MyWikiBiz, Author Your Legacy — Thursday November 07, 2024
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, 16:46, 23 April 2009
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| The term ''exponentiation'' is more generally used in mathematics for operations that involve taking a base to a power, and is slightly preferable to ''involution'' since the latter is used for different concepts in different contexts. Operations analogous to taking powers are widespread throughout mathematics and Peirce frequently makes use of them in a number of important applications, for example, in his theory of information. But that's another story. | | The term ''exponentiation'' is more generally used in mathematics for operations that involve taking a base to a power, and is slightly preferable to ''involution'' since the latter is used for different concepts in different contexts. Operations analogous to taking powers are widespread throughout mathematics and Peirce frequently makes use of them in a number of important applications, for example, in his theory of information. But that's another story. |
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− | The ''function space'' <math>Y^X,\!</math> where <math>X\!</math> and <math>Y\!</math> are sets, is the set of all functions from <math>X\!</math> to <math>Y,\!</math> defined as <math>Y^X = \{f : X \to Y \}.</math> An alternate notation for the function space <math>Y^X\!</math> is <math>(X \to Y).</math> | + | The ''function space'' <math>Y^X,\!</math> where <math>X\!</math> and <math>Y\!</math> are sets, is the set of all functions from <math>X\!</math> as domain to <math>Y\!</math> as codomain, defined as <math>Y^X = \{f : X \to Y \}.</math> The notation <math>(X \to Y)</math> is also used to denote the function space <math>Y^X.\!</math> If <math>X\!</math> and <math>Y\!</math> have cardinalities <math>|X|\!</math> and <math>|Y|,\!</math> respectively, then the function space <math>X^Y\!</math> has cardinality <math>|X|^|Y|.\!</math> |
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| ==References== | | ==References== |