought that I proved it ...
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23 views

Necessary and Sufficient vs Soundness and Completeness

I am trying to learn proof. I came across these 4 terms. I am trying to relate all. A: X>Y B: Y<X Necessary Condition B implies A Sufficient Condition A implies B ...
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36 views

How to prove (R -> P) [in the Coq proof assistant]?

How does one prove (R->P) in Coq. I'm a beginner at this and don't know much of this tool. This is what I wrote: Require Import Classical. Theorem intro_neg : forall P Q : Prop,(P -> Q /\ ~Q) ...
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71 views

Given a graph G with unique edge weights, are all max spanning trees of G a max bottleneck tree?

The full version of this question is quoted below: Let G be a connected graph with n vertices, m edges with distinct edge weights. Let T be a tree of G with n vertices and n-1 edges (i.e. a ...
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1answer
56 views

Why Coq doesn't allow inversion, destruct, etc. when the goal is a Type?

When refineing a program, I tried to end proof by inversion on a False hypothesis when the goal was a Type. Here is a reduced version of the proof I tried to do. Lemma strange1: forall T:Type, 0>0 ...
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10 views

resolving a clause. Resolved A and B yields

I was wondering why the following resolutions yield true and none rather than (A !D) and (A B C !D): Resolve (A B C) & (!B !C !D) yields true Resolve (A B C) & (B C !D) yields none.
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105 views

Open Type Level Proofs in Haskell/Idris

In Idris/Haskell, one can prove properties of data by annotating the types and using GADT constructors, such as with Vect, however, this requires hardcoding the property into the type (e.g. a Vect has ...
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1answer
22 views

How to prove that Greedy approaches will not work

For any given problem where greedy approaches will not give optimal value, we can find a counter example to disprove that approach. However, is it possible to prove that for a given problem, any ...
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1answer
17 views

How to show that something does increases the expressive power?

how do I show that something does increase the expressive power? For example I have given a problem in which I need to show that adding some certain function to the select-project-join queries of sql ...
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81 views

Proving lemma in Isabelle

I have a function fun exec :: "com ⇒ state ⇒ nat ⇒ state option" where "exec _ s 0 = None" | "exec SKIP s (Suc f) = Some s" | "exec (x::=v) s (Suc f) = Some (s(x:=aval v s))" | "exec ...
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25 views

batch processing proof of the number of jobs' relationship with service time and waiting time

The classical batch processing system ignores the cost of increased waiting time for users. Consider a single batch characterized by the following parameters: M average mounting time T average ...
2
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1answer
54 views

Prove So (0 < m) -> (n ** m = S n)

I'm trying to make an Idris function of type (j : Nat) -> {auto p : So (j < n)} -> Fin n to convert a Nat into a Fin n. To get the Z case to work (and output FZ), I'm trying to prove that a ...
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37 views

Formally and Informally describe the language of this grammar

I have a question I would like some help with: Formally and informally describe the language of the following grammar G = (Σ, N, S, P) Σ = {a,b,c} N = {S,T,X} S = S p = { S->aTXc, S->bTc, ...
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29 views

Proof through Number of Derivation Steps

Given G = {a, b, c, d}, {S, X, Y}, S, {S->XY, X->aXb, X->ab, Y->cYd, Y->cY, Y->cd}} Prove that |w|c-|w|d+|w|a≥|w|b |w|a is how many 'a's there are in the string. This makes sense that there will be ...
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74 views

Graph Isomorphism in P Time

I hold in my hands the product of two and a half years of independent research and development on a P-Time algorithm to detect isomorphisms of any two graphs. I am roughly 60% done with the proof ...
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18 views

How to prove the Normalization property in propositional logic?

The Normalization property: for any derivation tree M of A true, there is a sequence of local reductions that convert M to a normal proof of A true. The Strong Normalization property: any sequence of ...
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78 views

How or is that possible to prove or falsify `forall (P Q : Prop), (P -> Q) -> (Q -> P) -> P = Q.` in Coq?

