Volterra integral equation
Encyclopedia
In mathematics
, the Volterra integral equations are a special type of integral equation
s. They are divided into two groups referred to as the first and the second kind.
A linear Volterra equation of the first kind is
where ƒ is a given function and x is an unknown function to be solved for. A linear Volterra equation of the second kind is
In operator theory
, and in Fredholm theory
, the corresponding equations are called the Volterra operator
.
A linear Volterra integral equation is a convolution
equation if
The function
in the integral is often called the kernel
.
Such equations can be analysed and solved by means of Laplace transform techniques.
The Volterra integral equations were introduced by Vito Volterra
and then studied by Traian Lalescu
in his 1908 thesis, Sur les équations de Volterra, written under the direction of Émile Picard
. In 1911, Lalescu wrote the first book ever on integral equations.
Volterra integral equations find application in demography, the study of viscoelastic materials,
and in insurance mathematics through the renewal equation.
Mathematics
Mathematics is the study of quantity, space, structure, and change. Mathematicians seek out patterns and formulate new conjectures. Mathematicians resolve the truth or falsity of conjectures by mathematical proofs, which are arguments sufficient to convince other mathematicians of their validity...
, the Volterra integral equations are a special type of integral equation
Integral equation
In mathematics, an integral equation is an equation in which an unknown function appears under an integral sign. There is a close connection between differential and integral equations, and some problems may be formulated either way...
s. They are divided into two groups referred to as the first and the second kind.
A linear Volterra equation of the first kind is
where ƒ is a given function and x is an unknown function to be solved for. A linear Volterra equation of the second kind is
In operator theory
Operator theory
In mathematics, operator theory is the branch of functional analysis that focuses on bounded linear operators, but which includes closed operators and nonlinear operators.Operator theory also includes the study of algebras of operators....
, and in Fredholm theory
Fredholm theory
In mathematics, Fredholm theory is a theory of integral equations. In the narrowest sense, Fredholm theory concerns itself with the solution of the Fredholm integral equation. In a broader sense, the abstract structure of Fredholm's theory is given in terms of the spectral theory of Fredholm...
, the corresponding equations are called the Volterra operator
Volterra operator
In mathematics, in the area of functional analysis and operator theory, the Volterra operator, named after Vito Volterra, represents the operation of indefinite integration, viewed as a bounded linear operator on the space L2 of complex-valued square integrable functions on the interval...
.
A linear Volterra integral equation is a convolution
Convolution
In mathematics and, in particular, functional analysis, convolution is a mathematical operation on two functions f and g, producing a third function that is typically viewed as a modified version of one of the original functions. Convolution is similar to cross-correlation...
equation if
The function
in the integral is often called the kernelKernel (mathematics)
In mathematics, the word kernel has several meanings. Kernel may mean a subset associated with a mapping:* The kernel of a mapping is the set of elements that map to the zero element , as in kernel of a linear operator and kernel of a matrix...
.
Such equations can be analysed and solved by means of Laplace transform techniques.
The Volterra integral equations were introduced by Vito Volterra
Vito Volterra
Vito Volterra was an Italian mathematician and physicist, known for his contributions to mathematical biology and integral equations....
and then studied by Traian Lalescu
Traian Lalescu
Traian Lalescu was a Romanian mathematician. His main focus was on integral equations and he contributed to work in the areas of functional equations, trigonometric series, mathematical physics, geometry, mechanics, algebra, and the history of mathematics....
in his 1908 thesis, Sur les équations de Volterra, written under the direction of Émile Picard
Charles Émile Picard
Charles Émile Picard FRS was a French mathematician. He was elected the fifteenth member to occupy seat 1 of the Académie Française in 1924.- Biography :...
. In 1911, Lalescu wrote the first book ever on integral equations.
Volterra integral equations find application in demography, the study of viscoelastic materials,
and in insurance mathematics through the renewal equation.