Minbo Yang

Pós-doutorado

Idiomas

Áreas de atuação

Participação em bancas

Produções bibliográficas

• Yang Min Bo ; SANTOS, C. A. ; ZHOU, J. . Least energy nodal solutions for a defocussing Schrodinger equation with supercritical exponent. PROCEEDINGS OF THE EDINBURGH MATHEMATICAL SOCIETY , v. 62, p. 1-23, 2019.

• GAO, FASHUN ; YANG, MINBO . A strongly indefinite Choquard equation with critical exponent due to the Hardy-Littlewood-Sobolev inequality. COMMUNICATIONS IN CONTEMPORARY MATHEMATICS , v. 20, p. 1750037, 2018.

• ALVES, CLAUDIANOR O. ; GAO, FASHUN ; SQUASSINA, MARCO ; YANG, MINBO . Singularly perturbed critical Choquard equations. JOURNAL OF DIFFERENTIAL EQUATIONS , v. 263, p. 3943-3988, 2017.

• GAO, FASHUN ; YANG, MINBO . On nonlocal Choquard equations with Hardy-Littlewood-Sobolev critical exponents. JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS , v. 448, p. 1006-1041, 2017.

• CHENG, ZHIPENG ; SHEN, ZIFEI ; YANG, MINBO . Instability of standing waves for a generalized Choquard equation with potential. JOURNAL OF MATHEMATICAL PHYSICS , v. 58, p. 011504, 2017.

• SHEN, ZIFEI ; GAO, FASHUN ; YANG, MINBO . Multiple solutions for nonhomogeneous Choquard equation involving Hardy-Littlewood-Sobolev critical exponent. ZEITSCHRIFT FUR ANGEWANDTE MATHEMATIK UND PHYSIK , v. 68, p. 61, 2017.

• YANG, MINBO . Semiclassical ground state solutions for a Choquard type equation in $R^2$ with critical exponential growth. ESAIM-CONTROL OPTIMISATION AND CALCULUS OF VARIATIONS , v. 24, p. 177-209, 2017.

• ALVES, CLAUDIANOR O. ; Yang Min Bo . Existence of Solutions for a Nonlocal Variational Problem in R2 with Exponential Critical Growt. JOURNAL OF CONVEX ANALYSIS , v. 24, p. 1197-1215, 2017.

• YANG, MIN-BO ; ZHANG, JIANJUN ; Yimin Zhang . MULTI-PEAK SOLUTIONS FOR NONLINEAR CHOQUARD EQUATION WITH A GENERAL NONLINEARITY. COMMUNICATIONS ON PURE AND APPLIED ANALYSIS , v. 16, p. 493-512, 2017.

• ALVES, CLAUDIANOR O. ; FIGUEIREDO, GIOVANY M. ; YANG, MINBO . Multiple semiclassical solutions for anonlinear Choquard equation with magneticfield. Asymptotic Analysis , v. 96, p. 135-159, 2016.

• ALVES, CLAUDIANOR O. ; YANG, MINBO . Investigating the multiplicity and concentration behaviour of solutions for a quasi-linear Choquard equation via the penalization method. Proceedings of the Royal Society of Edinburgh: Section A Mathematics , v. 146, p. 23-58, 2016.

• SHEN, ZIFEI ; GAO, FASHUN ; YANG, MINBO . Ground states for nonlinear fractional Choquard equations with general nonlinearities. MATHEMATICAL METHODS IN THE APPLIED SCIENCES , v. 39, p. 4082-4098, 2016.

• ZHANG, QIAO ; YANG, MINBO ; LIU, GUILIAN ; FENG, XIAO . Relative concentration based pinch analysis for targeting and design of hydrogen and water networks with single contaminant. JOURNAL OF CLEANER PRODUCTION , v. 112, p. 4799-4814, 2016.

• ALVES, CLAUDIANOR O. ; CASSANI, DANIELE ; TARSI, CRISTINA ; YANG, MINBO . Existence and concentration of ground state solutions for a critical nonlocal Schrödinger equation in R 2 . JOURNAL OF DIFFERENTIAL EQUATIONS , v. 261, p. 1933-1972, 2016.

• ALVES, CLAUDIANOR O. ; NÓBREGA, ALÂNNIO B. ; YANG, MINBO . Multi-bump solutions for Choquard equation with deepening potential well. CALCULUS OF VARIATIONS AND PARTIAL DIFFERENTIAL EQUATIONS , v. 55, p. 1-28, 2016.

• YANG, MINBO ; ALVES, CLAUDIANOR O. . Existence of positive multi-bump solutions for a Schrödinger-Poisson system in $mathbb{R}^{3}$. DISCRETE AND CONTINUOUS DYNAMICAL SYSTEMS , v. 36, p. 5881-5910, 2016.

