PPT
... not faster than itself for problem size n.” i N, n N, n > i ~Faster(a, a, n) Consider an arbitrary (positive integer) i. Let n = ??. (Must be > i; so, at least i+1.) So, we need to prove: “a is not faster than itself for problem size ?? (for an arbitrary positive integer i)” ...
... not faster than itself for problem size n.” i N, n N, n > i ~Faster(a, a, n) Consider an arbitrary (positive integer) i. Let n = ??. (Must be > i; so, at least i+1.) So, we need to prove: “a is not faster than itself for problem size ?? (for an arbitrary positive integer i)” ...
PPT - UBC Department of CPSC Undergraduates
... on our way to a full computer: sequential circuits. The pre-class goals are to be able to: – Trace the operation of a deterministic finite-state automaton (represented as a diagram) on an input, including indicating whether the DFA accepts or rejects the input. – Deduce the language accepted by a si ...
... on our way to a full computer: sequential circuits. The pre-class goals are to be able to: – Trace the operation of a deterministic finite-state automaton (represented as a diagram) on an input, including indicating whether the DFA accepts or rejects the input. – Deduce the language accepted by a si ...
The History of Categorical Logic
... concerning the foundations of mathematics and the very nature of mathematical knowledge are inescapable. In particular, issues related to abstraction and the nature of mathematical objects emerges naturally from categorical logic. This paper covers the period that can be qualified as the birth and t ...
... concerning the foundations of mathematics and the very nature of mathematical knowledge are inescapable. In particular, issues related to abstraction and the nature of mathematical objects emerges naturally from categorical logic. This paper covers the period that can be qualified as the birth and t ...
FC §1.1, §1.2 - Mypage at Indiana University
... (although I am not at the moment making any assumption about which it is).” The discussion has mathematical generality in that p can represent any statement, and the discussion will be valid no matter which statement it represents. What we do with propositions is combine them with logical operators. ...
... (although I am not at the moment making any assumption about which it is).” The discussion has mathematical generality in that p can represent any statement, and the discussion will be valid no matter which statement it represents. What we do with propositions is combine them with logical operators. ...
Completeness in modal logic - Lund University Publications
... I shall try to summarize the “guide to intensional semantics” as briefly as possible. The article starts by introducing two new concepts: width and depth. Width and depth are measures of how many systems some type of semantics, e. g. relational semantics, makes complete. The width of some semantics ...
... I shall try to summarize the “guide to intensional semantics” as briefly as possible. The article starts by introducing two new concepts: width and depth. Width and depth are measures of how many systems some type of semantics, e. g. relational semantics, makes complete. The width of some semantics ...
thèse - IRIT
... aim of the dissertation given, (2) the second part, step by step, establishes the preliminary aspects: it contains a brief overview of ASP, giving specific classes of logic programs in their historical progress, and defining important concepts such as answer set and strong equivalence. Then comes th ...
... aim of the dissertation given, (2) the second part, step by step, establishes the preliminary aspects: it contains a brief overview of ASP, giving specific classes of logic programs in their historical progress, and defining important concepts such as answer set and strong equivalence. Then comes th ...
Gödel Without (Too Many) Tears
... Gödel’s doctoral dissertation, written when he was 23, established the completeness theorem for the first-order predicate calculus (i.e. a standard proof system for first-order logic indeed captures all the semantically valid inferences). Later he would do immensely important work on set theory, as ...
... Gödel’s doctoral dissertation, written when he was 23, established the completeness theorem for the first-order predicate calculus (i.e. a standard proof system for first-order logic indeed captures all the semantically valid inferences). Later he would do immensely important work on set theory, as ...
Notes on Classical Propositional Logic
... represents a context. I assume you all have seen truth tables, and I won’t go into their details. What I will do is extract their mathematical essence, because it will be convenient later on. Let us assume we have two truth values, true and false. (Exactly what these are is not important, only that ...
... represents a context. I assume you all have seen truth tables, and I won’t go into their details. What I will do is extract their mathematical essence, because it will be convenient later on. Let us assume we have two truth values, true and false. (Exactly what these are is not important, only that ...
you can this version here
... 10.4.1 Truth-predicates and truth-definitions . . . . . 10.4.2 The undefinability of truth . . . . . . . . . . . 10.4.3 The inexpressibility of truth . . . . . . . . . . . Box: The Master Argument for incompleteness . . . . . . . 10.5 Rosser’s Theorem . . . . . . . . . . . . . . . . . . . . . 10.5.1 ...