I want to prove or falsify forall (P Q : Prop), (P -> Q) -> (Q -> P) -> P = Q. in Coq. Here is my approach. Inductive True2 : Prop := | One : True2 | Two : True2. Lemma True_has_one : ...
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1answer
22 views

Simple proof of stream of ones in Coq

Taking code from CPDT, I'd like to prove a property for the easy stream ones, which always return 1. CoFixpoint ones : Stream Z := Cons 1 ones. Also from CPDT, I use this function to retrieve a ...
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77 views

Proving that CFG generates a language

I need to construct a CFG for the language consisting of even length palindromes with the same number of a's and b's and then prove that it generates that language. This is the CFG I got: S→ abba | ...
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1answer
77 views

Using induction to prove linear maximum subarray algorithm

Here's my implementation of Kadane's algorihm that I wrote OCaml: let rec helper max_now max_so_far f n index = if n < index then max_so_far else if max_now + f index < 0 then helper 0 ...
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1answer
57 views

Proving a binary tree

How would i go about proving the relationship with j and k if T is a binary tree with k internal vertices and j terminal vertices In a full binary tee I know that j = k + 1 In a binary tree that ...
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1answer
44 views

Proving tail-recursive function (calculating powers of an integer)

Here's a function whose corectness I want to prove (written in OCaml): let rec pow ak a k = if k=0 then ak else if (k mod 2)=1 then pow (ak*a) (a*a) (k/2) else pow ak (a*a) (k/2);; Its ...
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2answers
335 views

Why is the greedy algorithm optimal?

Codility, lesson 14, task TieRopes (https://codility.com/demo/take-sample-test/tie_ropes). Stated briefly, the problem is to partition a list A of positive integers into the maximum number of ...
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1answer
56 views

Proving syntactic ambiguity of type declaration grammar

Given a grammar to achieve C-style type declarations: Declaration ::= Type Declarator ; Type ::= int | char Declarator ::= * Declarator | Declarator [ num ] | ...
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1answer
44 views

Proof of code execution

Is there a way to prove, I mean technically and legally prove, that a piece of code has been ran at a certain time on a computer ? I think this could be achieved by involving cryptographic techniques ...
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1answer
60 views

Hoare logic proof

Give a proof that the following is correct. {n != 0} if n<0 then n= -n {n>0} The following inference rule should help {B and P} S {Q}, (not B) and P=>Q ...
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1answer
29 views

Proof of custom binary strings

Fibonacci is defined recursively for this question as: F~0 = 1 F~1 = 1 F~n = F~n-1 + F~n-2 for n >= 2 So a custom binary string always begins with 1 and never has two consecutive ones. If s = ...
12
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1answer
179 views

Proving associativity of natural number addition using Scala shapeless

The following code is Idris: natAssociative : (a : Nat) -> (b : Nat) -> (c : Nat) -> (a + b) + c = a + (b + c) natAssociative Z b c = the (b + c = b + c) refl natAssociative (S k) b c = ...
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proving that huffman's algorithm can produce a codeword of length 1 when frequency greater than 0.40 [closed]

If I have a set of symbols and frequencies: A - 0.1 B - 0.40 C - 0.2 D - 0.23 E - 0.15 F - 0.17 The Huffman algorithm will produce codewords that are only greater than length 1. But when I change ...
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1answer
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Formal proof for P → Q ≡ ¬P ∨ Q in Fitch

I'm trying to construct a formal proof for 'P → Q ≡ ¬P ∨ Q' in Fitch. I know this is true, but how do I prove it?
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1answer
64 views

Proof of reverse binary strings?

