Extension theorem for simultaneous q-difference equations and some its consequences
Abstract
Given a set T ⊂ (0, +∞), intervals I⊂ (0, +∞) and J⊂ R, as well as functions gt:I× J→ J with t's running through the set \[ T:=T \t-1 t ∈ T\\1\ \] we study the simultaneous q-difference equations \[ (tx)=gt(x,(x)), t ∈ T, \] postulated for x ∈ I t-1I; here the unknown function is assumed to map I into J. We prove an Extension theorem stating that if is continuous [analytic] on a nontrivial subinterval of I, then is continuous [analytic] provided gt, t ∈ T, are continuous [analytic]. The crucial assumption of the Extension theorem is formulated with the help of the so-called limit ratio RT which is a uniquely determined number from [1,+∞], characterising some density property of the set T. As an application of the Extension theorem we find the form of all continuous on a subinterval of I solutions :I → R of the simultaneous equations \[ (tx)=(x)+c(t)xp, t∈ T, \] where c:T → R is an arbitrary function, p is a given real number and I > RT ∈f I.
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