JournalsaihpcVol. 36, No. 6Annales de l'Institut Henri Poincaré CVolume 36, No. 6 (2019)ISSN: 0294-1449 | eISSN: 1873-1430Editorial Boardpp. 1503–1537A new path to the non blow-up of incompressible flowsLéo Agélaspp. 1539–1573Spreading in space–time periodic media governed by a monostable equation with free boundaries, Part 2: Spreading speedWeiwei DingYihong DuXing Liangpp. 1575–1601Qualitative properties of positive singular solutions to nonlinear elliptic systems with critical exponentRayssa CajuJoão Marcos do ÓAlmir Silva Santospp. 1603–1637On Whitham's conjecture of a highest cusped wave for a nonlocal dispersive equationMats EhrnströmErik Wahlénpp. 1639–1677Boltzmann collision operator for the infinite range potential: A limit problemJin-Cheng JiangTai-Ping Liupp. 1679–1707Blowup criterion for Navier–Stokes equation in critical Besov space with spatial dimensions d ≥ 4Kuijie LiBaoxiang Wangpp. 1709–1745Harnack's inequality for parabolic nonlocal equationsMartin Strömqvistpp. 1747–1790Global solvability and stabilization in a two-dimensional cross-diffusion system modeling urban crime propagationMichael Winkler

pp. 1539–1573Spreading in space–time periodic media governed by a monostable equation with free boundaries, Part 2: Spreading speedWeiwei DingYihong DuXing Liang

pp. 1575–1601Qualitative properties of positive singular solutions to nonlinear elliptic systems with critical exponentRayssa CajuJoão Marcos do ÓAlmir Silva Santos

pp. 1603–1637On Whitham's conjecture of a highest cusped wave for a nonlocal dispersive equationMats EhrnströmErik Wahlén

pp. 1639–1677Boltzmann collision operator for the infinite range potential: A limit problemJin-Cheng JiangTai-Ping Liu

pp. 1679–1707Blowup criterion for Navier–Stokes equation in critical Besov space with spatial dimensions d ≥ 4Kuijie LiBaoxiang Wang

pp. 1747–1790Global solvability and stabilization in a two-dimensional cross-diffusion system modeling urban crime propagationMichael Winkler