Norm-preserving extension of convex Lipschitz functions

Let ⍀ ; ‫ޒ‬ n be a non-empty bounded open and convex set and let f be a real function defined on the boundary of the set ⍀. A necessary and sufficient condition is given for f to be extendable to a convex and lipschitzian function defined on the whole space ‫ޒ‬ n . The solution u to the degenerate c

For a sequence or net of convex functions on a Banach space. we study pointwise convergence of their Lipschitz regularizations and convergence of their epigraphs. The Lipschitz regularizations we will consider are the infimal convolutions of the functions with appropriate multiples of the norm. For

The concepts of M-convex and L-convex functions were proposed by Murota in 1996 as two mutually conjugate classes of discrete functions over integer lattice points. M/L-convex functions are deeply connected with the well-solvability in nonlinear combinatorial optimization with integer variables. In