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This article is cited in 3 scientific papers (total in 3 papers)
MATHEMATICS
Infinite Schrödinger networks
N. Nathiya, Ch. Amulya Smyrna Vellore Institute of Technology Chennai, Chennai, Tamil Nadu, 600127, India
Abstract:
Finite-difference models of partial differential equations such as Laplace or Poisson equations lead to a finite network. A discretized equation on an unbounded plane or space results in an infinite network. In an infinite network, Schrödinger operator (perturbed Laplace operator, $q$-Laplace) is defined to develop a discrete potential theory which has a model in the Schrödinger equation in the Euclidean spaces. The relation between Laplace operator $\Delta$-theory and the $\Delta_q$-theory is investigated. In the $\Delta_q$-theory the Poisson equation is solved if the network is a tree and a canonical representation for non-negative $q$-superharmonic functions is obtained in general case.
Keywords:
$q$-harmonic functions, $q$-superharmonic functions, Schrödinger network, hyperbolic Schrödinger network, parabolic Schrödinger network, integral representation.
Received: 07.05.2021
Citation:
N. Nathiya, Ch. Amulya Smyrna, “Infinite Schrödinger networks”, Vestn. Udmurtsk. Univ. Mat. Mekh. Komp. Nauki, 31:4 (2021), 640–650
Linking options:
https://www.mathnet.ru/eng/vuu792 https://www.mathnet.ru/eng/vuu/v31/i4/p640
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