On the minimal area of quadrangles circumscribed about planar convex bodies

Key Points

• The aim is to find a quadrangle that minimally bounds a planar convex body while occupying less area.
• Mathematical analysis of geometric properties of planar convex bodies
• Comparison with existing upper bounds
• Derivation of a new upper bound for the area of circumscribed quadrangles
• Every planar convex body can be circumscribed by a quadrangle with area less than (1 − 2.6 ⋅ 10 − 7)² times the area of the body
• Improved the known upper bound set by W. Kuperberg
• Established a relation between the convex body and its circumscribing quadrangle's area