Glasnik matematički, Vol. 33 No. 2, 1998.
Izvorni znanstveni članak
On generalized Cauchy and Pexider functional equations over a field
Mariusz Bajger
Sažetak
Let K be a commutative field and (P,+) be a uniquely 2-divisible group (not necessarily abelian). We characterize all functions T : K → P such that the Cauchy difference T(s+t) - T(t) - T(s) depends only on the product st for all s, t ∈ K. Further, we apply this result to describe solutions of the functional equation F(s+t) = K(st) ◦ H(s) ◦ G(t), where the unknown functions F, K, H, G map the field K into some function spaces arranged so that the compositions make sense. Conditions are established under which the equation can be reduced to a corresponding generalized Cauchy equation, and the general solution is given. Finally, we solve the equation F(s+t) = K(st) + H(s) + G(t) for functions F, K, H, G mapping K into P.
Ključne riječi
Cauchy equation; Pexider equation; Cauchy difference
Hrčak ID:
8189
URI
Datum izdavanja:
1.12.1998.
Posjeta: 1.167 *