• YANG, MINBO . Concentration of Positive Ground State Solutions for Schrödinger-Maxwell Systems with Critical Growth. ADVANCED NONLINEAR STUDIES , v. 16, p. 389-408, 2016.

• ZHANG, JIANJUN ; DO Ó, JOÃO MARCOS ; YANG, MINBO . Multi-peak standing waves for nonlinear Schrödinger equations involving critical growth. MATHEMATISCHE NACHRICHTEN , v. 290, p. 1588-1601, 2016.

• LI, SHAO JUN ; SANTOS, CARLOS A. ; Yang, Min Bo . Existence of semiclassical states for a quasilinear Schrödinger equation on - N with exponential critical growth. ACTA MATHEMATICA SINICA-ENGLISH SERIES , v. 32, p. 1279-1296, 2016.

• ALVES, CLAUDIANOR O. ; FIGUEIREDO, GIOVANY M. ; YANG, MINBO . Existence of solutions for a nonlinear Choquard equation with potential vanishing at infinity. Advances in Nonlinear Analysis , v. 5, p. 331-345, 2016.

• TAO, BO ; LIU, ZHIBIN ; YANG, MINBO . Semiclassical ground state solutions for a Schrödinger equation in R2 with critical exponential growth. MATHEMATISCHE NACHRICHTEN , v. 289, p. 727-747, 2016.

• ALVES, CLAUDIANOR O. ; Yang, Minbo . Investigating the multiplicity and concentration behaviour of solutions for a quasi-linear Choquard equation via the penalization method. PROCEEDINGS OF THE ROYAL SOCIETY OF EDINBURGH SECTION A-MATHEMATICS , v. 146, p. 23-58, 2016.

• ALVES, CLAUDIANOR O. ; FIGUEIREDO, GIOVANY M. ; Yang, Minbo . Multiple semiclassical solutions for a nonlinear Choquard equation with magnetic field. ASYMPTOTIC ANALYSIS , v. 96, p. 135-159, 2016.

• YANG, MIN-BO ; JIN, Y. . Existence of ground state solutions for Hamiltonian elliptic systems with gradient terms. Mathematica Slovaca , v. 65, p. 141-156, 2015.

• YANG, MIN-BO ; WEI, YUANHONG ; DING, YANHENG . Existence of semiclassical states for a coupled Schrödinger system with potentials and nonlocal nonlinearities. Zeitschrift fur Angewandte Mathematik und Physik (Electronic ed.) , v. 65, p. 41-68, 2014.

• YANG, MIN-BO ; WEI, YUANHONG . Existence of solutions for a system of diffusion equations with spectrum point zero. Zeitschrift fur Angewandte Mathematik und Physik (Electronic ed.) , v. 65, p. 325--337, 2014.

• YANG, MIN-BO ; WEI, YUANHONG . Existence of solutions for singularly perturbed Hamiltonian elliptic systems with nonlocal nonlinearities. Topological Methods in Nonlinear Analysis , v. 43, p. 385-403, 2014.

• ALVES, CLAUDIANOR O. ; YANG, MINBO . Existence of semiclassical ground state solutions for a generalized Choquard equation. Journal of Differential Equations (Print) , v. 257, p. 4133-4164, 2014.

• YANG, MINBO ; DING, YANHENG . Existence of solutions for singularly perturbed Schrödinger equations with nonlocal part. Communications on Pure and Applied Analysis , v. 12, p. 771-783, 2013.

• YANG, MINBO ; DING, YANHENG . Existence and multiplicity of semiclassical states for a quasilinear Schrödinger equation in $mathbb{R}^N$. Communications on Pure and Applied Analysis , v. 12, p. 429-449, 2013.

• Yang, Minbo . Stationary states for nonlinear Dirac equations with superlinear nonlinearities. Topological Methods in Nonlinear Analysis , v. 39, p. 175, 2012.

• YANG, MINBO . Existence of solutions for a quasilinear Schrödinger equation with subcritical nonlinearities. Nonlinear Analysis , v. 75, p. 5362-5373, 2012.

• 2012 YANG, MIN-BO . Standing waves for periodic discrete nonlinear Schrödinger equations with asymptotically linear terms. Acta Mathematicae Applicatae Sinica , v. 28, p. 351-360, 2012.

• CHEN, WENXIONG ; YANG, MINBO ; DING, YANHENG . Homoclinic orbits of first order discrete Hamiltonian systems with super linear terms. SCI CHINA MATH , v. 54, p. 2583-2596, 2011.

