Relative self-adjoint operators in Hilbert space

Gradient Method for Nondensely Defined Closed Unbounded Linear Operators, Quasi-isometric measures and their applications, Operator-Valued wide-sense Markov processes and solutions of infinite-dimensional linear differential systems driven by white noise, Steepest descent for singular linear operators with nonclosed range, Inner, outer, and generalized inverses in banach and hilbert spaces, Haagerup tensor product of \(C^\ast\)-ternary rings, Reciprocals of weighted composition operators in \(L^2\)-spaces, Normed linear relations: Domain decomposability, adjoint subspaces, and selections, Operator differentiable functions, Weak\(^{*}\) exactness for dual operator spaces, Spectral methods for linear inverse problems with unbounded operators, On a Factorization Theorem of D. Lowdenslager, On spatial discretization of evolutionary differential equations on the periodic domain with a mixed derivative, Power convergence and pseudoinverses of operators in Banach spaces, When is an operator the integral of a given spectral measure, Direct iterative methods for least-squares solutions to singular operator equations, Spectral domains of vector harmonizable processes, Tempered distributions in infinitely many dimensions. III: Linear transformations of field operators, On direct sum decompositions of Hestenes algebras, On singularity and Lebesgue type decomposition for operator-valued measueres, Iterative methods for best approximate solutions of linear integral equations of the first and second kinds, Inductive limit in the category of TRO, On the existence of generalized inverses, An appreciation of Professor M. R. Hestenes, A characterization of ternary rings of operators, Local properties of ternary rings of operators and their linking \(C^{*}\)-algebras, Conjugate gradient regularization under general smoothness and noise assumptions, In memory of Magnus R. Hestenes, On the functional Hodrick-Prescott filter with non-compact operators, A unified approach to generalized inverses of linear operators: I. Algebraic, topological and projectional properties