Regularity properties for quasiminimizers of a (p, q)-Dirichlet integral

This book provides the mathematical foundations for the analysis of a class of degenerate elliptic operators defined on manifolds with corners, which arise in a variety of applications such as population genetics, mathematical finance, and economics. The results discussed in this book prove the uniqueness of the solution to the martingale problem and therefore the existence of the associated Markov process. The book uses an “integral kernel method” to develop mathematical foundations for the study of such degenerate elliptic operators and the stochastic processes they define. The precise nature of the degeneracies of the principal symbol for these operators leads to solutions of the parabolic and elliptic problems that display novel regularity properties. Dually, the adjoint operator allows for rather dramatic singularities, such as measures supported on high codimensional strata of the boundary. The book establishes the uniqueness, existence, and sharp regularity properties for solutions to the homogeneous and inhomogeneous heat equations, as well as a complete analysis of the resolvent operator acting on Hölder spaces. It shows that the semigroups defined by these operators have holomorphic extensions to the right half plane. The book also demonstrates precise asymptotic results for the long-time behavior of solutions to both the forward and backward Kolmogorov equations.

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Local Regularity Properties of Almost and Quasiminimal sets with a Sliding Boundary Condition

Astérisque ◽

10.24033/ast.1077 ◽

2019 ◽

Vol 411 ◽

pp. 1-380

Author(s):

Guy DAVID

Keyword(s):

Boundary Condition ◽

Local Regularity ◽

Regularity Properties

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On the existence of various bounded harmonic functions with given periods, II

Nagoya Mathematical Journal ◽

10.1017/s0027763000016317 ◽

1975 ◽

Vol 56 ◽

pp. 1-5

Author(s):

Masaru Hara

Keyword(s):

Riemann Surface ◽

Harmonic Function ◽

Harmonic Functions ◽

Dirichlet Integral ◽

Period Function ◽

Boundedness Property ◽

One Dimensional ◽

Bounded Harmonic Functions

Given a harmonic function u on a Riemann surface R, we define a period functionfor every one-dimensional cycle γ of the Riemann surface R. Γx(R) denote the totality of period functions Γu such that harmonic functions u satisfy a boundedness property X. As for X, we let B stand for boundedness, and D for the finiteness of the Dirichlet integral.

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Wave propagation dynamics in a fractional Zener model with stochastic excitation

Fractional Calculus and Applied Analysis ◽

10.1515/fca-2020-0079 ◽

2020 ◽

Vol 23 (6) ◽

pp. 1570-1604

Author(s):

Teodor Atanacković ◽

Stevan Pilipović ◽

Dora Seleši

Keyword(s):

Wave Propagation ◽

Constitutive Equation ◽

Equations Of Motion ◽

Weak Form ◽

Stochastic Excitation ◽

Expansion Theorem ◽

Zener Model ◽

Dissipation Inequality ◽

Regularity Properties ◽

Fractional Zener Model

Abstract Equations of motion for a Zener model describing a viscoelastic rod are investigated and conditions ensuring the existence, uniqueness and regularity properties of solutions are obtained. Restrictions on the coefficients in the constitutive equation are determined by a weak form of the dissipation inequality. Various stochastic processes related to the Karhunen-Loéve expansion theorem are presented as a model for random perturbances. Results show that displacement disturbances propagate with an infinite speed. Some corrections of already published results for a non-stochastic model are also provided.

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Normal-ordered white noise differential equations. II: Regularity properties of solutions

Probability Theory and Mathematical Statistics ◽

10.1515/9783112314081-015 ◽

1999 ◽

pp. 157-174 ◽

Cited By ~ 1

Keyword(s):

Differential Equations ◽

White Noise ◽

Regularity Properties

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A note on n-harmonic majorants

Bulletin of the Australian Mathematical Society ◽

10.1017/s0004972700010340 ◽

1986 ◽

Vol 34 (3) ◽

pp. 461-472

Author(s):

Hong Oh Kim ◽

Chang Ock Lee

Keyword(s):

Harmonic Function ◽

Complex Plane ◽

Unit Disc ◽

Dirichlet Integral ◽

Harmonic Majorant ◽

Harmonic Majorants

Suppose D (υ) is the Dirichlet integral of a function υ defined on the unit disc U in the complex plane. It is well known that if υ is a harmonic function in U with D (υ) < ∞, then for each p, 0 < p < ∞, |υ|p has a harmonic majorant in U.We define the “iterated” Dirichlet integral Dn (υ) for a function υ on the polydisc Un of Cn and prove the polydisc version of the well known fact above:If υ is an n-harmonic function in Un with Dn (υ) < ∞, then for each p, 0 < p < ∞, |υ|p has an n-harmonic majorant in Un.

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On a Sharp Inequality Concerning the Dirichlet Integral

American Journal of Mathematics ◽

10.2307/2374345 ◽

1985 ◽

Vol 107 (5) ◽

pp. 1015 ◽

Cited By ~ 11

Author(s):

S.-Y. A. Chang ◽

D. E. Marshall

Keyword(s):

Sharp Inequality ◽

Dirichlet Integral

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Spectral Approximation of Fractional PDEs in Image Processing and Phase Field Modeling

Computational Methods in Applied Mathematics ◽

10.1515/cmam-2017-0039 ◽

2017 ◽

Vol 17 (4) ◽

pp. 661-678 ◽

Cited By ~ 12

Author(s):

Harbir Antil ◽

Sören Bartels

Keyword(s):

Image Processing ◽

Phase Field ◽

Differential Operators ◽

Mathematical Tool ◽

Phase Field Models ◽

Field Modeling ◽

Regularity Properties ◽

Fractional Pdes ◽

Fractional Differential ◽

Fractional Differential Operators

AbstractFractional differential operators provide an attractive mathematical tool to model effects with limited regularity properties. Particular examples are image processing and phase field models in which jumps across lower dimensional subsets and sharp transitions across interfaces are of interest. The numerical solution of corresponding model problems via a spectral method is analyzed. Its efficiency and features of the model problems are illustrated by numerical experiments.

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