• YANG, MINBO . Standing waves to discrete vector nonlinear Schrödinger equation. Journal of Difference Equations and Applications (Print) , v. 17, p. 1455-1469, 2011.

• YANG, MINBO ; SHEN, ZIFEI ; DING, YANHENG . On a class of infinite-dimensional Hamiltonian systems with asymptotically periodic nonlinearities. Chinese Annals of Mathematics. Ser. B , v. 32, p. 45-58, 2011.

• YANG, MINBO . Nonstationary homoclinic orbits for an infinite-dimensional Hamiltonian system. Journal of Mathematical Physics , v. 51, p. 102701, 2010.

• YANG, MINBO ; CHEN, WENXIONG ; DING, YANHENG . Solutions for Discrete Periodic Schrödinger Equations with Spectrum 0. Acta Applicandae Mathematicae , v. 110, p. 1475-1488, 2010.

• YANG, MINBO ; ZHAO, FUKUN ; DING, YANHENG . Infinitely many stationary solutions of discrete vector nonlinear Schrödinger equation with symmetry. Applied Mathematics and Computation , v. 215, p. 4230-4238, 2010.

• YANG, MINBO ; CHEN, WENXIONG ; DING, YANHENG . Solutions for periodic Schrödinger equation with spectrum zero and general superlinear nonlinearities. Journal of Mathematical Analysis and Applications (Print) , v. 364, p. 404-413, 2010.

• YANG, MINBO . Ground state solutions for a periodic Schrödinger equation with superlinear nonlinearities. Nonlinear Analysis , v. 72, p. 2620-2627, 2010.

• QIAN, CHENYIN ; SHEN, ZIFEI ; YANG, MINBO . Existence of solutions for p(x)-Laplacian nonhomogeneous Neumann problems with indefinite weight. Nonlinear Analysis: Real World Applications , v. 11, p. 446-458, 2010.

• YANG, MINBO ; CHEN, WENXIONG ; DING, YANHENG . Solutions of a class of Hamiltonian elliptic systems in. Journal of Mathematical Analysis and Applications (Print) , v. 362, p. 338-349, 2010.

• YANG, MINBO ; LI, BAORONG . Solitary waves for non-homogeneous Schrödinger Maxwell system. Applied Mathematics and Computation , v. 215, p. 66-70, 2009.

• ZHAO, FUKUN ; CHEN, JIN ; YANG, MINBO . A periodic solution for a second-order asymptotically linear Hamiltonian system. Nonlinear Analysis , v. 70, p. 4021-4026, 2009.

• YANG, MINBO ; SHEN, ZIFEI ; DING, YANHENG . Multiple semiclassical solutions for the nonlinear Maxwell Schrödinger system. Nonlinear Analysis , v. 71, p. 730-739, 2009.

• Yang, Min Bo ; SHEN, ZI FEI . Infinitely many solutions for a class of fourth order elliptic equations in R N. Acta Mathematica Sinica. English Series (Print) , v. 24, p. 1269-1278, 2008.

• YANG, MINBO ; SHEN, ZIFEI . The effect of domain topology on the number of positive solutions for singular elliptic problems involving the Caffarelli Kohn Nirenberg inequalities. Journal of Mathematical Analysis and Applications (Print) , v. 334, p. 273-288, 2007.

• ALVES, C. O. ; FASHUN, G. ; SQUASSINA, M. ; YANG, M. . Singularly perturbed critical Choquard equations. Journal of Differential Equations, p. 3943 - 3988, 18 abr. 2017.

Projetos de pesquisa

• 2015 - 2017

  Singularly perturbed problems for Choquard equation and Dirac systems, Descrição: The aim of this project is to study the existence and concentrations of the Dirac system and Choquard equations. , Situação: Concluído; Natureza: Pesquisa. , Integrantes: Minbo Yang - Coordenador.

• 2015 - Atual

  Variational mehtods for nonlocal differential equations, Descrição: Nonlocal differential equations with variaitonal structure have deep physical backgrounds and are very important in the field of nonlinear functional analysis. Firstly, the project aims to investigate the existence and analysis the properties of the standing wave solutions of the generalized Choquard equationfractional elliptic equations related to pseudorelativistic Choquard equation and Maxwell-Dirac system and Klein-Gordon-Dirac system. Secondly, the project will also develop the pertubation methods and penalization methods to study the existence and concentration behavior of the semiclassical solutions of these nonlocal differential problems. By studing the variaitonal methods for nonlocal differential equaitons, the results of the project will help to develop the theory of nonlinear analysis and explain the nonlinear phenomenas in quantum mechanics and optics in physics.. , Situação: Em andamento; Natureza: Pesquisa. , Integrantes: Minbo Yang - Coordenador.