|
Showing 1 - 1 of
1 matches in All Departments
Fixed Point Theory, Variational Analysis, and Optimization not only
covers three vital branches of nonlinear analysis-fixed point
theory, variational inequalities, and vector optimization-but also
explains the connections between them, enabling the study of a
general form of variational inequality problems related to the
optimality conditions involving differentiable or directionally
differentiable functions. This essential reference supplies both an
introduction to the field and a guideline to the literature,
progressing from basic concepts to the latest developments. Packed
with detailed proofs and bibliographies for further reading, the
text: Examines Mann-type iterations for nonlinear mappings on some
classes of a metric space Outlines recent research in fixed point
theory in modular function spaces Discusses key results on the
existence of continuous approximations and selections for
set-valued maps with an emphasis on the nonconvex case Contains
definitions, properties, and characterizations of convex,
quasiconvex, and pseudoconvex functions, and of their strict
counterparts Discusses variational inequalities and
variational-like inequalities and their applications Gives an
introduction to multi-objective optimization and optimality
conditions Explores multi-objective combinatorial optimization
(MOCO) problems, or integer programs with multiple objectives Fixed
Point Theory, Variational Analysis, and Optimization is a
beneficial resource for the research and study of nonlinear
analysis, optimization theory, variational inequalities, and
mathematical economics. It provides fundamental knowledge of
directional derivatives and monotonicity required in understanding
and solving variational inequality problems.
|
You may like...
Legacies
Harvey Jones
Paperback
R220
Discovery Miles 2 200
|
Email address subscribed successfully.
A activation email has been sent to you.
Please click the link in that email to activate your subscription.