4) Double periodicity
Answers
Answered by
0
Answer:
Explanation: a doubly periodic function is a function defined at all points on the complex plane and having two "periods", which are complex numbers u and v that are linearly independent as vectors over the field of real numbers. That u and v are periods of a function ƒ means that.
Answered by
0
Answer:
In mathematics, a doubly periodic function is a function defined on the complex plane and having two "periods", which are complex numbers u and v that are linearly independent as vectors over the field of real numbers. That u and v are periods of a function ƒ means that
{\displaystyle f(z+u)=f(z+v)=f(z)\,}f(z+u)=f(z+v)=f(z)\,
for all values of the complex number z.
Similar questions