Local Boundedness of Catlin q-Type

We analyze a class of hyperbolic Maxwell variational inequalities of the second kind. By means of a local boundedness assumption on the subdifferential of the underlying nonlinearity, we prove a well-posedness result, where the main tools for the proof are the semigroup theory for Maxwell’s equations, the Yosida regularization and the subdifferential calculus. The second part of the paper focuses on a more general case omitting the local boundedness assumption. In this case, taking into account more regular initial data and test functions, we are able to prove a weaker existence result through the use of the minimal section operator associated with the Nemytskii operator of the governing subdifferential. Eventually, we transfer the developed well-posedness results to the case involving Faraday’s law, which in particular allows us to improve the regularity property of the electric field in the weak existence result.

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Local boundedness of quasi-minimizers of integral functionals with variable exponent anisotropic growth and applications

Nonlinear Differential Equations and Applications NoDEA ◽

10.1007/s00030-010-0072-3 ◽

2010 ◽

Vol 17 (5) ◽

pp. 619-637 ◽

Cited By ~ 3

Author(s):

Xianling Fan

Keyword(s):

Variable Exponent ◽

Integral Functionals ◽

Anisotropic Growth ◽

Local Boundedness

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Conditions for the Local Boundedness of Solutions of the Navier–Stokes System in Three Dimensions

Communications in Partial Differential Equations ◽

10.1081/pde-120020490 ◽

2003 ◽

Vol 28 (3-4) ◽

pp. 617-636 ◽

Cited By ~ 7

Author(s):

Mike O'Leary

Keyword(s):

Stokes System ◽

Three Dimensions ◽

Navier Stokes ◽

Boundedness Of Solutions ◽

Local Boundedness

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REGULARITY OF SOLUTIONS FOR SINGULAR SCHRÖDINGER EQUATIONS

Reviews in Mathematical Physics ◽

10.1142/s0129055x92000054 ◽

1992 ◽

Vol 04 (01) ◽

pp. 95-161 ◽

Cited By ~ 6

Author(s):

ANDREAS M. HINZ

Keyword(s):

Global Regularity ◽

Fundamental Property ◽

Mean Value ◽

Borderline Case ◽

Spectral Theorem ◽

Regularity Of Solutions ◽

Local Boundedness ◽

Kato Class ◽

Regularity Properties ◽

Mean Value Inequalities

Local and global regularity properties of weak solutions of the Schrödinger equation −Δu+qu=λu play an important role in the spectral theory of the corresponding operator [Formula: see text]. Central among these properties is local boundedness of the solutions u, which is derived in an elementary way for potentials q whose negative parts q− lie in the local Kato class K loc . The method also provides mean value inequalities for and, in case q+ is in K loc too, continuity of u. To employ these mean value inequalities for bounds on eigenfunctions of T in a fixed direction, classes Kρ are introduced which reflect the behavior of q at infinity. A couple of examples allow to compare these classes with more conservative ones like the Stummel class Q and the global Kato class K. The fundamental property of local boundedness of solutions also serves as a base for a very short proof of the self-adjointness of T if the operator is bounded from below and q−∈K loc . If q(x) is permitted to go to −∞, as |x|→∞, a large class K ρ which guarantees self-adjointness of T is derived and contains the case q−(x)= O (|x|2). The Spectral Theorem then allows to deduce rapidly decaying bounds on eigenfunctions for discrete eigenvalues, at least if q−(x)= o (|x|2). This is also the condition under which the existence of a bounded solution is sufficient to guarantee λ∈σ(T). Here q−(x)= O (|x|2) appears as a borderline case and is discussed at some length by means of an explicit example. The class of admissible operators extending to these borderline cases with potentials singular locally and at infinity, the regularity results for solutions being mostly optimal, as demonstrated by numerous examples, yet the proofs being shorter and more straightforward than those to be found in literature for smaller classes and weaker results, the sets Kρ under consideration and the methods employed appear to be quite natural.

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Local boundedness results for very weak solutions of double obstacle problems

Journal of Inequalities and Applications ◽

10.1186/1029-242x-2012-43 ◽

2012 ◽

Vol 2012 (1) ◽

Cited By ~ 1

Author(s):

Yuxia Tong ◽

Juan Li ◽

Jiantao Gu

Keyword(s):

Weak Solutions ◽

Obstacle Problems ◽

Very Weak Solutions ◽

Local Boundedness

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The convex function determined by a multifunction

Bulletin of the Australian Mathematical Society ◽

10.1017/s0004972700015100 ◽

1996 ◽

Vol 54 (1) ◽

pp. 87-97 ◽

Cited By ~ 3

Author(s):

M. Coodey ◽

S. Simons

Keyword(s):

Banach Space ◽

Convex Hull ◽

Convex Function ◽

Monotone Operator ◽

Open Problem ◽

Maximal Monotone Operator ◽

Convex Functions ◽

Maximal Monotone ◽

Minimax Theorem ◽

Local Boundedness

We shall show how each multifunction on a Banach space determines a convex function that gives a considerable amount of information about the structure of the multifunction. Using standard results on convex functions and a standard minimax theorem, we strengthen known results on the local boundedness of a monotone operator, and the convexity of the interior and closure of the domain of a maximal monotone operator. In addition, we prove that any point surrounded by (in a sense made precise) the convex hull of the domain of a maximal monotone operator is automatically in the interior of the domain, thus settling an open problem.

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