Logarithmically Convex Function

A function is logarithmically convex on the interval if and is Concave on . If and are logarithmically convex on the interval , then thefunctions and are also logarithmically convex on .

References

Gradshteyn, I. S. and Ryzhik, I. M. Tables of Integrals, Series, and Products, 5th ed. San Diego, CA: Academic Press, p. 1100, 1980.

• Gutschoven's Curve
• Guy's Conjecture
• Gyrate Bidiminished Rhombicosidodecahedron
• Gyrate Rhombicosidodecahedron
• Gyrobicupola
• Gyrobifastigium
• Gyrobirotunda
• Gyrocupolarotunda
• Gyroelongated Cupola
• Gyroelongated Dipyramid
• Gyroelongated Pentagonal Bicupola
• Gyroelongated Pentagonal Birotunda
• Gyroelongated Pentagonal Cupola
• Gyroelongated Pentagonal Cupolarotunda
• Gyroelongated Pentagonal Pyramid
• Gyroelongated Pentagonal Rotunda
• Gyroelongated Pyramid
• Gyroelongated Rotunda
• Gyroelongated Square Bicupola
• Gyroelongated Square Cupola
• Gyroelongated Square Dipyramid
• Gyroelongated Square Pyramid
• Gyroelongated Triangular Bicupola
• Gyroelongated Triangular Cupola
• Gårding's Inequality