Curriculum vitae P    Mateusz Kwaśnicki born ? Sep >FE@ in Wrocław, Poland e-mail: [email protected] http://www.im.pwr.wroc.pl/~kwasnicki E ?==C–?==E PhD studies in Mathematics Wrocław University of Technology (Poland) ?==B–?==C Socrates-Erasmus Scholarship Université d’Angers (France) ?==>–?==C MSc studies in Theoretical Mathematics Wrocław University of Technology (Poland) P   ?=>=–?=>? Polish Academy of Sciences Assistant Professor ?==E— Wrocław University of Technology (Poland) Assistant Professor ?==D–?==E Wrocław University of Technology (Poland) Teaching Assistant ?==D–?==E Wrocław University of Environmental and Life Sciences (Poland) Part-time Teaching Assistant R   — Potential theory of Markov processes — Spectral theory of semigroups of Markov operators — Stochastic processes on fractal sets

A ?=>? Kazimierz Kuratowski Prize (Polish Academy of Sciences, Polish Mathematical Society) ?=>>–?=>A Scholarship for young scientists (Polish Ministry of Science and Higher Education) ?=>> Prize for young mathematicians (Polish Mathematical Society) ?=>>, ?=>? START scholarship (Foundation for Polish Science) ?=>= C=th anniversary of Polish Mathematical Olympiad medal ?==F Wrocław University of Technology Rector’s prize for oudstanding contributions to the university ?==C–?==E Wrocław University of Technology Rector’s Scholarship ?==C >st prize in the Polish Mathematical Society competition for the best student’s paper in the Veld of probability theory and mathematical applications ?==?–?==C Ministry of National Education Scholarship ?==?–?==B Faculty of Fundamental Problems of Technology Dean’s Awards G      ?=>?–?=>B NCN (National Science Centre, Poland) ?=>>/=@/D/ST>/==@>> Spectral theory for Lévy processes ?==F–?=>? MNiSW (Ministry of Science and Higher Education, Poland) grant N N?=> @D@>@C Potential theory of a class of Lévy processes and their Feynman-Kac semigroups ?==B–?==E KBN (State Committee for ScientiVc Research, Poland) grant > P=@A =?= ?E Harmonic measures and properties of semigroups of stable processes ?==B–?==C RTN (Research Training Network, EU) grant HPRN-CT-?==>-==?D@-HARP Harmonic analysis and related problems L     Polish: native; English: very good; Spanish: basic P
  — Boundary Harnack inequality for Markov processes with jumps arXiv:>?=D.@>C= (with K. Bogdan and T. Kumagai) — One-dimensional quasi-relativistic particle in the box arXiv:>>>>.BEFA (with K. Kaleta and J. Małecki) — First passage times for subordinate Brownian motions arXiv:>>>=.=A=>, ?=>> (with J. Małecki and M. Ryznar) — On high spots of the fundamental sloshing eigenfunctions in axially symmetric domains to appear in Proc. London Math. Soc. (with T. Kulczycki) — Suprema of Lévy processes to appear in Ann. Probab. (with J. Małecki and M. Ryznar) ?=>? Spectral theory for >-D symmetric Lévy processes killed upon hitting the origin Electron. J. Probab. >D (?=>?), no. E@: >–?F ?=>? Eigenvalues of the fractional Laplace operator in the interval J. Func. Anal. ?C?(B)(?=>?): ?@DF–?A=? ?=>> Spectral analysis of subordinate Brownian motions on the half-line Studia Math. ?=C(@): ?>>–?D> ?=>= Spectral properties of the Cauchy process on half-line and interval Proc. London Math. Soc. >=>(?): BEF–C?? (with T. Kulczycki, J. Małecki and A. Stós) ?=>= Boundary Harnack inequality for α-harmonic functions on the Sierpiński triangle Probab. Math. Stat. @=(?): @B@–@CE (with K. Kaleta) ?==F Intrinsic ultracontractivity for stable semigroups on unbounded open sets Potential Anal. @>(>): BD–DD ?==F Eigenvalues of the Cauchy process on an interval have at most double multiplicity Semigroup Forum DF(>): >E@–>F? ?==E Spectral gap estimate for stable processes on arbitrary bounded open sets Probab. Math. Statist. ?E(>): >C@–>CD ?==E Estimates and structure of α-harmonic functions Prob. Theory Rel. Fields >A=(@-A): @AB–@E> (with K. Bogdan and T. Kulczycki) R  ?=>? prof. Moritz Kaßmann, Bielefeld University, Bielefeld, Germany ?=>> prof. Panki Kim, Seoul National University, Seoul, Korea ?=>> prof. Moritz Kaßmann, Bielefeld University, Bielefeld, Germany ?=>= prof. Rodrigo Bañuelos, Purdue University, USA ?==E prof. Takashi Kumagai, Kyoto University, Kyoto, Japan ?==E prof. Nikolay Kuznetsov, Institute of Problems in Mechanical Engineering, Russian Academy of Sciences, Sankt Petersburg, Russia S     ?=>? Cth International Conference on Stochastic Analysis and Its Applications,Będlewo, Poland ?=>? Harmonic Analysis and Probability, Angers, France ?=>? Nonlocal Operators: Analysis, Probability, Geometry and Applications, Bielefeld, Germany ?=>? Probability and Analysis,Będlewo, Poland ?=>? >?th Conference on Probability,Będlewo, Poland ?=>> Foundations of Stochastic Analysis, BanU, Canada ?=>> Bth International Conference on Stochastic Analysis and its Applications, Bonn, Germany ?=>= @Ath Conference on Stochastic Processes and Their Applications, Osaka, Japan ?=>= Ath International Conference on Stochastic Analysis and its Applications, Osaka, Japan ?=>= Józef Marcinkiewicz Centenary Conference, Poznań, Poland ?=>= >>th Conference on Probability,Będlewo, Poland ?==F @rd International Conference on Stochastic Analysis and its Applications, Beijing, China ?==F Workshop on Jump Processes, Dresden, Germany ?==E Fractal Geometry and Stochastics 4, Greifswald, Germany ?==E ?nd International Conference on Stochastic Analysis and its Applications, Seoul, Korea ?==D Fractals and Related Fields, Monastir, Tunesia ?==D Bth Conference on Lévy Processess – Theory and Applications, Copenhagen, Denmark