# 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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### 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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### 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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### 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 ...
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### 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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### 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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### 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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### 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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### 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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### 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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### 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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### 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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### 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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### 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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### 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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### 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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### 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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### 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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### 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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### 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 = ...
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### 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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### 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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### 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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### 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 ...
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### 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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### 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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### 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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### 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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### 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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### 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 ...
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### 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 ...
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### 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: ...
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### Prolog - How do I represent my code in a proof/derivation/binary tree?

After searching extensively online, the information provided regarding proof/derivation/binary trees felt somewhat over my head. Here is my SWI-Prolog code: number_book(111, brave_new_world). ...
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### What is the right direction of using “*.isInstance”?

I am confused every time I read the Java Documentation again to that. So please try to help me in your own words. List<Parent> list = new ArrayList<Parent>(); //Child extends Parent... ...
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### A (sane) extruded convex 3D hull algorithm?

So I'll try to describe the problem in detail, and I'd like some critique on the validity and performance of the process I use to solve it. My main concern is the validity, which I cannot seem to ...
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### Fitch-Style Proof

Hi I'm having trouble solving a Fitch Style Proof and I was hoping someone would be able to help me. Premises: A ^ (B v C) B => D C => E Goal: ~E => D
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### Sorted list in idris (insertion sort)

I am writing an undergraduate thesis on usefulness of dependent types. I am trying to construct a container, that can only be constructed into a sorted list, so that it is proven sorted by ...
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### How to use obvious facts in Agda proofs with “with”?

I had trouble writing a proof in Agda. So I simplified it, a lot. ffff : bool -> bool ffff x with x , x ffff x | t , t = t ffff x | f , f = t ffff x | t , () ffff x | f , () with the ...
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### Any documents for practice Rule Induction in Type System?

As you know, to define a new type system, one way is that we need: Language syntax Typing rules And then we need to prove some theorems we believe that it is provable by using above typing rules. ...
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### Elim a double negation hypothesis in Coq Proof Assistant?

Could anyone explain to me why do we have to prove ~A after elim Ha.? Before "elim Ha" 1 subgoals A : Prop Ha : ~ ~ A ______________________________________(1/1) A After 1 subgoals A : Prop ...
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### Do I need heterogeneous equality?

Brief background: I'm implementing contexts and renamings using de Bruijn indices, and then extending those notions with an "undefined" name, written ε. The undefined name induces a partial order on ...
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### Time complexity in backtracking algorithm

I what to calculate the worst case, time complexity for this recursive function. list is a list of m*n pieces. matrix is a matrix of mxn to fill with this peaces. Backtrack(list, matrix): ...