Ryzhik, Lenya - Department of Mathematics, University of Chicago

• Stability of Generalized Transition Fronts Antoine Mellet
• Wave field correlations in weakly mismatched random media Guillaume Bal
• Time Reversal for Classical Waves in Random Media Guillaume Bal and Leonid Ryzhik y
• Level sets in turbulent front propagation Peter Constantin, Alexander Kiselev and Leonid Ryzhik
• Diffusion Approximation of Radiative Transfer Problems with Guillaume Bal \Lambda Leonid Ryzhik y
• Propagation and quenching in a reactive Burgers-Boussinesq system Peter Constantin
• Curriculum Vitae Lenya Ryzhik
• Boundary layers for cellular ows at high P eclet numbers Alexei Novikov George Papanicolaou y Lenya Ryzhik z
• Bulk Burning Rate in Passive Reactive Diffusion. Peter Constantin Alexander Kiselev Adam Oberman
• Lecture Notes on Applied Analysis Lenya Ryzhik 1
• Self-averaging in time reversal for the parabolic wave equation Guillaume Bal George Papanicolaou y Leonid Ryzhik z
• Traveling waves in a one-dimensional heterogeneous medium James Nolen
• Radiative Transport in a Periodic Structure Guillaume Bal \Lambda Albert Fannjiang y George Papanicolaou z Leonid Ryzhik x
• Assignment 3: Some Textbook Problem Solutions 23. Let I = UopenA U.
• The KPP system in a periodic ow with a heat loss Peter V. Gordon Lenya Ryzhik y Natalia Vladimirova z
• arXiv:math-ph/0505083v130May2005 The stochastic acceleration problem in two dimensions
• A conversation with Grigory Ginzburg Alexander Vitsinksy
• Flame Enhancement and Quenching in Fluid Flows Natalia Vladimirova y , Peter Constantin z ; Alexander Kiselev ; Oleg Ruchayskiy y and Leonid Ryzhik z
• Stability in a Nonlinear Population Maturation Model St ephane Mischler
• Traveling fronts in porous media: existence and a singular limit Peter Gordon
• QUENCHING OF FLAMES BY FLUID ADVECTION PETER CONSTANTIN, ALEXANDER KISELEV AND LEONID RYZHIK
• An upper bound for the bulk burning rate for systems Alexander Kiselev and Leonid Ryzhik
• Transport Theory for Acoustic Waves with Reflection and Transmission at Interfaces
• Wave transport for a scalar model of the Love waves Guillaume Bal Leonid Ryzhik y
• Assignment 6: Some Textbook Problem Solutions 18. Consider the function f : R R defined by
• TIME REVERSAL AND REFOCUSING IN RANDOM MEDIA GUILLAUME BAL AND LEONID RYZHIK y
• Introduction to Complex Analysis -excerpts B.V. Shabat
• Asymptotics of the phase of the solutions of the random Schrodinger Guillaume Bal
• Travelling fronts for the thermodiffusive system with arbitrary Lewis numbers
• Traveling waves for the Keller-Segel system with Fisher birth terms
• Relaxation in reactive flows Peter Constantin
• KPP pulsating front speed-up by flows Lenya Ryzhik
• DIFFUSION AND MIXING IN FLUID FLOW PETER CONSTANTIN, ALEXANDER KISELEV, LENYA RYZHIK, AND ANDREJ ZLATOS
• Bounds on the speed of propagation of the KPP fronts in a cellular Alexei Novikov
• Time splitting for the Liouville equation in a random medium Guillaume Bal
• Exponential decay for the fragmentation or cell-division equation Beno^it Perthame
• Time splitting for wave equations in random media Guillaume Bal
• Assignment 2: Some Extra Problem Solutions 1. It is easily verified that for any element r K, whether or not r 0 does not depend on the
• Assignment 3: Some Extra Problem Solutions 1. (i) The sequence 1/n 0 monotonically. Thus, it follows that Sn converges by the Alternating
• Assignment 5: Extra Problem Solutions 1. Let f : [0, 1] R be our monotone function. Clearly,
• Assignment 6: Extra Problem Solutions 1. We will prove in stages that f(q) = qf(1) for all q Q.
• Problems for the Final 1. Suppose |z1| = |z2| = |z3| = 1. Show that z1, z2, z3 are vertices
• 1. Measurable sets form a -algebra. 2. An example of a non-measurable set.
• THE PARABOLIC WAVE APPROXIMATION AND TIME REVERSAL
• SELF-AVERAGING FROM LATERAL DIVERSITY IN THE IT^O-SCHRODINGER GEORGE PAPANICOLAOU , LENYA RYZHIK , AND KNUT SLNA
• Enhancement of the Traveling Front Speeds in ReactionDiffusion Equations with Advection
• Radiative Transfer of Sound Waves in a Random Flow: Turbulent Scattering and ModeCoupling
• The non-local Fisher-KPP equation: traveling waves and steady Henri Berestycki
• Diffusion in a weakly random Hamiltonian flow Tomasz Komorowski
• Lecture notes for Math 205A Lenya Ryzhik
• Assignment 4: Some Textbook Problem Solutions n=2 B1-1/n(0) = B1(0) is an open cover of B1(0) with no finite subcover.
• Self-averaging of Wigner transforms in random media Guillaume Bal Tomasz Komorowski y Lenya Ryzhik z
• Limit of fluctuations of solutions of Wigner Equation Tomasz Komorowski
• Moderate dispersion in scalar conservation laws Beno^it Perthame
• On asymptotics of a tracer advected in a locally self-similar, correlated flow
• Passive tracer in a slowly decorrelating random flow with a large Tomasz Komorowski
• Assignment 5: Some Textbook Problem Solutions 34. Let T() : R
• Radiative transport limit for the random Schrodinger Guillaume Bal George Papanicolaou y Leonid Ryzhik z
• Flame capturing with an advectionreactiondi#usion model
• STATISTICAL STABILITY IN TIME REVERSAL GEORGE PAPANICOLAOU , LEONID RYZHIK y , AND KNUT S LNA z
• Wave transport along surfaces with random Guillaume Bal \Lambda Valentin Freilikher y George Papanicolaou z
• Di usive Energy Scattering from Weakly Random Surfaces Guillaume Bal George Papanicolaou y Leonid Ryzhik z
• Assignment 7: Some Textbook Problem Solutions 26. Consider the map T : C[0, 1] C[0, 1] : Tf(x) = A(x) +
• Assignment 7: Some Extra Problem Solutions 1. We prove that Sc