Kim, Daesung Stability for functional and geometric inequalities and a stochastic representation of fractional integrals and nonlocal operators <div>The dissertation consists of two research topics.</div><div><br></div><div>The first research direction is to study stability of functional and geometric inequalities. Stability problem is to estimate the deficit of a functional or geometric inequality in terms of the distance from the class of optimizers or a functional that identifies the optimizers. In particular, we investigate the logarithmic Sobolev inequality, the Beckner-Hirschman inequality (the entropic uncertainty principle), and isoperimetric type inequalities for the expected lifetime of Brownian motion. </div><div><br></div><div>The second topic of the thesis is a stochastic representation of fractional integrals and nonlocal operators. We extend the Hardy-Littlewood-Sobolev inequality to symmetric Markov semigroups. To this end, we construct a stochastic representation of the fractional integral using the background radiation process. The inequality follows from a new inequality for the fractional Littlewood-Paley square function. We also prove the Hardy-Stein identity for non-symmetric pure jump Levy processes and the L^p boundedness of a certain class of Fourier multiplier operators arising from non-symmetric pure jump Levy processes. The proof is based on Ito's formula for general jump processes and the symmetrization of Levy processes. <br></div> stability;functional and geometric inequalities;stochastic analysis;Probability;Stochastic Analysis and Modelling;Calculus of Variations, Systems Theory and Control Theory 2019-08-14
    https://hammer.purdue.edu/articles/thesis/Stability_for_functional_and_geometric_inequalities_and_a_stochastic_representation_of_fractional_integrals_and_nonlocal_operators/8282051
10.25394/PGS.8282051.v1