If w : {1...L} → {0,1} is a binary string, the complement of w, denoted wC, is a string of length L defined by: wc(i) = 1 - w(i). The reverse of w, denoted wR, is the string of the length L defined by ...
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1answer
37 views

Proving efficiency class for a time complexity function

Below is the solution but I have trouble understanding 1 part of the proof by induction part. Why can you just add + 2 to one side and +4 to the other? We're dealing with the function T(n) = 2n + 2 ...
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How to prove 3NF?

I am trying really hard to spin my brain around how to prove 3NF. I actually have the answer, but if someone know this well enough to make me understand it, I would be very grateful. Ok, here it ...
0
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1answer
90 views

Prove ¬(¬a = a)

This looks like such an easy problem but still can't figure it out. How do I prove ¬(¬a = a)? No given premises. I got this so far (in Fitch): This is a subproof where I assume the negation of my ...
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76 views

How can I prove a type is valid in Agda?

I'm trying to do proofs over dependent functions, and I'm running into a snag. So let's say we have a theorem f-equal f-equal : ∀ {A B} {f : A → B} {x y : A} → x ≡ y → f x ≡ f y f-equal refl = refl ...
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1answer
28 views

Prolog Program Out of Global Stack Error

I am trying a theorem proving program. But Rule 4 seems to be badly implemented. % delete del(X, [X | Tail], Tail). del(X, [Y | Tail], [Y | Tail1]) :- del(X, Tail, Tail1). % remove remove(X, Y, ...
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64 views

Merge sorted sequences with split and concat

I am struggling with following assignment: Given sorted sequences of numbers and operations and , find an optimal sequence of those operations (the shortest one), which creates one sorted sequence. ...
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9 views

Smallest edge in a euclidean Steiner tree smaller than the smallest edge of the corresponding euclidean MST?

Given a set of 2D points V in a plane, consider the euclidean minimum steiner tree S, and the euclidean minimum spanning tree M on V. Let s be the length of the smallest length edge in S, and m be the ...
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1answer
69 views

Theorem Prover: How to optimize a backward proof search containing a “useless rule AND”

Quick review: Inference rule = conclusion + rule + premises Proof tree = conclusion + rule + sub-trees Backward proof search: given an input goal, try to build a proof tree by applying inference ...
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How to properly use keyword 'theorem' in Isabelle?

I obtained the following code from Isabelle's wikipedia page: theorem sqrt2_not_rational: "sqrt (real 2) ∉ ℚ" proof assume "sqrt (real 2) ∈ ℚ" then obtain m n :: nat where n_nonzero: "n ≠ ...
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parseInt() and parseFloat(): Can this second assertion ever fail?

I've been using parseInt() and parseFloat() in various contexts for a while now, and I'd like to think I know all the ins and outs of the two. But recently I had a curious thought which I so far ...
0
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1answer
41 views

Using “rewrite” inside non-top-level goal requires auxiliary function?

I have an Agda formalisation of pi-calculus with de Bruijn indices. Most of the setup is irrelevant to my problem, so I'll use empty types for renamings Ren and actions, and simply postulate a basic ...
2
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2answers
120 views

isabelle proving commutativity for add

Im trying to prove commutativity in Isabelle/HOL for a self-defined add function. I managed to prove associativity but I'm stuck on this. The definition of add: fun add :: "nat ⇒ nat ⇒ nat" where ...
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How can you formally prove that a specific quine is the shortest for its language? [duplicate]

I had come up with a Ruby quine: eval s=%q(puts"eval s=%q(#{s})") and claimed it to be the shortest, but a quine originally written for Perl by "Robin Houston" and ported to Ruby by "Sabby and ...
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How to end this Proof in Coq

I have managed to reduce my goal to (fun x0 : PSR => me (x x0)) = x I know that reflexivity will work, but for pedagogical reasons I prefer to continue reducing it. me is an identity function ...
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Proof of Paper, Scissor, Rock as Monoid Instance in Coq

So while learning Coq I did a simple example with the game paper, scissor, rock. I defined a data type. Inductive PSR : Set := paper | scissor | rock. And three functions: Definition me (elem: ...