On a length problem for close-to-convex functions
On a length problem for close-to-convex functions is a scholarly work, published in 2018 in ''Studia Scientiarum Mathematicarum Hungarica''. The main subjects of the publication include image, mathematical analysis, pure mathematics, stock order, inequality, convex function, logarithmically convex function, biological function, regular polygon, geometric function theory, combinatorics, mathematics, and bounded function. The authors establish some sufficient conditions for L(f, r) to be bounded and for f(z) to in the classes of strongly close-to-convex function of order α and to be strongly Bazilevič function of type β of order α.