Anno Accademico 2013/2014
Insegnamento : EQUAZIONI DIFFERENZIALI
Numero di crediti : 6
Data Inizio Lezioni:
MARZO 2014
ORE 9.00

OUTLINE OF THE COURSE
CONTENT

•  TOPOLOGICAL METHODS

• •  Brouwer Fixed Point Theorem
• • Contractible Sets
• •   Schauder Fixed Point Theorem
• • A Fixed Point Theorems for Noncompact Operators
• • Classical Solutions of PDEs, Functional Setting
• •   Classical Solutions, Applications of Fixed Point Theorems
• • Weak Solutions of PDEs, Functional Setting
• • Weak Solutions of PDEs, Applications of Fixed Point Theorems
• • STATIONARY PROBLEMS

• • Second-Order Semilinear Equations and Inequalities with Bounded Coefficients

• • Second-Order Semilinear Equations and Inequalities with Unbounded Coefficients
• • Higher Order Semilinear Equations and Inequalities with Bounded Coefficients

• • Higher Order Semilinear Equations and Inequalities with Unbounded Coefficients .
• • Second-Order Elliptic Problems with Local (Complete) Blow-up of a Solution
• • Higher Order Semilinear Inequalities with Singular Coefficients
• • Second-Order Semilinear Differential Inequalities with Critical Degeneracy
• • Semilinear Differential Inequalities with a Polyharmonic Operator .
• • Nonexistence of Solutions to Semilinear Problems in a Half-Space
• • Semilinear Inequalities in Cones
• • A Model Quasilinear Problem and Its Generalizations
• • The General Case of Quasilinear Inequalities
• • Coercive Problems
• • Problems With the Right-Hand Side Depending on the Gradient of a Solution
• • Bernstein Theorem and generalizations

LUNEDI 16 GIUGNO 2014 ore 9.30

SEMINARI
Ad maiora!

9.30 -10.00 - FABIO PEZZOLO
10.15 - 10.45 - VALENTINA SEPE
11.00 - 11.30 - GIACOMO ZUCCARINO