... 10.4.1 Truth-predicates and truth-definitions . . . . . 10.4.2 The undefinability of truth . . . . . . . . . . . 10.4.3 The inexpressibility of truth . . . . . . . . . . . Box: The Master Argument for incompleteness . . . . . . . 10.5 Rosser’s Theorem . . . . . . . . . . . . . . . . . . . . . 10.5.1 ...
Introduction to Logic
... other than what is stated follows of necessity from their being so.” And, in fact, this intuition not only lies at its origin, ca. 500 BC, but has been the main force motivating its development since that time until the last century. There was a medieval tradition according to which the Greek philos ...
... other than what is stated follows of necessity from their being so.” And, in fact, this intuition not only lies at its origin, ca. 500 BC, but has been the main force motivating its development since that time until the last century. There was a medieval tradition according to which the Greek philos ...
Full Text - Institute for Logic, Language and Computation
... viewing syntactical and philosophical considerations. The existence of several kinds of conditional sentences is recognized in the current literature but the consequences are not sufficiently shown. We will investigate here the criteria which allow such a division and illustrate these differences by ...
... viewing syntactical and philosophical considerations. The existence of several kinds of conditional sentences is recognized in the current literature but the consequences are not sufficiently shown. We will investigate here the criteria which allow such a division and illustrate these differences by ...
Kripke completeness revisited
... quote nicely summarizes one representative standpoint in the debate: As mathematics progresses, notions that were obscure and perplexing become clear and straightforward, sometimes even achieving the status of “obvious.” Then hindsight can make us all wise after the event. But we are separated from ...
... quote nicely summarizes one representative standpoint in the debate: As mathematics progresses, notions that were obscure and perplexing become clear and straightforward, sometimes even achieving the status of “obvious.” Then hindsight can make us all wise after the event. But we are separated from ...
Gödel`s Theorems
... if you start from a very modest background in logic.1 As we go through, there is also an amount of broadly philosophical commentary. I follow Gödel in believing that our formal investigations and our general reflections on foundational matters should illuminate and guide each other. I hope that the ...
... if you start from a very modest background in logic.1 As we go through, there is also an amount of broadly philosophical commentary. I follow Gödel in believing that our formal investigations and our general reflections on foundational matters should illuminate and guide each other. I hope that the ...
Introduction to Logic
... other than what is stated follows of necessity from their being so.” And, in fact, this intuition not only lies at its origin, ca. 500 BC, but has been the main force motivating its development since that time until the last century. There was a medieval tradition according to which the Greek philos ...
... other than what is stated follows of necessity from their being so.” And, in fact, this intuition not only lies at its origin, ca. 500 BC, but has been the main force motivating its development since that time until the last century. There was a medieval tradition according to which the Greek philos ...
Revisiting Preferences and Argumentation
... antecedents ϕ1 , . . . , ϕn hold, then without exception, respectively presumably, the consequent ϕ holds’. There are two ways to use these rules: they could encode domain-specific information (as in e.g. default logic) but they could also express general laws of reasoning. For example, the defeasib ...
... antecedents ϕ1 , . . . , ϕn hold, then without exception, respectively presumably, the consequent ϕ holds’. There are two ways to use these rules: they could encode domain-specific information (as in e.g. default logic) but they could also express general laws of reasoning. For example, the defeasib ...
CHAPTER 7 GENERAL PROOF SYSTEMS 1 Introduction
... basic expressions are finite sequences of formulas of L = L¬,∩,∪,⇒ . We extend our classical semantics for L to the set F ∗ of all finite sequences of formulas as follows: for any v : V AR −→ {F, T } and any ∆ ∈ F ∗ , ∆ = A1 , A2 , ..An , v ∗ (∆) = v ∗ (A1 , A2 , ..An ) = v ∗ (A1 ) ∪ v ∗ (A2 ) ∪ ... ...
... basic expressions are finite sequences of formulas of L = L¬,∩,∪,⇒ . We extend our classical semantics for L to the set F ∗ of all finite sequences of formulas as follows: for any v : V AR −→ {F, T } and any ∆ ∈ F ∗ , ∆ = A1 , A2 , ..An , v ∗ (∆) = v ∗ (A1 , A2 , ..An ) = v ∗ (A1 ) ∪ v ∗ (A2 ) ∪ ... ...
