Assume I am given an $n \times n$ matrix $A = (a_{ij})_{ij}$ with real or complex coefficients. Its matrix expoential is denoted by $\exp(A)$ and calculated as usual.

  Assume further, that I want to rescale the first row $(a_{11}, \ldots, a_{1n})$ by a factor $r_1$, so it reads $(r_1 \cdot a_{11}, \ldots, r_1 \cdot a_{1n})$. When I am doing this for all other rows, I obtain a new matrix $B = (r_i \cdot a_{ij})_{ij}$.

My question is now: Is there a nice way to express $\exp(B)$ by knowing $A,B$ and $\exp(A)$?

Assume I am given an $n \times n$ matrix $A$ with real or complex coefficients. Its matrix exponential is denoted by $\exp(A)$ and is calculated as usual. Assume further that I want to rescale the first row $(a_{11}, \ldots, a_{1n})$ by a factor $r_1$, so it reads $(r_1 \cdot a_{11}, \ldots, r_1 \cdot a_{1n})$. When I do this for all other rows, I obtain a new matrix $B = (r_i \cdot a_{ij})_{i,j=1}^n$.

Knowing $A,B$ and $\exp(A)$, is there a nice way to express $\exp(B)$?

Assume I am given an $n \times n$ matrix $A = (a_{ij})_{ij}$ with real or complex coefficients. Its matrix expoential is denoted by $\exp(A)$ and calculated as usual.

Assume further, that I want to rescale the first row $(a_{11}, \ldots, a_{1n})$ by a factor $r_1$, so it reads $(r_1 \cdot a_{11}, \ldots, r_1 \cdot a_{1n})$. When I am doing this for all other rows, I obtain a new matrix $B = (r_i \cdot a_{ij})_{ij}$.

My question is now: Is there a nice way to express $\exp(B)$ by knowing $A,B$ and $\exp(A)$?

Many thanks for your help in advance!

Assume I am given an $n \times n$ matrix $A = (a_{ij})_{ij}$ with real or complex coefficients. Its matrix expoential is denoted by $\exp(A)$ and calculated as usual.

Assume further, that I want to rescale the first row $(a_{11}, \ldots, a_{1n})$ by a factor $r_1$, so it reads $(r_1 \cdot a_{11}, \ldots, r_1 \cdot a_{1n})$. When I am doing this for all other rows, I obtain a new matrix $B = (r_i \cdot a_{ij})_{ij}$.

My question is now: Is there a nice way to express $\exp(B)$ by knowing $A,B$ and $\exp(A)$?