Dirichlet Conditions: Difference between revisions
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===Condition 3.=== |
===Condition 3.=== |
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Over any period, <math> f(t) </math> can have only a finite number of discontinuities. |
Over any period, <math> f \,(t) </math> can have only a finite number of discontinuities. |
Revision as of 21:53, 3 October 2006
Dirichlet Conditions
Condition 1.
Over any period must have the property:
In other words, is abosolutely integrable. The result of this property is that each of the Fourier coefficients is finite.
Condition 2.
Over any period of the signal, there must be only a finite number of minima and maxima. in other words, functions like are excluded. These functions are known as bounded variations.
Condition 3.
Over any period, can have only a finite number of discontinuities.