In this paper two methods for generating continuous K -frames for a Hilbert spaceH are introduced, where K is a bounded operator on H. Both methods transform acontinuous K -frame of H into another continuous K -frame of H. The first one hasan algebraic approach: a continuous K -frame for HAis shown to be preserved bysome operators with specific algebraic properties, where HAdenotes a module whosemodule operation depends on another fixed bounded operator A on H. The othermethod preserves a continuous K -frame using some minimal projections defined bymeans of the Moore-Penrose inverse of a closed range operator. Also, some examplesillustrate the results.
Eddine Oustani, S., Bellomonte, G. (2026). Some linear maps preserving continuous frames for operators in Hilbert spaces. RICERCHE DI MATEMATICA [10.1007/s11587-025-01049-6].
Some linear maps preserving continuous frames for operators in Hilbert spaces
Giorgia Bellomonte
2026-01-06
Abstract
In this paper two methods for generating continuous K -frames for a Hilbert spaceH are introduced, where K is a bounded operator on H. Both methods transform acontinuous K -frame of H into another continuous K -frame of H. The first one hasan algebraic approach: a continuous K -frame for HAis shown to be preserved bysome operators with specific algebraic properties, where HAdenotes a module whosemodule operation depends on another fixed bounded operator A on H. The othermethod preserves a continuous K -frame using some minimal projections defined bymeans of the Moore-Penrose inverse of a closed range operator. Also, some examplesillustrate the results.
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