YABLO WITHOUT GODEL
... different from the simple Russell-liar paradox, because the proof is different. But the Yablo argument in the previous section does not establish a new inconsistency. The inconsistency of vs with ser and trans, however, cannot be obtained by the simple argument, because vs by itself is consistent. T ...
... different from the simple Russell-liar paradox, because the proof is different. But the Yablo argument in the previous section does not establish a new inconsistency. The inconsistency of vs with ser and trans, however, cannot be obtained by the simple argument, because vs by itself is consistent. T ...
Proof Theory for Propositional Logic
... Davidson,2 pose this issue in terms of human finitude. For any natural language there is no upper bound on the length of sentences. But that means that every natural language in some sense includes an infinite number of sentences. But how do finite beings like us grasp such an infinity? The standard ...
... Davidson,2 pose this issue in terms of human finitude. For any natural language there is no upper bound on the length of sentences. But that means that every natural language in some sense includes an infinite number of sentences. But how do finite beings like us grasp such an infinity? The standard ...
Ascribing beliefs to resource bounded agents
... the principled design of agent systems. A common approach is to model the agent in some logic and prove theorems about the agent’s behaviour in that logic. It is perhaps most natural to reason about the behaviour of the agent in an epistemic logic, and there has been a considerable amount of work in ...
... the principled design of agent systems. A common approach is to model the agent in some logic and prove theorems about the agent’s behaviour in that logic. It is perhaps most natural to reason about the behaviour of the agent in an epistemic logic, and there has been a considerable amount of work in ...
A Logical Framework for Default Reasoning
... The intuitive idea is, given a set of observations to be explained, a set of facts known to be true, and a pool of possible hypotheses, to find an explanation which is a set of instances of possible hypotheses used to predict the expected observations (i.e., together with the facts implies the obser ...
... The intuitive idea is, given a set of observations to be explained, a set of facts known to be true, and a pool of possible hypotheses, to find an explanation which is a set of instances of possible hypotheses used to predict the expected observations (i.e., together with the facts implies the obser ...
Weyl`s Predicative Classical Mathematics as a Logic
... There are several ways in which a type theory may be modified so as to be appropriate for formalising classical mathematics. This cannot however be done without changing the structure of the datatypes, because the two interact so strongly. In MLTT, they are one and the same; in ECC or CIC, the unive ...
... There are several ways in which a type theory may be modified so as to be appropriate for formalising classical mathematics. This cannot however be done without changing the structure of the datatypes, because the two interact so strongly. In MLTT, they are one and the same; in ECC or CIC, the unive ...
x - Homepages | The University of Aberdeen
... Applications of Predicate Logic It is one of the most-used formal notations for writing mathematical definitions, axioms, and theorems. For example, in linear algebra, a partial order is introduced saying that a relation R is reflexive and transitive – and these notions are defined using predicate l ...
... Applications of Predicate Logic It is one of the most-used formal notations for writing mathematical definitions, axioms, and theorems. For example, in linear algebra, a partial order is introduced saying that a relation R is reflexive and transitive – and these notions are defined using predicate l ...
preprint - Open Science Framework
... CS2: This just makes the presence of perfect memory explicit. When Brouwer made his first remark about the ideal mathematician in print, in his article ‘Volition, knowledge, speech’ of 1933, it was notably the perfect memory that he emphasised (see above, p. 2). CS3: Recall that for Brouwer, mathema ...
... CS2: This just makes the presence of perfect memory explicit. When Brouwer made his first remark about the ideal mathematician in print, in his article ‘Volition, knowledge, speech’ of 1933, it was notably the perfect memory that he emphasised (see above, p. 2). CS3: Recall that for Brouwer, mathema ...
THE LOGIC OF QUANTIFIED STATEMENTS
... • When concrete values are substituted in place of predicate variables, a statement results (which has a truth value) • P(x) stand for “x is a student at Bedford College”, P(Jack) is “Jack is a student at Bedford College”. • Q(x,y) stand for “x is a student at y.” , Q(John Smith, Fordham University) ...
... • When concrete values are substituted in place of predicate variables, a statement results (which has a truth value) • P(x) stand for “x is a student at Bedford College”, P(Jack) is “Jack is a student at Bedford College”. • Q(x,y) stand for “x is a student at y.” , Q(John Smith, Fordham University) ...
Jesús Mosterín
Jesús Mosterín (born 1941) is a leading Spanish philosopher and a thinker of broad spectrum, often at the frontier between science and philosophy.