Direct factor not implies amalgam-characteristic

Statement
It is possible to have a group $$G$$ and a direct factor $$H$$ of $$G$$ such that $$H$$ is not a characteristic subgroup in the amalgamated free product $$L := G *_H G$$.

Similar facts

 * Normal not implies amalgam-characteristic
 * Cocentral not implies amalgam-characteristic
 * Characteristic not implies amalgam-characteristic

Opposite facts

 * Central implies amalgam-characteristic
 * Normal subgroup contained in the hypercenter is amalgam-characteristic
 * Finite normal implies amalgam-characteristic
 * Periodic normal implies amalgam-characteristic

Example of the free group
Let $$F$$ be a free group on two generators and $$\mathbb{Z}$$ be the group of integers. Let $$G = F \times \mathbb{Z}$$ and $$H = F \times \{ 0 \}$$ be the embedded first direct factor. We have:

$$L = (F \times \mathbb{Z}) *_{F \times \{ 0 \}} (F \times \mathbb{Z}) = F \times (\mathbb{Z} * \mathbb{Z}) \cong F \times F$$.

Thus, $$L$$ is a direct product of two copies of the free group on two generators, and moreover, the embedded subgroup $$H$$ in $$L$$ is simply $$F \times \{ e \}$$, the first embedded direct factor. This is not a characteristic subgroup in $$L$$, because there exists an exchange automorphism swapping the two direct factors of $$L$$.