- References
In the branch of mathematics known as potential theory, a Dirichlet form is a generalization of the Laplacian that can be defined on every measure space, without the need for mentioning partial derivatives. This allows mathematicians to study the Laplace equation and heat equation on spaces that are not manifolds: for example, fractals. To accomplish this generalization, one focuses not on the Laplacian itself but on the quantity
that is minimized when the Laplacian vanishes.
Technically, a Dirichlet form is a Markovian closed symmetric form on an L2-space.[1] Such objects are studied in abstract potential theory, based on the classical Dirichlet's principle. The theory of Dirichlet forms originated in the work of {{harvs|txt|last1=Beurling|last2=Deny|year=1958|year2=1959}} on Dirichlet spaces.
A Dirichlet form on a measure space 
is a bilinear function
such that
1) 
is a dense subset of 
2) 
is symmetric, that is 
for every 
.
3) 
for every 
.
4) The set equipped with the inner product defined by 
is a real Hilbert space.
5) For every we have that 
and 
In other words, a Dirichlet form is nothing but a positive symmetric bilinear form defined on a dense subset of such that 4) and 5) hold.
Alternatively, the quadratic form 
itself is known as the Dirichlet form and it is still denoted by ,
so 
.
The best-known Dirichlet form is the Dirichlet energy of functions on 
which gives rise to the space 
. Another example of a Dirichlet form is given by
where 
is some non-negative symmetric integral kernel.
If the kernel 
satisfies the bound 
, then the quadratic form is bounded in 
.
If moreover, 
, then the form is comparable to the norm in squared and in that case the set
defined above is given by 
. Thus Dirichlet forms are natural generalizations of the Dirichlet integrals
where 
is a positive symmetric matrix. The Euler-Lagrange equation of a Dirichlet form is a non-local analogue of an elliptic equations in divergence form. Equations of this type are studied using variational methods and they are expected to satisfy similar properties.[2][3]
References
2. ^1 {{Citation | last1=Barlow | first1=Martin T. | last2=Bass | first2=Richard F. | last3=Chen | first3=Zhen-Qing | last4=Kassmann | first4=Moritz | title=Non-local Dirichlet forms and symmetric jump processes | doi=10.1090/S0002-9947-08-04544-3 | year=2009 | journal=Transactions of the American Mathematical Society | issn=0002-9947 | volume=361 | issue=4 | pages=1963–1999| arxiv=math/0609842 }}
3. ^1 {{Citation | last1=Kassmann | first1=Moritz | title=A priori estimates for integro-differential operators with measurable kernels | doi=10.1007/s00526-008-0173-6 | year=2009 | journal=Calculus of Variations and Partial Differential Equations | issn=0944-2669 | volume=34 | issue=1 | pages=1–21}}
}}
- {{Citation | last1=Beurling | first1=Arne | last2=Deny | first2=J. | title=Espaces de Dirichlet. I. Le cas élémentaire | doi=10.1007/BF02392426 | mr=0098924 | year=1958 | journal=Acta Mathematica | issn=0001-5962 | volume=99 | pages=203–224 | issue=1}}
- {{Citation | last1=Beurling | first1=Arne | last2=Deny | first2=J. | title=Dirichlet spaces | jstor=90170 | mr=0106365 | year=1959 | journal=Proceedings of the National Academy of Sciences of the United States of America | issn=0027-8424 | volume=45 | pages=208–215 | doi=10.1073/pnas.45.2.208 | pmid=16590372 | issue=2| pmc=222537 | bibcode=1959PNAS...45..208B }}
- {{Citation | last1=Fukushima | first1=Masatoshi | title=Dirichlet forms and Markov processes | publisher=North-Holland | location=Amsterdam | series=North-Holland Mathematical Library | isbn=978-0-444-85421-6 | mr=569058 | year=1980 | volume=23}}
- {{citation
| last1 = Jost | first1 = Jürgen
| last2 = Kendall | first2 = Wilfrid
| last3 = Mosco | first3 = Umberto
| last4 = Röckner | first4 = Michael
| last5 = Sturm | first5 = Karl-Theodor | author5-link = Karl-Theodor Sturm
| mr = 1652277
| isbn = 978-0-8218-1061-3
| location = Providence, RI
| page = xiv+277
| publisher = American Mathematical Society
| series = AMS/IP Studies in Advanced Mathematics
| title = New directions in Dirichlet forms
| volume = 8
| year = 1998}}.
- {{eom|id=p/p074150|title=Abstract potential theory}}
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