English

Second-order operators with degenerate coefficients

Analysis of PDEs 2014-01-03 v1

Abstract

We consider properties of second-order operators H=i,j=1dicijjH = -\sum^d_{i,j=1} \partial_i \, c_{ij} \, \partial_j on \Rid\Ri^d with bounded real symmetric measurable coefficients. We assume that C=(cij)0C = (c_{ij}) \geq 0 almost everywhere, but allow for the possibility that CC is singular. We associate with HH a canonical self-adjoint viscosity operator H0H_0 and examine properties of the viscosity semigroup S(0)S^{(0)} generated by H0H_0. The semigroup extends to a positive contraction semigroup on the LpL_p-spaces with p[1,]p \in [1,\infty]. We establish that it conserves probability, satisfies L2L_2~off-diagonal bounds and that the wave equation associated with H0H_0 has finite speed of propagation. Nevertheless S(0)S^{(0)} is not always strictly positive because separation of the system can occur even for subelliptic operators. This demonstrates that subelliptic semigroups are not ergodic in general and their kernels are neither strictly positive nor H\"older continuous. In particular one can construct examples for which both upper and lower Gaussian bounds fail even with coefficients in C2ε(\Rid)C^{2-\varepsilon}(\Ri^d) with ε>0\varepsilon > 0.

Keywords

Cite

@article{arxiv.math/0601307,
  title  = {Second-order operators with degenerate coefficients},
  author = {A. F. M. ter Elst and Derek W. Robinson and Adam Sikora and Yueping Zhu},
  journal= {arXiv preprint arXiv:math/0601307},
  year   = {2014}
}

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44 pages