Laplace transform
In mathematics and in particular, in functional analysis, the Laplace transform of a function f(t) defined for all real numbers t ≥ 0 is the function F(s), defined by:
Also, the output of a linear dynamic system can be calculated by convolving its unit impulse response with the input signal. Performing this calculation in Laplace space turns the convolution into a multiplication, which often makes matters easier. For more information, see control theory.
The Laplace transform is named in honor of Pierre-Simon Laplace.
A sometimes convenient abuse of notation, prevailing especially among engineers and physicists, writes this in the following form:
The Laplace transform can also be used to solve differential equations and is used extensively in electrical engineering.
An interesting aspect of Laplace transforms is that mathematicians to this day do not know its domain. In other words, there is no specific set of rules that one can check a function against to know if its Laplace transform can be taken.
Properties
Linearity
nth power
Exponential
Sine
Cosine
Hyperbolic sine
Hyperbolic cosine
Natural logarithm
nth root
Bessel function of the first kind
Modified Bessel function of the first kind
Error function
Differentiation
Integration
s shifting
t shifting
Note: is the step function.nth-power shifting
Convolution
Laplace transform of a function with period p