"The notation adopted in the present work is based upon that of Peano, and the following explanations are to some extent modelled on those which he prefixes to his Formulario Mathematico." (Chapter I: Preliminary Explanations of Ideas and Notations, page 4)
In the notation, variables are ambiguous in denotation, preserve a recognizable identity appearing in various places in logical statements within a given context, and have a range of possible determination between any two variables which is the same or different. When the possible determination is the same for both variables, then one implies the other; otherwise, the possible determination of one given to the other produces a meaningless phrase. The alphabetic symbol set for variables includes the lower and upper case Roman letters as well as many from the Greek alphabet.
Fundamental functions of propositionsEdit
The four fundamental functions are the contradictory function, the logical sum, the logical product, and the implicative function.[2]
Contradictory functionEdit
The contradictory function applied to a proposition returns its negation.
Logical sumEdit
The logical sum applied to two propositions returns their disjunction.
Logical productEdit
The logical product applied to two propositions returns the truth-value of both propositions being simultaneously true.
Implicative functionEdit
The implicative function applied to two ordered propositions returns the truth value of the first implying the second proposition.
Assertion is same as the making of a statement between two full stops.
An asserted proposition is either true or an error on the part of the writer.[4]
Inference is equivalent to the rule modus ponens, where [5]
In addition to the logical product, dots are also used to show groupings of functions of propositions. In the above example, the dot before the final implication function symbol groups all of the previous functions on that line together as the antecedent to the final consequent.
The notation includes definitions as complex functions of propositions, using the equals sign "=" to separate the defined term from its symbolic definition, ending with the letters "Df".[6]
peano, russell, notation, mathematical, logic, bertrand, russell, application, giuseppe, peano, logical, notation, logical, notions, frege, used, writing, principia, mathematica, collaboration, with, alfred, north, whitehead, notation, adopted, present, work, . In mathematical logic Peano Russell notation was Bertrand Russell s application of Giuseppe Peano s logical notation to the logical notions of Frege and was used in the writing of Principia Mathematica in collaboration with Alfred North Whitehead 1 The notation adopted in the present work is based upon that of Peano and the following explanations are to some extent modelled on those which he prefixes to his Formulario Mathematico Chapter I Preliminary Explanations of Ideas and Notations page 4 Contents 1 Variables 2 Fundamental functions of propositions 2 1 Contradictory function 2 2 Logical sum 2 3 Logical product 2 4 Implicative function 3 More complex functions of propositions 4 Notes 5 References 6 External linksVariables EditIn the notation variables are ambiguous in denotation preserve a recognizable identity appearing in various places in logical statements within a given context and have a range of possible determination between any two variables which is the same or different When the possible determination is the same for both variables then one implies the other otherwise the possible determination of one given to the other produces a meaningless phrase The alphabetic symbol set for variables includes the lower and upper case Roman letters as well as many from the Greek alphabet Fundamental functions of propositions EditThe four fundamental functions are the contradictory function the logical sum the logical product and the implicative function 2 Contradictory function Edit The contradictory function applied to a proposition returns its negation p displaystyle sim p Logical sum Edit The logical sum applied to two propositions returns their disjunction p q displaystyle p lor q Logical product Edit The logical product applied to two propositions returns the truth value of both propositions being simultaneously true p q displaystyle p cdot q Implicative function Edit The implicative function applied to two ordered propositions returns the truth value of the first implying the second proposition p q displaystyle p supset q More complex functions of propositions EditEquivalence is written as p q displaystyle p equiv q standing for p q q p displaystyle p supset q cdot q supset p 3 Assertion is same as the making of a statement between two full stops p displaystyle vdash p An asserted proposition is either true or an error on the part of the writer 4 Inference is equivalent to the rule modus ponens where p p q q displaystyle p cdot p supset q supset q 5 In addition to the logical product dots are also used to show groupings of functions of propositions In the above example the dot before the final implication function symbol groups all of the previous functions on that line together as the antecedent to the final consequent The notation includes definitions as complex functions of propositions using the equals sign to separate the defined term from its symbolic definition ending with the letters Df 6 Notes Edit Russell p 4 Russell p 6 Russell p 7 Russell p 8 Russell pp 8 9 Russell p 11References EditRussell Bertrand and Alfred North Whitehead 1910 Principia Mathematica Cambridge England The University Press OCLC 1041146External links EditLinsky Bernard The Notation in Principia Mathematica In Zalta Edward N ed Stanford Encyclopedia of Philosophy Retrieved from https en wikipedia org w index php title Peano Russell notation amp oldid 1088580025, wikipedia, wiki, book, books, library,
