Limits of the improved integrability of the volume forms

Abstract: We identify the exact degree of integrability of nonnegative volume forms and the Jacobians of orientation preserving mappings from various Orlicz-Sobolev classes. An improvement takes place when the Jacobian belongs to the Orlicz space L Ψ (Ω), where Ψ grows almost linearly, that is, t 1−ε ≺ Ψ(t) ≺ t 1+ε for ε > 0. Our results amount to the principle: the further the Jacobian is from L 1 loc (Ω), the less is the improvement of integrability. In fact, as shown in [LZ], [Wu], [GIM], the largest improvement happ… Show more

“…Under the above assumptions on V we have 'P~l(t) ^ t l^n V~1(t)(4)(5)(6)(7)(8)(9)(10) or, equivalently,…”

A study of Jacobians in Hardyd–Orlicz spaces

“…Under the above assumptions on V we have 'P~l(t) ^ t l^n V~1(t)(4)(5)(6)(7)(8)(9)(10) or, equivalently,…”

A study of Jacobians in Hardyd–Orlicz spaces

“…Taking this normalization into account, and applying Proposition 3.1 in [6] witĥ .s/ D p s 2 eCs log p 1 .e C s/, we conclude that …”

Mappings of finite distortion: decay of the Jacobian in the plane

“…As a matter of fact, (4.7) and (4.6) are equivalent to each other, for all q 1. Indeed, (4.7) implies (4.6) with no conditions on the distortion, assuming merely J f −1 0 a.e., by higher integrability of the Jacobian determinant [8]. On the other hand, (4.6) is equivalent to J f −1 log q (e + |Df −1 |) ∈ L 1 loc by (2.3), and hence implies (4.7) by (4.15) (for α = q).…”

Composition of bi-Sobolev homeomorphisms