E. Tarafdar scite author profile

Kato [3] has introduced a class of operators called strictly singular operators. These operators have many properties in common with compact operators. In fact the concept of a strictly singular operator is an extension of the concept of a compact operator. Kato has proved that if X and X′ are Banach Spaces, then the singular operators of X into X′ forms a closed subspace of the space of bounded linear operators of X into X′ and if X = X′, then these operators forms a two-sided ideal in the ring of bounded linear operators on X. He has also shown that the Riers-Schauder theorem holds for the spectrum of a strictly singular operator. Gohberg, Feldman and Markus [23] have treated the same class of operators with an equivalent definition.

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Infinite-dimensional Gale-Nikaido-Debreu theorem and a fixed-point theorem of Tarafdar

Mehta

Tarafdar

1987

Journal of Economic Theory

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E. Tarafdar

A fixed point theorem and equilibrium point of an abstract economy

Fixed point theorems in H-spaces and equilibrium points of abstract economies

A fixed point theorem equivalent to the Fan-Knaster-Kuratowski-Mazurkiewicz theorem

Improjective operators and ideals in a category of Banach spaces

Infinite-dimensional Gale-Nikaido-Debreu theorem and a fixed-point theorem of Tarafdar

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