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Characterization of the trace by young's inequality matrices the inequality φ(|AB|) ≤ φ/(Ap)/p + φ/(Bq)/q holds, then φ is a positive scalar multiple
Characterization of the trace by young's inequality matrices the inequality φ(|AB|) ≤ φ/(Ap)/p + φ/(Bq)/q holds, then φ is a positive scalar multiple
Inequalities for Determinants and Characterization of the Trace© 2020, Pleiades Publishing, Ltd. Let tr be the canonical trace on the full matrix algebra ℳn
Functional observer design using linear matrix inequalities of linear matrix inequalities.
Functional observer design using linear matrix inequalities of linear matrix inequalities.
Weighted trace inequalities of monotonicityWe study the inequality Tr(w(A)f(A)) ≤ Tr(w(A)f(B)), where w : ℝ → ℝ+ is a "weight function" and A
Some new two-sided inequalities concerning the fourier transformThe classical Hausdorff-Young and Hardy-Littlewood-Stein inequalities do not hold for p > 2
Nonexistence of global solutions for quasilinear backward parabolic inequalities with p-Laplace-type operator inequality (Formula presented.) with homogeneous Dirichlet boundary condition and bounded integrable sign
Weighted trace inequalities of monotonicityWe study the inequality Tr(w(A)f(A)) ≤ Tr(w(A)f(B)), where w : ℝ → ℝ+ is a "weight function" and A
More accurate classes of jensen–type inequalities for convex and operator convex functions operator means. We also obtain more accurate Young-type inequalities for unitarily invariant norms as well
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