"4" . "US - Spojen\u00E9 st\u00E1ty americk\u00E9" . . . . . "000278663200002" . "P(IAA100190803), Z(AV0Z10190503)" . "279142" . . . "0163-0563" . "26"^^ . . . "31" . "1"^^ . . . "RIV/67985840:_____/10:00343939!RIV11-AV0-67985840" . "RIV/67985840:_____/10:00343939" . "Plastic plate bending problem with friction on the boundary and uncertain input data" . . . "1"^^ . "Plastic plate bending problem with friction on the boundary and uncertain input data"@en . "Numerical Functional Analysis and Optimization" . "Hlav\u00E1\u010Dek, Ivan" . . "Plastic plate bending problem with friction on the boundary and uncertain input data" . . "Plastic plate bending problem with friction on the boundary and uncertain input data"@en . "A thin plate made of a plastic material obeying the Hencky-Mises stress-strain law is considered. On a part of the boundary displacements and/or rotations with friction are prescribed. The model leads to a variational inequality of the second kind with a monotone operator. Since the material function, loading and the friction coefficients are uncertain, the method of the worst scenario is employd. Convergence of approximate solutions is proved."@en . . "anti-optimization; deformation theory of plasticity; Ka\u010Danov method; uncertain input data; worst scenario"@en . . . . "[B0D1500FA246]" . "A thin plate made of a plastic material obeying the Hencky-Mises stress-strain law is considered. On a part of the boundary displacements and/or rotations with friction are prescribed. The model leads to a variational inequality of the second kind with a monotone operator. Since the material function, loading and the friction coefficients are uncertain, the method of the worst scenario is employd. Convergence of approximate solutions is proved." . .