The Structure of Functions

The existence problem is solved, and global pointwise estimates of solutions are obtained for quasilinear and Hessian equations of Lane-Emden type, including the following two model problems:is the k-Hessian defined as the sum of k × k principal minors of the Hessian matrix D 2 u (k = 1, 2, . . . , n); µ is a nonnegative measurable function (or measure) on Ω.The solvability of these classes of equations in the renormalized (entropy) or viscosity sense has been an open problem even for good data µ ∈ L s (Ω), s > 1. Such results are deduced from our existence criteria with the sharp exponents s = n(q−p+1) pq for the first equation, and s = n(q−k) 2kq for the second one. Furthermore, a complete characterization of removable singularities is given.Our methods are based on systematic use of Wolff's potentials, dyadic models, and nonlinear trace inequalities. We make use of recent advances in potential theory and PDE due to Kilpeläinen and Malý, Trudinger and Wang, and Labutin. This enables us to treat singular solutions, nonlocal operators, and distributed singularities, and develop the theory simultaneously for quasilinear equations and equations of Monge-Ampère type.

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“…By the refined localization principle on the smooth domain Ω for the function space W p, q q−p+1 (see, e.g., [Tri,Th. 5.14]) we have…”

Section: Renormalized Solutions Of Quasilinear Dirichlet Problemsmentioning

confidence: 99%

Quasilinear and Hessian equations of Lane–Emden type

2008

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“…Let us briefly recall the definition of the homogeneous TriebelLizorkin and Besov spaces (see also, e.g. [18]). …”

Section: Non-linear Approximation On Abelian Groupsmentioning

confidence: 99%

Nonlinear approximation with general wave packets

Borup

Nielsen

2005

Anal. Theory Appl.

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“…In the case σ p < s < n/p, which we want to study here (the so-called sub-critical case), we have just pointed out that we always have that A . This motivates the definition below, which tries to make more precise the corresponding idea of Haroske [8] and Triebel [25]. if u is the minimum (assuming that it exists) of all v > 0 such that …”

Section: Local Growth Envelopesmentioning

confidence: 99%

“…Recently, Haroske [8] and Triebel [25] studied the type of essential unboundedness of functions in such spaces which are not embedded in L ∞ , and with the further restriction s > n(1/p − 1) + for the parameters (basically this guarantees one is dealing with regular distributions). The unboundedness was measured by the determination of the so-called local growth envelope function E LG F s pq or E LG B s pq which we shall write as E LG A s pq , for short , which is a (preferably) continuous representative in the equivalence class of all positive decreasing functions which are equivalent to E LG |A s pq (t) := sup f * (t) : f A s pq ≤ 1 in some interval (0, ε] (for some ε ∈ (0, 1]).…”

Section: Introductionmentioning

confidence: 99%