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On approximately additive functions |
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| Authors: | Janusz Brzd?k |
| Abstract: | Let C be a convex symmetric subset of a real Banach space F and K be a subgroup of the group (F,+). Let E be a real linear space, h:E→F, and h(x+y)−h(x)−h(y)∈K+C for x,y∈E. We prove that under some additional assumptions h can be represented in the form: h=A+γ+κ with an additive (or linear) A:E→F and some γ:E→C, κ:E→K. |
| Keywords: | Additive operator Banach space Semilinear topology Christensen measurability Universal measurability Baire property Convex set Algebraically interior point |
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