Let M_{m× n}(F) be the vector space of all m× n matrices over a field F. In the case where m ≥ n, char (F) ≠ 2 and F has at least five elements, we give a complete characterization of linear maps Φ : M_{m× n}(F) → M_{m× n}(F) such that spark(Φ (A)) = spark(A) for any A ∈ M_{m× n}(F).

spark of a matrix, linear preserver

primary 15A03, secondary 15A86

Beasley, L.B. and T.J. Laffey. "Linear operators on matrices: the invariance of rank-k matrices." Linear Algebra Appl. 133 (1990): 175-184.

Pierce, S., et al. "A survey of linear preserver problems." Linear and Multilinear Algebra 33.1-2 (1992): 1-129.

Donoho, D.L. and M. Elad. "Optimally sparse representation in general (nonorthogonal) dictionaries via l1 minimization." Proc. Natl. Acad. Sci. USA 100.5 (2003): 2197-2202.